CHAPTER WISE - X REVISION

SHARE AND DIVIDEND 

RAW- 1

1) Mr. Mehta invested Rs 26000 in 15% Rs 100 shares quoted at a premium of 30%. Find 

a) The number of shares bought by Mr. Mehta.

b) Mr. Mehta 's income from the investment.

c) Percentage return on his investment.

Mr. Mehta sold these shares when they were quoted at a premium of 50% and invested the proceeds in 10% Rs 50 shares quoted at a discount of 20%. Find Mr Mehta's income now.

2) Rs 1080 are invested in 8% Rs 10 shares of a company quoted at Rs 12. Find 

a) the number of shares bought.

b) dividend due on the shares.

3) An investor buys 50 shares of a company, when Rs 100 shares of the company are quoted at Rs 140. Find the 

a) amount of money invested to purchase these shares.

b) rate of interest earned on the investment.

4)

RATIO & PROPORTION 

RAW- 1

RATIO 

1) A metre scale is cut in two pieces in the ratio 3:2. Find the length of each piece.

2) Ram left Rs 33000 to his three sons to be divided in the ratio 3:4:5. Find the share of each.

3) Two numbers are in the ratio 13:9. Their difference is 56. Find the numbers.

4) Two numbers are in the ratio 7:9. The first is added to twice the second, the result is 100. Find the numbers.

5) A bank has rupee coins and fifty paise coins in the ratio 2:3. The total value of the coins is Rs 24.50. find the number of each type of coin.

6) Ages of Arun and Beena are in the ratio 4:5. Fourteen years ago the ratio of their ages was 2:3. How old are Arun and Beena at present?

7) The ratio of two numbers is 4:3. If 2 is added to the first and 6 is substracted from the second, the ratio becomes 5:3. Find both numbers.

8) On adding 1 to each of two numbers, the ratio of the resulting numbers is 2:5. If 1 is substracted from each, the resulting ratio is 1:3. Find the numbers.

9) The speed of two trains are in the ratio 4:7. They leave in opposite direction from a place at the same time. At the end of 7 hours, the total distance travelled by them is 154 km. Find the speed of each train.

10) There are 25 consecutive positive integers. The ratio of the first to the last integers is 3:7. Find the first integer.

PROPORTION 

RAW -1

1) Given a,b,c,d are in continued proportion, show that:

a) a : b - c= cd - d²

b) 5a+ 6d : 87a - 7d = 5a³+ 6b³: 8a³- 7b³.

c) (a+ b + c)²/(a²+ b²+ c²)= (a+ b + c)/(a - b + c).

2) If (8b- 7a)/(8d - 7c)= (8b+ 7a)/(8d +7c), show a: b= c: d.

3) Given a: b= c: d , show that 

a) 3a - 5b : 3c - 5d = 3a + 5b : 3c + 5d.

b) (a + c) : (b + d)= √(a²+ c²): √(b²+ d²).

4) Find x, given that the work by (x -3) men in (2x +1) days and the work done by (2x +1) men in (x +4) days is in the ratio 3:10.

5) A vessel contains water and milk in the ratio 1:4. Two litres of the mixture is removed and two litres of water are poured in the vessel. If the ratio of water to milk now is 13:12, find 

a) The total amount of the mixture in the vessel 

b) the amount of milk originally the vessel.

FACTOR THEOREM 

RAW-1

1) Factorise the following:

a) x³+ 6x²+ 11x +6

b) x³+ 2x² - x -2.

c) x³ - 7x²+ 4x + 12

d) 2x³+ 3x² - x - 4 

2) Find the value of the constants a and b if (x -2) and (x +3) are factors of the expression x³+ ax²+ bx -12.

INEQUATION 

Raw-1

1) Solve the inequation of the following:

a) 30- 2(4x -1)> - 8; x ∈ positive integer.

b) 2(x +1)+ 3(2x -1)> 15; x ∈ {2,3,4,5}

c) 2(x +1)+ 3(x -3) ≤ 2;  x ∈ positive integer 

d) 4(x +3) - 5(x + 2)> 0 ; x ∈ positive integer 

2) Given 1/2≤ (x +1) -  (x -1)/2 < 5/2 ; x ∈ {integers}. Simplify the Inequality and list the elements of the solution set.

3) Solve 1< 2x +3 < 5, x ∈ R.

Graph the solution set on the number line.

4) Solve 8 < 5(x +1) -2  ≤ 18, x ∈ R.

Graph the solution set on the number line.

5) Solve 20/3 > (2/3) (8 -x) ≥ -2, x ∈ R.

Graph the solution set on the number line.

6) Given A= {x: -2< x ≤ 2, x ∈ R.}

               B={x : -1≤ x < 4, x ∈ R.}

a) Graph sets A and B on number line 

b) Write the sets

     i) A U B

     ii) A∩ B

Graph these on number lines.

7) Solve: 5/2< x - 1/3 ≤ 10/3 over real numbers. Graph the solution set.

8) Solve: -4/3≤ 2(x/4+ 1) - 4/3 < 5/6; x ∈ R.. graph the solution set.

QUADRATIC EQUATION 

Raw -1

1) 2x²+ 5x -3=0.

2) x²+ 4x - 21 =0.

3) 3x² - 2x = 1.

4) x² - 4x x -32=0.

5) x² - 6xx = 4.

6) 2x²= 1+ 3x.

PROBLEM ON QUADRATIC EQUATIONS 

Raw-1

1) A number is 1 less than twice the second number. The sum of the squares of the numbers is 65. Find the numbers.

2) The product of two positive consecutive even integers is 224. Find the numbers.

3) The length of a rectangle is 10cm more than its width. It's area is 119 cm². Find the length and the width of the rectangle.

4) The diagonal of a rectangle is 2cm longer than the length of the rectangle and 9cm longer than its width. Find the length of the diagonal of the rectangle.

5) In a right angled triangle, the hypotenuse is 8cm longer than one of the other sides and only 1cm longer than the third side. Find the length of the hypotenuse.

6) 200 m² of carpenting is needed to cover floors of two rooms. The width of one room is 3m less than its length. The width of the other room is 2m more than the length of the first and its length is twice the length of the first. Find the dimensions of each room.

7) The sum of the areas of two squares is 325 cm². The side of one square is 5cm longer than the side of the smaller square. Find the side of each square.

8) Travelling at 10 kmph less than usual speed, a bus takes 2 hours more to travel 400 km, than what it takes, if it travels at usual speed. Find the usual speed of the day bus.

9) A number of pupils of a class, share the cost of a Rs 300 gift, which they want to present to their teacher. If 5 more students had joined the plan, each student would have had to contribute Rs 2 less. How many pupils were there in the plan originally.

10) Flying against a 30 kmph wind, a plane takes 10 hrs more to fly 3600 km, than what it would take flying with the same wind ? Find the plane's rate of flying in still air.

11) The length of a rectangle is 3cm more than its width. If the length is decreased by 1cm and the width is increased by 3cm, the area is 3 times of the original rectangle. Find the dimensions of the original rectangle.

12) The denominator of a fraction is 1 more than its numerator. The sum of the fraction and its reciprocal is 5/2. Find the fraction.

13) A train at a speed 12 kmph faster than a bus, travels 260 km in 5/2 hour less than time than the bus. Find the speed of the train and the speed of the day bus.

14) A carpet 3m by 6m is enlarged by the addition of a border of uniform width all round the carpet. Find the width of the border, if the area of the carpet after adding the border to it becomes 20/9 times the area of the original carpet.

15) Two positive numbers are in the ratio 3:2, the difference of their squares is 45. Find the numbers.

MATRICES 

Raw-1

1) If A= 2   1

              3   4

              5   6

a) state the order of A.

b) Write A', the transpose of the matrix A.

c) State the order of A'.

2) If A= x+3 & B= 7

              y+2          4

                5            x

With the relation A= B, then find x,y,z

3) Find the value of x, y and z in the following:

a) x    1 = 2     1

    1    y     1     0

b) 5  2   x = y    2     1 

c) A= 0    x & A'= 0     1 

          1    2          4      2

d) A= 3     2 & B= 3      0

           x     1          2      1 

e) (x    1   + (2     y = (4    0

      0    2)     z     3)     3    5)

4) Find the Matrix A from the following:

a) If X= -2   1 & Y= 1   -2

               3   0          3    1 with the relation A+ X= Y

b) X= 1    4 & Y= 2    2 

          0   -2          4    0 with the relation 2X+ 3Y= 2A

5) If A= 2    -1 & B= 1     6

              1     2          0     2

Find AB and BA 

6) Show that the matrix A²- 2A = 3I, where I is unit Matrix 

A= 1    2 

      2    1

7) Solve for matrix X

If A=2     -1 & B= -7      2

        0      5           6      11 

With the relation A - 3X = B.

SECTION FORMULA 

Raw -1

1) Find the cordinates of the midpoint of the coordinates (2,4p) and (2p,-6).

2) Find the coordinates of the day point dividing the line segment joining the following pairs of points in the given ratios:

a) (1,3) and (6,8)         2:3

b) (-3,1) and (3,-2)       2:1

3) The midpoint of line segment joining (1,4) and (a,2b) is (-3,2). find the values of a and b.

4) The mid-point of the line segment joining (a,b) and (2a + 3b) is (-2,1) . Find the value of and b.

5) In what ratio does the x-axis divide the line segment joining (2,3) and (3,-3)? Find the coordinates of the point of the intersection.

6) In what ratio does the y-axis divide the line segment joining (-2,3) and (5,4)? Find the coordinates of the point of intersection.

7) The coordinates of the midpoint of the three sides of a triangle are (4,-2),(0,0) and (1,-3). Find the coordinates of the vertices of the triangle.

8) Given P(-3,2) and Q(4,5), the join of PQ is intersected by y-axis at R. QM is the perpendicular from Q to the x-axis. N Is the midpoint of RM.

a) find the ratio PR/RQ

b) Find the coordinates of R.

c) Write the coordinates of M.

d) Find the coordinates of N.

9) M(0,4) is the midpoint of AB. Given A is (-2,3).

a) find the coordinates of B. B is joined to O, the origin. P divides OB in the ratio 3:1. Q divides OA in the ratio 1:3.

b) Write coordinates of P and Q.

10) Given O(0,0), Q(1,2), S(-3,0) Q divides OP in the ratio 2:3.

a) Write coordinate of P. 

SOQL is a parallelogram 

b) Write coordinates of L.

c) Find the ratio in which LP is divided by y-axis.

11) Given P(-1,4), Q(5,-2). PQ intersects y-axis in L and x-axis in M.

a) Write the coordinates of L and M.

b) Write the coordinates of N, the midpoint of LM.

12) Given P(-1,-2). PR= 5 units. PR|| case. PQ is divided at (0,0) in the ratio 1:4. OPRS is a parallelogram.

a) Write coordinate of Q and S.

b) Given T(0,3), write coordinate of U, the midpoint of TS.

EQUATION OF STRAIGHT LINE 

Raw-1

1) Write the equation to the line 

a) with slope= -1/3 and y-intercept= -3

b) Passing through (-2,-1) and having slope= -2.

c) Passing through (2,2) and y-intercept= 4

d) Passing through (1,-3) and (-2,-1).

e) Passing through (-1,3) and parallel to the line 2x + 3y= 17.

f) Passing through (2,-5) and perpendicular to the line 3x - 4y= 7.

g) Passing through (1,4) and intersecting the line x -11= 2y.

h) Passing through (2,-3) and bisecting the line segment joining (1,4) and (-3,2).

i) Passing through (-5,3) and parallel to the y-axis.

j) Passing through (2,-4) and parallel to the x-axis.

2) A(2,3), B(5,-1) and C(-4,-3) and the vertices of a triangle.

Write equation to the 

a) median through C.

b) altitude through B.

c) right bisector of the side AC of the triangle.

3) Find the value of p if

a) lines 2x + 3p = y and px - y = 1 are parallel.

b) lines 3x = 2y -10 and py - x = - 10 are perpendicular to each other.

4) A(-2,2), B(1,4) and C(3, b) are collinear.

a) Find the value of b.

b) Find the equation to the line CD, given that CD is perpendicular to line AB.

c) Write coordinates of P, where CD interesects the x-axis.

d) Write equation of line PQ, given that PQ is parallel to AC.

5) Line CD interesects the x-axis at R and the y-axis at S.

Given C is (-6,-1), OS= 5 and D is (3, t) ROSQ is a rectangle.

a) write equation to the line CD.

b) Write the coordinates of R.

c) Find the value of t.

d) Write the coordinates of Q.

e) Write the equation of line through Q, parallel to CD.

f) Write the equation of line through D, perpendicular to CD.

g) Find the coordinates of P, where the lines in (e) and (f) interesect.

TRIGONOMETRY 

Raw-1

a) Find the value of following:

a) 4 sin²60+ 3 tan²30 - 8 sin45 cos45.

b) sin45 cos45 + sin²30 + tan²60.

c) 4/tan²60  + 1/cos²30   - sin²45.

d) 4 cos²60+ 4 tan²45 - sin²30.

e) (cos90+ sin30 - sin45)(sin 0 + cos60+ sin45)

f) (sin90+ sin45 cos45 - tan30)(4 sin²30+ cos60+ 1/tan60).

2) Given cosA= 1/3, A is an acute angle, find tan²A.

3) Given 7 tanθ = 24, θ is an acute angle. Find tan²A.

4) If 5 tanθ = 4, find the value of (5 sinθ - 3 cosθ)/(5 sinθ + 2 cosθ).

5) Given 5 sinθ= 3, θ is an acute angle 

Evaluate: (cosθ - 1/tanθ)/2/tanθ.

6) Given 13 tanθ -12= 0, 0< θ<90, find the value of 

(sinθ + cosθ)/(Cosθ - sinθ).

7) If tanθ = p/q, is an acute angle?

Find the value of 

(cosθ + sinθ)/(Cosθ - sinθ).

8) Use A= B= 30, to verify 

(A+ B)= SunA cosB + cosA sinB.

9) Use A= 60 , B= 30 and formula 

cos(A+ B)= cosA cosB - sinA sinB to prove cos90= 0.

10) Use A= 30 to verify 

Sin2A = 2sinA cosA.

11) Two opposite angles of a rhombus are 60. Find the lengths of the diagonals of the rhombus, if each side of the rhombus measure 10cm.

12) Triangle PQR is right angled at Q.

Angle PRQ= 30 and PQ= 12cm

Angle QSR= 90 and PQ= 12cm

Calculate 

a) QR 

b) PS 

c) PR 

13) Given CD= 20m.

Calculate AB and BD.

14) Given PQ= 50m.

Find RS 

15) Given CD= 30m

Calculate 

a) BC 

b) AB 

c) BD 

16) In the figure,

AD is perpendicular to BC. Given 

TanB= 2/3 and tanC= 5/4, find AD, if BC= 11.5cm

Booster - 2

1) Write as T ratios of angles less than 45°

a) sin71

b) cos63

c) sin72

d) cos68

e) tan73

2) Evaluate: 

a) sin²25+ sin²65

b) sec50 sin40 - cos40 cosec50

c) cosec²67 - tan²23

d) sin35 sin55 - cos35 cos55

e) 2 tan80/cot10 + cot80/tan10

f) sin²x + sin²(90- x).

3) Given 2 sinA -1= 0

a) find A, in degree 

b) value of sin3A.

c) verify that sin3A = 3 sinA - 4 sin³A.

IDENTITY 

RAW- 1

4) Prove

a) sin²x/(1- cosx)= 1+ cosx.

b) cos²x/(1+ sinx)= 1- sinx 

c) tanx + cotx = 1/sinx cosx = secx cosecx

d) (secx + tanx)(sec x - tan x)= sin²x + cos²x.

e) cosec²x sinx cosx = cotx.

f) (1+ tan²x)/(1+ cot²x)= tan²x.

g) (tan²x - sec²x)/(cot²x - cosec²x)= 1.

h) √(cosecx + cotx) √(cosecx - cotx)=1.

i) (1- cotx)/(1+ cotx) = (sinx - cosx)/(sinx + cosx).

j) √{(1- sinx)/(1+ sinx)}= secx - tanx.

θ

θ θ

SHOORT QUESTION XI/ XII / comp. separate karna hai

Raw-3

1) If |x|< 1, then the coefficient of xⁿ in (1+ 2x + 3x² + 4x³+....∞)¹⁾² is 

a) n b) n+1 c) 1 d) -1

2) The sum of infinity terms of GP (√2+1)/(√2-1), 1/(2- √2), 1/2,.....∞ is 

a) 3+2√2 b) 4+3√2 c) 2+3√2 d) 4 +2√2 

3) The coefficient of 

xᵖ and xᑫ in the expansion of (1+ x)ᵖ⁺ᑫ are

a) equal b) equal with opposite signs c) reciprocal to each other d) none 

4) The sum of the infinite series 1/2! + 1/4! + 1/6!+.....∞ is 

a) (e² -2)/e b) (e² -1)/2 c) (e² -1)/2e d) (e -1)²/2e

5) If zᵣ = cos(π/2ʳ) + i sin(π/2ʳ), then the value of (z₁. z₂. z₃......∞) is 

a) -3 b) -2 c) -1 d) 1

6) The coefficient of x³ in the expansion of 3ˣ is

a) (logₑ3)³/6 

b) 3³/6 

c) (logₑ3)³/3

d) (logₑ3)/2

7) The value of {(x -1)/(x +1) + (1/2) (x² -1)/(x +1)² + (1/3) (x³ -1)/(x +1)³+....∞) is 

a) (1/2)logₑ(x +1)

b) logₑx

c) logₑ{x/(x +1)}

d) logₑ{(x +1)/x}

8) the positive integer just greater than (1+ 0.0001)¹⁰⁰⁰⁰ is 

a) 4 b) 5 c) 3 d) 2

9) The value of ∞ᵣ₌₁ ∑ ⁿCᵣ/ⁿPᵣ is 

a) e b) e+1 c) e -2 d) e -1

10) The value of (1+ C₁/C₀)(1+ C₂/C₁)(1+ C₃/C₂).....(1+ Cₙ/Cₙ₋₁) is

a) (n +1)ⁿ/n! 

b) (n +1)/n! 

c) (n +1)ⁿ/(n -1)!

d) (n -1)ⁿ/n!

11) The natural number n for which the Inequality 2ⁿ > 2n +1 is valid, is

a) n> 3 b) n ≥ 3 c) n≥ 2 d) none 

12) If (1+ x)¹⁵ = a₀ + a₁x + a₂x²+.....a₁₅x¹⁵, then the value of ¹⁵∑ᵣ₌₁ r. aᵣ/aᵣ₋₁ is 

a) 110 b) 115 c) 120 d) 135

13) Two events A and B are such that P(A)= 1/4, P(B/A)= 1/2 and P(A/B)= 1/4; then the value of P(Aᶜ/Bᶜ) is 

14) The probability that a regularly scheduled flight departs on time 0.9, the probability that it arrives on time is 0.8 and the probability that is departs and arrives on time is 0.7. then the probability that a plane arrives on time, given that it departs on time, is

a) 0.72 b) 8/9 c) 7/9 d) 0.56

15) A sample of 4 item is drawn at random from a lot of 10 items, containing 3 defectives. If x denotes the number of defective items in the sample, then P(0<x< 3) is equals to 

a) 4/5  b) 3/10 c) 1/2 d) 1/6 

16) A and B are two independent event such that P(A)= 1/2 and P(B)= 1/3. Then the value of P(A' ∩B') is

a) 2/3  b) 1/6 c) 5/6 d) 1/3

17) if n things are arranged at random in a row then the probability that m particular things are never together is

a) m!(n - m)!/n! 

b) 1-  m!(n - m)!/n! 

c) 1- m!/n!

d) 1- m!(n - m +1)!/n! 

18) A= 3   5 & B= 1    17

             2   0          0   -10 then |AB| is equal to 

a) 80 b) 100 c) -110 d) 92

19) The inverse matrix 

5      -2

3       1

a) 

20) If Aᵢ = aⁱ   bⁱ

                  bⁱ  aⁱ and|a|< 1, |b|< 1, then the value of ∞ᵢ₌ᵢ ∑ det(Aᵢ) is 

a) (a² - b²)/{(1- a²)(1- b²)}

b) a²/{(1- a²) - b²(1- b²)}

c) a²/{(1- a²) + b²(1- b²)}

d) a²/{(1+ a²) - b²(1+ b²)}

21) If A is singular matrix of order n then A. (adj A) is equal to 

a) a null matrix 

b) A row matrix 

c) A column matrix d) none 

22) In the determinant of the matrix 

a₁    b₁     c₁

a₂    b₂     c₂

a₃    b₃     c₃ is denoted by D, then the determinant of the matrix 

a₁+ 3b₁ - c₁    b₁     4c₁

a₂+ 3b₂ -4c₂   b₂     4c₂

a₃ +3b₃ - 4c₃  b₃     4c₃

a) D b) 2D c) 3D d) 4D

23) x -2   2x -3    3x -4

      x -4    2x-9     3x-16 = 0

      x-8     2x-27   3x-64

Then the value of x is 

a) -2 b) 3 c) 4 d) 0

24) If a,b,c,d,e and f are in GP then the value of 

a²    d²     x

b²    e²     y

c²    f²      z

depends on

a) x and y b) y and z c) z and x d) none of x, y, z

25) If a,b,c are respectively the pth, qth, rth terms of an AP, then the value of 

a    p     1

b    q     1

c    r      1 is 

a) p+q+r b) 0 c) 1 d) pqr 

26) If for a triangle ABC, the determinant

1    a    b

1    c    a= 0

1    b    c

Then the value of sin²A+ sin²B + sin²C is 

a) 4/9 b) 9/4 c) 1 d) 3√3/4

27) The middle term in the expansion of (1+ x)²ⁿ is 

a) (2n)!xⁿ/n! 

b) (2n)!xⁿ⁺¹/n!(n-1)!

c) (2n)!xⁿ/(n!)²

d) (2n)!xⁿ/{(n +1)!(n -1)! 

28) If xₙ = cos(π/3ⁿ) + i sin(π/3ⁿ), then the value of (x₁x₂x₃) is 

a) i b) - I c) 1 d) -1

29) The locus of a point which moves such that the difference of its distances from two fixed points is always a constant, is

a) a circle  b) a straight line  c) an ellipse d) a hyperbola

30) The equation of the directrix of the parabola x² - 4x - 8y +12=0 is

a) y= 0 b) x= 1 c) y= -1 d) x= -1

31) The curve a²y² = b²(a² - x²) is symmetrical about 

a) x-axis b) y-axis c) both axis d) none 

32) Which of the following points lies on the parabola x² = 4ay ?

a) (at²,2at) b) (at, at²) c) (2at²,at) d) (2at,at²)

33) The foci of the ellipse x²/16 + y²/b² = 1 and the hyperbola x²/144 - y²/81 = 1/25 coincide. Then the value of b² is 

a) 9 b) 7 c) 5 d) 1

34) The distance from the major axis of any points on the ellipse x²/a² + y²/b² = 1 and the distance of its corresponding point on the auxiliary circle are in the ratio 

a) b/a b) a/b c) a²/b² d) b²/a²

35) For the ellipse 25x² + 9y² - 150x - 90y+ 225= 0, ecccentricity is equal to 

a) 2/5 b) 3/5 c) 4/5 d) 1/5

36) What is the difference of the focal distances of any point on a hyperbola ?

a) eccentricity 

b) length of transverse axis 

c) distance between the foci

d) length of semitransverse axis 

37) Equation of the circle passing through the intersection of the ellipse x²/a² + y²/b² = 1 and x²/b² + y²/a² = 1 is

a) x²+ y² = a²

b) x²+ y² = b²

c) x²+ y² = a²b²/(a²+ b²)

d) x²+ y² = 2a²b²/(a²+ b²)

38) The focal distance of the point 't' on the parabola y²= 4ax is

a) at² b) a(1+ t²) c) a(t + 1/t)² d) a/t²

39) A circle touches the x-axis and also touches the circle with centre at (0,3) and radius 2. Then the locus of the centre of the circle is

a) a parabola  b) a hyperbola  c) an ellipse  d) a circle 

40) Let P be the point (1,0) and Q a point on the parabola y²= 8x; than the locus of midpoint of PQ is 

a) x²+ 4y +2=0

b) x²- 4y +2=0

c) y²- 4x +2=0

d) y²+ 4x +2=0

1c 2b 3a 4d 5c 6a 7b 8c 9d 10a 11b 12c 13b 14c 15a 16d 17d 18b 19c 20a 21a 22d 23c 24d 25b 26b 27c 28a 29d 30c 31c 32d 33b 34a 35c 36b 37d 38b 39a 40c

Raw-4

αβ²³₂²³²²³³₁₂₁₂₁₂₁₂₁₂₁₂₁₂ₙ₌₁²ₙ₌₁ⁿₙ₌₁ⁿⁿ¹⁾²³ˣⁿⁿ⁻¹⁵²⁵⁻⁴¹⁰³³³³³³³³³³³³³³³²²²²²²²²²²²²³⁴³⁴³⁴²²²³³³⁻¹⁻¹⁻¹⁻¹⁻¹²²²²²²²²²²²²²²²²²²²²ᵏⁿ³⁵²⁵³⁵⁴⁶α ⁵²³²²²²²²²²²²²²²²²₁₁₂₂₁₂²²²²²²

Raw-5

²

²¹⁰⁰ⁿⁿ⁺²∈¹⁾⁴¹⁾⁸¹⁾¹⁶ ∞ ∞² ∩ ⁿ² ω ¹⁰¹⁰∩²³³³ⁿⁿⁿⁿⁿⁿⁿⁿ²²²³²³³³³³²²₁₂₃₁₂₃₁₁₂₂₃₃θ λ ₑ

Raw-2

1) Assuming that the sums and products given below are defined, which of the following is not true for matrices?

a) AB= AC does not imply B= C

b) A+ B= B + A

c) (AB)'- B' A'

d) AB= O implies A= O or B= O

2) The sum of the coefficients in the expansion of (1+ x - 3x²)¹⁰⁰ is 

a) 100 b) -100 c) 1 d) -1

3) A fair die is thrown till we get 6;  then the probability of getting 6 exactly in even number of turns is

a) 11/36 b) 5/11 c) 6/11 d) 1/6

4) 10ⁿ + 3. 4ⁿ⁺² + 5 is always divisible by (for all n ∈ N)

a) 9 b) 7 c) 5 d) 17

5) The value of 2¹⁾⁴. 4¹⁾⁸. 8¹⁾¹⁶ .....∞ is 

a) 1 b) 3/2 c) 2 d) 4

6) If l, m, n are pth, qth and r-th terms of a GP, all positive, then the value of 

| log l       p      1

  log m    q       1 

  log n      r        1 is

a) -1 b) 2 c) 1 d) 0

7) The value of 2/3! + 4/5! + 6/7! + .....∞ is 

a) e b) 1/e c) 2e d) e²

8) A and B are two events such that P(AUB)=3/4, P(A∩ B)= 1/4, P(A)= 2/3; then the value of P(A∩B) is 

a) 5/12 b) 3/8 c) 5/8 d) 1/4

9) One root of the equation 

x + a     b       c

    b    x+ c     a  = 0 is

    c      a      x+ b

a) a+ b b) -(b + c) c) - a d) -(a+ b + c)

10) The first three terms in the expansion of (1+ ax)ⁿ and 1,6x and 16x²; then the values of a and b are 

a) a= 2, n= 9 b) a= 2/3, n= 9 c) a= 2, n= 3 d) a= 3/2, n= 6

11) If ω is a cube root of unity than the value of

1     ω     ω²

ω    ω²    1

ω²    1      ω

a) 1 b) ω c) 0 d) ω²

12) How many terms are there in the expansion (4x + 7y)¹⁰ + (4x - 7y)¹⁰ ? 

a) 6 b) 5 c) 11 d) 22

13) If A and B are two events such that P(AUB)= 5/6, P(A∩B)= 1/3, Then which one of the following is not correct?

a) A and B are independent 

b) A and B' are independent

c) A' and B are independent

d) A and B are dependent

14) 1   0   2 & Adj A= 5  a  -2

IfA=-1  1  -2                1  1   0

         0  2  1               -2  -2  b

then the values of a and b are 

a) a= -4, b= 1

b) a= -4, b= -1

c) a= 4, b= 1

d) a= 4, b= -1

15) The value of the infinite series (x - y)/x + (1/2) {(x - y)/x²  + (1/3) {(x - y)/x³ + ......∞ is 

a) logₑ(y/x)

b) logₑ(x/y)

c) 2logₑ(x/y)

d) (1/2) logₑ(y/x)

16) The coefficient of x² in the expansion of (2-3x)/(1+ x)³ is 

a) 2 b) -2 c) 38 d) -38

17) If a= 1+2+4+.....to n terms, b= 1+3+9+....to n terms and c= 1+5+25+....to n terms, then the value of 

a     2b      4c

2      2         2 

2ⁿ     3ⁿ      5ⁿ    is 

a) (30)ⁿ b) (10)ⁿ c) 0 d) 2ⁿ + 3ⁿ + 5ⁿ

18) The value of 1²/1!  + 2²/2!  + 3²/3! + ......∞ is 

a) 2e b) 2e+1 c) 2e -1 d) 2(e -1)

19) The value of the fourth term the in the expansion of 1/³√(1- 3x)² is 

a) -40x³/3 b) 40x³/3 c) 20x³/3 d) -20x³/3

20) a coin and a 6 faced die, both unbiased , are chosen simultaneously, the probability of getting a head on the coin and an odd number on the die is 

a) 1.2 b) 3/4 c) 1/4 d) 2/3

21) A number is chosen at random among the first 120 natural numbers. What is the probability that the number chosen being a multiple of 5 or 15 ?

a) 1/5 b) 1/8 c) 1/15 d) 1/6

22) If A= -1   0

                 0   2 then the value of A³ - A² is equal to 

a) I b) A c) 2A d) 2I

23) If 1, ω, ω² are cube roots of unity then the value of m for which the matrix

1     ω    m

ω    m     1  is singular, is

m    1      ω

a) 1 b) -1 c) ω d) ω²

24) If A= -x   - y

                 z     t 

Then the transpose of adj A is 

a) t  z b) t  y c) t  -z d) none 

   -y  -x   -z -x    y  -x

25) a dice is thrown, if it shows a six, we draw a ball from a bag containing 2 black balls and 6 white balls. If it does not show a 6 then we toss a coin . Then the number of event points in the sample space of this experiment is 

a) 18 b) 14 c) 12 d) 10

26) The solutions of the equation 

x   2    -1

2   5     x = 0 are

-1  2     x

a) -3,1 b) 3,-1 c) 3,1 d) -3,-1

27) The sum of rhe infinite series (1+ 3/2! + 7/3! + 15/4! +.....∞) is 

a) e(e -1) b) e(e +1)  c) e(1- e) d) 3e

28) If A is a square metrix of order 3x3 and A is a scalar, then adj(λA) is equal to 

a) λ adj A B) λ² adj A c) λ³ adj A d) λ⁴ adj A

29) The equation of the parabola whose focus is (5,3) and directrix is 3x - 4y +1=0, is

a) (4x + 3y)² - 256x - 142y + 849= 0

b) (4x - 3y)² - 256x - 142y + 849= 0

c) (3x + 4y)² - 142x - 256y + 849= 0

d) (3x - 4y)² - 256x - 142y + 849= 0

30) the eccentricity of the conic 9x²+ 25y²= 225 is 

a) 2/5 b) 4/5 c) 3/5 d) 3/4

31) the locus of the point P(x,y) satisfying the relation √{(x - 3)²+ (y -1)²} + √{(x + 3)²+ (y -1)²}= 6 is

a) a straight line  b) a hyperbola  c) a circle d) an ellipse

32) The locus of the midpoint of the line segment joining the focus to a moving point on the parabola y²= 4ax is another parabola with directrix 

a) x= -a b) 2x= -a c) x= 0 d) 2x= a

33) If x₁, x₂, x₃, and y₁, y₂, y₃ are both GP with the same common ratio, then the points (x₁, y₁), (x₂, y₂) and (x₃, y₃) are

a) vertices of a Triangle 

b) on a circle 

c) collinear 

d) on an ellipse 

34) the eccentricity of the hyperbola 25x²- 9y²= 144 is

a) √34/4 b) √34/3 c) 6/√34 d) 9/√34

35) The curve represented by the equation 4x²+ 16y²- 24x - 32y - 12= 0 is 

a) an ellipse with eccentricity 1/2

b) an ellipse with eccentricity √3/2

c) a hyperbola with eccentricity 2

d) a hyperbola with eccentricity 3/2

36) The equation of the parabola with vertex at the origin and directrix is y= 2, is

a) y²= -8x b) y²= 8x  c) x²= 8y d)  x²= -8y

37) If (0,6) and (0,3) are respectively the vertex and focus of a parabola, then its equation is 

a) x²-12y = 72

b) y²-12x = 72

c) x²+12y = 72

d) y² + 12x = 72

38) The equation of the director circle of the hyperbola x²/16 - y²/4  = 1 is

a) x² + y² = 16 b) x² + y² = 4 c) x² + y² = 20 d) x² + y² = 12

39) An equilateral triangle is inscribed to the parabola y²= x whose one vertex is the vertex of the parabola. Then the length of a side of the triangle is

a) √3 units b) 8 units c) 2√3 units d) 1/2 units 

40) Any point on the hyperbola (x+1)²/16 - (y-2)²/4 = 1 is of the form 

a) (4 sec θ, 2 tanθ)

b) (4 sec θ +1, 2 tanθ-2)

c) (4 sec θ -1, 2 tanθ-2)

d) (4 sec θ -1, 2 tanθ+ 2)

1d 2c 3b 4a 5c 6d 7b 8a 9d 10b 11c 12a 13d 14c 15b 16d 17c 18a 19b 20c 21a 22c 23d 24c 25a 26b 27a 28b 29a 30b 31a 32c 33c 34b 35b 36d 37c 38d 39c 40d 

Raw-1

1) Sum of infinite of terms in GP is 20 and the sum of their squares is 100; then the common ratio of the GP is

a) 5 b) 3/5 c) 2/5 d) 1/5

2) If xₙ = cos(π/2ⁿ)+ i sin(π/2ⁿ), then the value of (x₁x₃x₅....∞)+ 1/(x₂x₄x₆....∞) is 

A) 1 b) -1 c) 2 d) 0

3) If r> 1, n> 2 are positive integers and the coefficient of (r+2)th and 3rth terms in the expansion of (1+ x)²ⁿ are equal, then n is equal to 

a) 3r b) 3r+1 c) 2r d) 2r+1

4) If a> 0 and discriminant of ax²+ 2bx + c= 0 is negative, then the value of 

a          b      ax+ b

b          c      bx + c

ax +b  bx+ c   o

is

a) positive b) (ac - b²)(ax²+ bx + c) c) negative d) 0

5) A problem in mathematics is given to three students A, B and C and their respective probability of solving the problem is 1/2, 1/3, 1/4. Then the probability that the problem is solved, is 

a) 3/4  b) 1/2  c) 2/3  d) 7/8

6) The probability that a leap year will have 53 Tuesday or Saturday is 

a) 2/7  b)3/7  c) 4/7  d) 1/7

7) If y= x - x² + x³ - x⁴+....∞, then the value of x will be (-1< x < 1)

a) y+ 1/y b) y/(1+ y) c) y - 1/y d) y/(1- y)

8) The value of the determinants 

1+ a       1        1

   1       1+ b     1  is

   1          1     1+ c

a) 1+ abc+ ab+ bc+ ca

b) abc(1 + 1/a + 1/b+ 1/c)

c) 4abc d) abc(1/a + 1/b+ 1/c)

9) If A= 2     -1

              -1     2 and I is the unit matrix of order 2, then A² is equal to 

a) 4A - 3I b) 3A - 4I  c) A - I  d) A + I 

10) Let n≥ 5 and b≠ 0; if in the binomial distribution of (a - b)ⁿ, the sum of the fifth and the 6th term 0, then the value of a/b is

a) 5/(n -4) b) 1/5(n -4)  c) (n -5)/6 d) (n -4)/5

11) P(A)= 2/3, P(B)= 1/2 and P(A U B)= 5/6, then the evens A and B are 

a) mutually exclusive 

b) independent as well as mutually exclusive

c) independent  d) none

12) The roots of the equation in determinant 

x   3     7

2   x     -2 =0

7   8     x are

a) -2,-7,5 b) -2,-5,7  c) 2, 5,-7  d) 2, 5, 7

13) If f(x) =| sinx     cosx    Tanx

                      x³          x²          x

                      2x          1           1

Then the value of lim ₓ→₀ f(x)/x² is

a) -3 b) 3 c) -1 d) 1

14) if n be an integer, then n(n +1)(2n +1) is 

a) an odd number  b) divisible by 6 c) a perfect square d) none

15) The sum of the infinite series 1/2! -  1/3! + 1/4! - .....∞ is

a) e b) e¹⁾² c) e⁻² d) none 

16) The multiplicative inverse of matrix 

2     1

7     4 is 

a) 4  -1 b) 4  -1 c) 4 -7 d) -4  -1

    -7 -2     -7   2      7  2      7  -2

17) The probability that atleast one of the events A and B occur is 3/5. If A and B occur simultaneous with probability 1/5, then the value of P(A')+ P(B') is 

a) 2/5  b) 4/5 c) 6/5 d) 7/5

18) If 0< y < 2¹⁾³ and x(y³ -1)= 1, then the value of (2/x + 2/3x³+ 2/5x⁵ +....∞) is 

a) logₑ{y³/(2- y³)}

b) logₑ{y³/(1 - y³)}

c) logₑ{2y³/(1 - y³)}

d) logₑ{y³/(1 - 2y³)}

19) For a. real number α, let A(α) denote the Matrix 

cosα     sinα

- sinα    cosα. 

then for real numbers α₁ and α₂, the value of A(α₁) A(α₂) is 

a) A(α₁α₂) b) A(α₁ + α₂) c) A(α₁ - α₂) d) A(α₂ - α₁)

20) if the system of equation x + 2y + 3z = 1, 2x + ky + 5z = 1, 3x + 4y + 7z = 1 has no solution, then 

a) k= -1 b) k= 1  c) k= 3 d) k= 2

21) The probability that the same number appears on throwing three die simultaneously is 

a) 1/6 b) 1/36  c) 5/36 d) none 

22) A is a square Matrix, such that A³= I; then inverse of A is equals to 

a) A² b) A c) A³ d) none 

23)    1     a   a²- bc

If D=  1     b   b²- ca

          1     c   c²- ab then D is 

a) 0 b) independent of a c) independent of b d) independent of x

24) If |x|< 1/2, then the coefficient of xʳ in the expansion of (1+ 2x)/(1- 2x)² is 

a) r. 2ʳ b) (2r -1)2ʳ r.2²ʳ⁺¹ d) (2r +1)2ʳ

25) The value of the infinite series (1+ 1/3.2² + 1/5.2⁴ + 1/7.2⁶ +.....∞) is 

a) logₑ3 b) (1/2) logₑ3 c) 1- logₑ3 d) 2logₑ3

26) if the nth term of an infinite series is n(n +4)/n!,  then the sum of infinite terms of the series is 

a) 6e +1 b) 6e c) 5e d) 6e -1

27) in the expansion of (1+ x)ᵐ(1- x)ⁿ the coefficient of x and x² are 3 and (-6) respectively, then the value of n is

a) 7 b) 8 c) 9 d) 10

28)  y    x     0

If     0    y     x= 0

        x   0     y 

and x≠ 0, then which one of the following is correct?

a) x is one of the cube root of 1 

b) y is one of the cube root of 1 

c) y/x is one of the cube root of 1 

d) y/x is one of the cube root of (-1)

29) The locus of a point whose difference of distances is from points (3,0) and (- 3, 0) is 4, is 

a) x²/4 - y²/5 = 1

b) x²/5 - y²/4 = 1

c) x²/2 - y²/3 = 1

d) x²/3 - y²/2 = 1

30) if the equation of latus rectum of a parabola is x + y -8=0 and the equation of the tangent at the vertex is x + y -12=0, then the length of the latus rectum is 

a) 4√2 b) 2√2 c) 8 d) 8√2

31) If B and B' are the ends of minor axis and S and S' are the foci of the ellipse x²/25 + y²/9 = 1, then the area of the numbers SBS'B' formed will be 

a) 12 square units

b) 48 square units 

c) 24 square units

d) 36 square units

32) The lengths of the axis of the conic 9x²+ 4y²- 6x + 4y +1=0

a) 1/2,9  b) 1, 2/3 c) 2/3,1  d) 3,2 

33) if the angle between the line joining the end points of minor axis of an ellipse with its which one focus is π/2, then the eccentricity of the ellipse is

a) 1/√2 b) 1/2 c) √3/2 d) 1/2√2

34) Which one of the the following is independent of  in the hyperbola  (0<α< π/2) x²/cos²α  - y²/sin²α = 1?

a) eccentricity  b) absicca of a focus c) directrix d) vertex 

35) if the distance of a point on the ellipse x²/9 + y²/4= 1 from its Centre is 2,  then the eccentric angle of the point is

a) π/4 b) π/2 c) 3π/4 d) π/3

36) The focus of the curve y²+ 4x - 6y + 13=0 is at

a) (2,3) b) (2,-3) c) (-2,3) d) (-2,-3)

37) The distance between the directrices of the hyperbola x= 8 secθ, y= 8 tanθ is

a) 8√2 b) 16√2 c) 4√2 d) 6√2

38) If a focal chord of the parabola y²= ax is 2x- y -8=0, then the equation of its directrix is 

a) x - 4= 0 b) x + 4= 0 c) y - 4= 0 d) y + 4= 0 

39) If a≠ 0 and the line 2bx + 3cy + 4d=0 passes through the points of intersection of the parabola y²= 4ax and x²= 4ay, then 

a) d²+(2b - 3c)²= 0

b) d²+(3b + 2c)²= 0

c) d²+(2b + 3c)²= 0

d) d²+(3b - 2c)²= 0

40) The eccentricity of an ellipse with its centre at the origin, is 1/2, if one of the directrixes is x= 4, then the equation of the ellipse is

a) 4x²+ 3y²= 12

b) 3x²+ 4y²= 1

c) 4x²+ 3y²= 1

d) x²+ 4y²= 12

1b 2d 3c 4d 5a 6c 7d 8b 9a 10d 11c 12c 13d 14b 15d 16b 17c 18a 19b 20c 21b 22a 23a 24d 25a 26b 27c 28d 29a 30d 31c 32b 33a 34b 35b 36c 37a 38b 39c 40d

α θ

REVISION IX

CUBE CUBOID 

1) Find the volume, the surface area and the diagonal of a cuboid 12cm long, 4 cm wide and 3cm high .      144,192,13

2) The volume of a cuboid is 440cm³ and the area of its base is 88cm². Find its height.      5cm

3) The volume of a cube is 1000cm. Find the total surface area.      600cm²

4) How many 3 metres cubes can be cut from a cuboard measuring 18m x 12m x 9m?     72

5) A cube of 9cm edge is immersed completely in a rectangular vessel containing water. If the dimension of the base 15cm and 12cm, find the rise in water level in the vessel.     4.05cm

6) The length of a cold storage is double its breadth . Its height is 3 meters. The area of its four walls (including doors) is 108 m². Find its volume.     216m³.

7) Two cubes each of 10 cm edge are joined end to end. Find the surface area of the resulting cuboid.       1000cm²

8) Three cubes edges measure 3cm, 4cm and 5cm respectively to form a single cube. Find its edge. Also find a surface area of the new cube .     6m, 216cm²

9) The sum of length, breath and depth of a cuboid is 19cm and the length of its diagonal is 11cm. Find the surface area of the cuboid.    240cm²

10) A plot of land in the form of a rectangle has a dimension 240m x 180m. A drainlet 10m wide is dug all around it (on the outside) and the earth dug out is evenly spread over the plot, increasing its surface level by 25 cm. Find the depth of the drainlet.    1.227

11) Three cubes each of side 5cm are joined end to end. Find the surface area of the resulting cuboid .        350cm².

12) Find the number of bricks, each measuring 25cm x  12.5 cm x 7.5 cm required to construct a wall 6m long, 5m high and 0.5m thick, while the cement and sand mixture occupies 1/20 of the volume of the wall.    6080

CIRCLE 

1) Find the diameter circle whose circumference is 176m.     56m

2) A bicycle wheel makes 5000 revolutions in moving 11km. Find the diameter of the wheel.      70cm

3) A road which is 7m wide surrounds a circular park whose circumference is 352m. Find the area of the road.       2618 m²

4) Find the circumference of a circle of radius is 4.2cm.     26.4cm

5) Find the area of a circle of radius is 7.7cm.       186.34cm²

6) Find the length of the diameter of a circle whose circumference is 3.3m.    1.05m

7) Find the diameter of a circle whosrarea is 616m².      28m

8) Assuming that earth's equatorial diameter is 12530 km, find the circumference of the equator .      39380 km

9) Find the radius of a circle whose area is equal to the sum of the areas of three circles whose radii are 3cm, 4cm and 12cm.      13cm

10) The radius of a circle is 3m. What is the circumference of another circle, whose area is 49 times of the first ?     132m

11) A circular track has an inside circumference of 440m. if the which of the track is 7m, what is the outside circumference ?        484m

12) Find the area of a circular ring whose external and internal diameters of 20cm and 6cm respectively ?      286cm²

13) The wheel of a cart is making 2 revolutions per second. if the diameter of the wheel is 126cm, find its speed in km/hr.  Give your answer, correct to the nearest km.    29 km/hr

14) How many times will the wheel of a car rotate in a journey of 1925m, if it is known that the radius of the wheel is 49cm ?     626 times

15) A garden roller has a circumference of 3 metres . How many revolutions does it make in moving 21 m ?      7 times 

Continue......

PYTHAGORAS THEOREM 

1) A right triangle has hypotenuse length p cm and one side of the length q cm. if p - q = 1,  find the length of the third side of the triangle.     √(2q +1) cm

2) The side of certain triangles are given below. Determine which of them are right angle triangles:

a) a=6cm, b= 8cm and c= 10 cm.

b) a= 5cm, b= 8cm, c= 11cm.

3) A man goes 10m due east and then 20m due north. Find the distance from the starting point.      26m

4) A ladder is placed in such a way that its foot is at a distance of 5m from a wall and its tip reachers a window 12m above the ground. Determine the length of the ladder .     13m

5) A ladder 25m long reaches a window of a building 20m above the ground. Determine the distance of the foot of the ladder from the building.     15m

6) A ladder 15m long reaches a window which is 9m above the ground on one side of a street. Keeping its foot at the same point , the ladder is turned to other side of the street to reach a window 12m high. Find the width of the street.      21m

7) The hypotenuse of a right angle triangle is 6m more than the twice of the shortest side. if the third side is 2 m less than the hypotenuse, find the side of the triangle.    26,24 m

8) In figure ABC is a right angled at B. AD and CE are the two medians drawn from A and C respectively.

If AC= 5cm and AD= 3√5/2 cm, find the length of CE.    2√5 cm

9) In an equilateral triangle with side a, prove that 

a) altitude =a√3/2

b) area= √3a²/4.

CHORD PROPERTY 

1) The radius of a circle is 13 cm and the length of one of its chords is 10cm. Find the distance of the chord from the Centre.       12cm

2) Find the length of a chord which is at distance of 5cm from the centre of a circle of radius 13cm.     24cm

3) In the figure O is the centre of the circle of radius 5cm. OP perpendicular AB, OQ perpendicular CD, AB|| CD, AB= 6cm and CD= 8cm. Determine PQ.      1cm

4) In figure, O is the centre of the circle with radius 5cm,

OP perpendicular AB, OQ perpendicular CD, AB|| CD, AB= 6cm and CD= 8cm. Determine PQ.      7cm

5) PQ and RS are two parallel chords of a circle whose centre is O and radius is 10m. If PQ =16cm and RS= 12 cm, find the distance between PQ and RS, if they lie

a) on the same side of the centre O.       2

b) on opposite side of the centre O.       14

6) AB and CD are two parallel chords of a circle such that AB= 10cm and CD= 24cm. If the chords are on the opposite sides of the centre and the distance between them is 17cm. Find the radius of the circle.   13cm

7) AB and CD are two chords of a a circle such that AB =6cm, CD= 12cm and AB || CD. if the distance between AB and CD is 3cm,  find the radius of the circle.   6.7cm

8) Two concentric circle Centre O have A, B, C, D as the point of intersection with the line l as shown figure.

If AD =12cm and BC= 8cm,, find the length of AB, CD, BD.   2, 2, 10cm

9) Two circles of radii 10cm and 8cm unterset and the length of the common chord is 12cm, Find the distance between the centres.     13.29

CIRCLE (MENSURATION)

1) The perimeter of the figure,

a semicircle described on AB as a diameter 7.2cm. Find r the radius of the semi circle.  (π=22/7)

2) A. rectangular metal plate of the length 35 cm and of width 23cm has a circular hole of radius 7cm cut out. Find the area of the remaining portion of the plate.   (π=22/7).

3) In the adjoining figure,

the area enclosed between the concentric circles is 770 cm². Given that the radius of the outer circle is 21cm, calculate the radius of the inner circle.

4) In the adjoining figure,

ABCD is a square inscribed in a circle of radius 7cm. Calculate 

a) the area of the circle.

b) the area of the shaded portion.     (π= 22/7)

5) ABCD is a square of side 4cm.

Find the area of the shaded portion . Use π=3.14 and give your answer correct to one places of decimal.

6) Find the perimeter of the quarter of the circle whose radius is 3.5cm, correct to one decimal place.

7) A copper wire when bent in the form of a square encloses an area of 121 cm². if the same wire is bent into the form of circle, find the area of the circle.

8) A road 3.5m wide surrounds a circular plot whose circumference is 44m. Find the cost of paving the road at Rs 10 per m².

9) The diameter represents the wiper of a car. With the dimensions given in the diagram,

calculate the shaded area swept by the wiper.  (π=22/7).

10) Find the area of the adjoining figure

in sq.cm.correct to one place of decimal. (π=22/7).

11) Find a) the perimeter b) the area of a circle of radius 6.3cm.  (π=22/7).

12) Find the perimeter and area of the shaded portion of the figure,

give your answer correct to 3 significant figures.  (π=22/7).

TEST PAPER - X

TEST PAPER - 1

Section - I

1) The shadow of a flag post 25m high is 25√2m. Find the angle of elevation of the Sun.

2) A conical tent has a circular base area 0.375 hectares. if its height is 20m,  finds its capacity.

3) The sum of two radii of two circles is 18.5cm and the difference of their circumference is 22cm. Find the radius of the bigger circle.

4) OX and OY are the co-ordinate axes. AB = 6cm.

The point A slides along OX and point B slides along OY. Find the locus of the mid point of AB.

5) in the given figure

AB || CD and O is the centre of the circle. If angle BED= 35°, find angle ACD.

6) a) The line x - y = 3 divides the join of (3,4) and (8,3) in the ratio m: n. Find the ratio.

7) If A=2   0 & B= 14   0

           -3    4.         45  44

 find the value of scalar factors x and y, such that xA²+ yA= B.

8) 4x³- 12x²+ ax + b has x -3 is a factor but when it is divided by x+ 2 the reminder is -755. Find a and b.

9) A's income is Rs 140 more than B's and C's income is Rs 80 more than D's. If the ratio of A's and C's income is 2:3 and the ratio of B's and D's income is 1:2, find the income of each.

10) Three numbers are in continued proportion. Their sum is 38 and the sum of their squares is 532. Find the numbers.

11)Mrs. Mehta plans to invest Rs 8456 in shares. She partly invests in 17% shares at Rs 140 and the remaining amount in 9% share at Rs 112. Her income from the second investment is Rs 58 more than the first invesr. How much did she invest in shares at Rs 112?

Section II 

12) If the loan is returned after one year, a person would have to pay Rs6240 only. If it is returned after 2 years he would have to pay Rs 6489.60 with compound interest. Calculate the amount of loan and the rate of interest.

13) Mrs. Bhagat deposits Rs 1500 every month for 36 months in a bank and receives Rs 65655 at the end of 36 months. Find the rate of simple interest paid by the bank on the recurring deposit.

14) Solve the equation and represent it on the number line 

x/2 + 3 ≤ x/3 + 4 < 4x -7, x belongs to R.

15) From the following table, find the frequency distribution and calculate the mean marks:

Marks            no of students 

less than 8        4

Less than 16    10 

less than 24      22 

Less than 32     41 

less than 40      50 

16) Find the values of x and y if the matrices 

A= x+ y    y & B= 2 & C= 3

       2x   x- y       -1           2 with the relation AB = C.

17) Prove: sin⁶x + cos⁶x = 1 - 3 sin²x + 3 sin⁴x.

18) Two spheres of the same metal weight 1kgf and 7kgf. The radius of the smaller sphere is 2.5cm. The spheres are melted to form a single big sphere . Find the diameter of bigg sphere.

19) MT and NT are tangents to two circles . Prove that M,B,N and T are concyclic points.

(Use alternate segment property and prove that angle MBN + Angle T = 180°)

20) ∆ ABC and ∆ PQR are similar and their areas are 1089cm² and 2304 cm² respectively. If AB= 22cm, find PQ.

21) If A(3,2), B(-2,4) and C(3,-2) are the vertices of ∆ ABC, find the equation of the line perpendicular to AB and passing through the mid-point of BC.

22) The difference between the reciprocals of two consecutive multiples of 3 is 1/468. Find the numbers.

23) A man borrowed a certain sum of money. He can pay Rs 242000 after 2 years or pay Rs 292820 after 4 years to clear the debt alongwith compound interest. Find 

a) the rate percent per annum.

b) the sum borrowed.

TEST PAPER -2

1) From the adjoining histogram,

estimate the mode. Also construct the corresponding frequency distribution. Hence find the mean.

2) Find the values of x which satisfy the inequation:

-3+ x ≤ x/2 - 1/2 ≤ 5/6 + x; x belongs to N

graph solution set on the number line.

3) In the adjoining figure,

PQ is a tangent at Y, angle APQ=10°, angle BAY= 30° and XY is a diameter of the circle, Calculate the angles ABX, AXB, BYQ.

4) A hemispherical bowl of internal radius 18cm contains a liquid. This liquid is to be filled into cylindrical shaped small bottles of diameter 6cm and height 12cm. How many bottles can be filled to empty the bowl?

5) In a cricket match Sanjay took 3 wickets less than twice the number of wickets taken by Anshu. If the product of the number of wickets taken by them is 20, find the number of wickets taken by each.

6) Evaluate: {(1+ sin30)/cos30  + cos30/(1+ sin30)}²{sin²60/(1- cos²60 tan²60)}.

7) From the following frequency distribution, draw an accurate ogive:

Marks    no. of students 

1-10        10

11-20      40 

21-30      80

31-40     140

41-50     170 

51-60     130

61-70     100 

71-80       40

81- 90     20

From the ogive find 

a) What percent of the candidate pass the examination, if the pass marks is 40 ?

b) What should the pass mark be, if it is decided to 80% of the candidates to pass ?

 If scholarship are awarded to the top 15% of the students , what should be the lowest marks to gain a scholarship ?

8) The boundary of the shaded region in the given diagram consist of four half circles and two quarter circles,

if OP= PQ= OR= OS= 7cm, and the straight lines PQ and RS are perpendicular to each other, find 

a) the length of the boundary.

b) the area of the shaded region .

9) A company with 15000 shares of nominal value of Rs 100, declares annual dividend of 10% to the shareholders.

a) find the total dividend paid by the company.

b) Mukesh had bought 250 shares of the company at Rs 125 per share . Calculate the dividend he receives and the percentage return on his investment.

10) A(7,6) and B(-5,-6) are the opposite vertices of a rhombus . Find the equations of its diagonals.

11) Using ruler and compass only , draw a circle of radius 3cm,  Extend AB, a diameter of this circle to C, so that BC= 3cm.

Construct a circle to touch AB at C and to touch the circle externally .

12) If the matrices 

A= 4   1   3 & B= 3   2   4 & C= 1  & D= x

      0  -1  -3        -6    1  -3          3           y

                                                   -2

With the relation (3A - 2B)C= D then find x and y.

13) A model of a gas cylinder is made to a scale of 1:100. The gas cylinder consists of a cylindrical part and two hemispherical parts, as shown in the adjoining model.

a) The length of the model is 5 cm. Calculate the length of the cylinder in m.

b) The area of the gas cylinder is 10π m². Calculate the area of the model.

c) Calculate the volume of the gas cylinder in π  litres.

TEST PAPER -3

1) The cost price of an article is Rs 2400 which is 20% below the marked price. It is sold at a discount of 16% on the marked price. Find 

a) the marked price.

b) the selling price.

c) the profit percent.

2) A man invests Rs 15000 for two years at compound interest. After one year his money amounts to Rs 16800. Find 

a) the rate of interest.

b) the intrest for the second year.

c) in what time will it amount to Rs 18816?

3) Draw a neat diagram, showing the lines of symmetry and name each figure in the following cases:

a) a quadrilateral with two diagonals as lines of symmetry.

b) a quadrilateral which has just one line of symmetry.

c) a triangle with only one line of symmetry.

d) ABCD is a rhombus. Prove that AC is a line of symmetry of the Rhombus.

4) In the adjoining figure,

RT is the tangent at S, Prove that :

a) angle PSR= angle OQS.

b) the triangle PSR and SQT are similar.

c) PR. QT = RS. ST

d) If PS= 9cm and PQ= 15cm, Write down the value of (PR. RS)/(QT. ST).

5) A(0,4), B(3,0) are the two vertices of ∆ AOB.

a) Write down the coordinates of A', the reflection of A in the x-axis, of B' the reflection ofB in the y-axis.

b) Assign special name to the figure ABA'B'.

c) If C is the midpoint of AB, write down the coordinates of C', the reflection of C in the origin.

d) assign special name to the quadrilateral ABA'C'.

6) A copper wire when bent in the form of square encloses an area of 121cm². If the same wire is bent into form of a a circle, find the area of the circle.

7) A(2,3), B(4,5) and C(7,2) are the vertices of ∆ ABC.

a) Write down the coordinates of A', B' and C', if ∆ A'B'C' is the image of ∆ ABC when reflected in the origin.

b) Write down the coordinates of A"B" and C", if ∆ A"B"C" is the image of ∆ A'B'C' when reflected in the y-axis.

c) Assign special name to the quadrilateral BCC"B".

d) Hence find its area.

8) A tradesman marks his goods at 50% above the cost price. if he allows two successive discounts of 20% and 10%,  and GST is 5%. Find the cost price for the customer.

9) From the adjoining ∆ ABC,

prove that ∆ ABC and ∆ ABD are similar.

Hence prove that AB²= BC. BD.

If AB= 6cm, BD= 4cm and AC= 8cm, calculatethe AD.

10) The compound interest on a sum of money for 2 years is Rs 410 and the simple intrest on the same sum for the same period and at the same rate is Rs400. Find the sum and the rate of interest.

11) The diagram represents the wiper of a car with the dimensions given in the diagram. Calculate 

a) the shaded area swept by the wiper.

b) the perimeter of the shaded area.

12) A man invests Rs 4000 in shares. He invests Rs 800 in 7%(Rs 100) shares at Rs 80, Rs 11400 in 8%(Rs 100) shares at Rs 70 and the remainder in 9%(Rs 100) shares. If the total yield from his investment is 10.25% at what price did he buy the 9% shares ? Also find the yield from the investment in 9% shares.

13) The annual salaries of a group of employees are given in the following table :

Salaries       number of persons 

    45              3

    50              5

    55              8

    60              7

    65              9

    70              4 

    75              7

Calculate the mean salary. Also calculate the median salary.

14) solve the following inequation and represent the solution set on a number line 

x -3< 2x - 2 ≤ 9 - x, x belongs to N.

15) In cyclic quadrilateral ABCD,

AB|| DC, the bisectors of angle A meets CD at E and the circle at F. Prove that 

a) EF= CF.

b) ∆ BCF ≡ ∆ DEF.

16) From a solid cylinder of height 12cm and base radius 5cm, a conical cavity of the same height and base is hollowed out. Find 

a) the volume, of the remaining solid.

b) the surface, of the remaining solid.

17) A well is to be dug with 6m inside diameter and 20m in depth . Find the volume of the earth to be excavated. The earth taken out is spread all around to a width of 3 m to form an embankment . Find the height of the embankment .

18) Find the value of :

(Sun⁴30+ 2 sin²30 cos²30+ cos⁴30)(Sin²90+ cos²90+ tan²45)².

19) For the following distribution, calculate the mean:

Class     frequency

10-16        2

16-22        20

22-28       10

28-34        6

34-40       12

Draw a histogram for the above data and estimate the mode.

20) A(2,5), B(4,1) and C(2,3) are the vertices of the ∆ ABC. Calculate:

a) the equation of the median AD.

b) the equation of the attitude AM.

c) the equation of AC.

d) the coordinates of E, if E is the fourth vertex of the parallelogram ABEC.

21)  used ruler and compass only 

a) construct a circle on AB = 8cm as diameter

b) to construct another circle of radius 3cm to touch the circle in (a) above externally and the diameter AB produced.

22) If A= 1   2   0 & B= 1   3   -1 & C= 2 & D= x

                2  -1   3          2  -3    4          0          y

                                                              -1

With the relation (4A - 2B)C= D , then the value of x and y.

23) If A= 2    -1 & B= 2

                4     3         -3

Find a matrix X such that AX= B.

Test paper - 4

1) Ashok sells a watch to Bhushan at a gain 20% and Bhushan sells it to Chetan at a loss of 10% while Chetan sells to Dhiraj at 20% profit. If Dhiraj pays Rs 2592 for the watch, find the cost price of Ashok .

2) Anshu gave some money at simple interest to Anuj. At the end of 16 years he received 3 times of his loan from Anuj. Find the rate of interest.

3) The  y-axis is a line of symmetry for a figure ABCD containing the point A(3,6) and B(-3,4). State the coordinates of C and D.

4) From the adjoining figure,  prove that ∆ XYZ ~ ∆ ABC. Hence prove that

XZ/AC = √{XY/AB . YZ/BC}

Assign a special name to quadrilateral APXR.

5) in a plane, what is the locus of the point equidistant from two intersecting lines ?

 In space, what is the locus of points equidistant from the vertices of a square ?

6) Plot the points P(2,7), Q(4,-1) and R(-2,6) on a graph paper. Find the distance PR.

Draw the reflection of this triangle in the y-axis. Write down the coordinates of P'Q' and R' the images of P,Q,R respectively.

7) The boundary of the shaded region in the given diagram consists of three sem circular areas. Calculate 

a) the length of the boundary.

b) the area of the shaded region.

8) If (-3,2),(1,-2) and (5,6) are the midpoint of the sides of the triangle, find the coordinates of the vertices of the triangle.

9) A profit at 20% is made on goods when a discount of 10% is given on the marked price. What profit percent will be made, when a discount of 20% is given on the marked price ?

10) in adjoining figure, M is the midpoint of the side CD of a parallelogram ABCD. prove that EL= 2BL.

11) A sum of Rs 32800 is borrowed to be paid back in two years by two equal annual installments, allowing 5% compound interest. Find the annual payment.

12) A point P(-3,4) is reflected in the line x= 2, find its image P'. Hence find the equation of the perpendicular bisector of PP'.

13) A man transfers his Rs 100 shares from 10% at 75 to 16% at 80 and thereby increase his annual income by Rs 2000. Find the number of original shares held by him.

14) In the adjoining figure, the incircle of ∆ABC touches sides BC, CA and AB at D,E,F respectively. Show that

a) AF+ BD+ CE = AE+ BF+ CD.

15) The number of words in 70 sentences of a book were counted and grouped as follows:

No of words    CF

1-7                    22

8-14                  47

15-21                57

22-28                66

29-35                70

 Find the mean number of the words in a sentence.

16) Find the values of x, which satisfy the inequation:

2+ x ≤ 3x - 3 ≤ 5+ x; x belongs to I.

Graph the solution set on the number line.

17) Two circles cut at AB and a straight line PAQ cuts the circles at P and Q. If O is the centre of the circle through PAB and the tangents at P and Q meets in T.

Prove that 

a) angle TPA= angle ABP

b) P,B,Q,T are concyclic.

18) A solid cone is of height 12cm and the base radius 6cm. Find the radius of the circular section cut from the cone by a plane parallel to the base and 3cm from it. Hence find the volume of the remaining solid .

19) The area of a right angled triangle is 30 sq. units. If the difference between the sides containing right angle is 7 units, find the perimeter of the triangle.

20) In the adjoining diagram, ABCD is a rectangular slab 2m by 5m. What is the height of D above the ground ?

21) For the following frequency distribution, draw an ogive, hence find 

Wt in kg    no of students 

40-45          4

45-50         10

50-55         14

55-60         12

60-65          6

65-70          4

a) median 

b) the quartiles.

22) Find the equation of the line through the origin perpendicular to the line joining the points A(-1,-4) and B(7,2).

Find also the equation of the line through (3,4) and parallel to AB.

23) Draw AB= 5cm and BC= 7.5cm such that angle ABC= 90°. Find a point P which is equidistant from B and C and 5cm from A.

also construct a circle touching AB and BC and having its centre R, equidistant from B and C.

24) find the value of a and b from the matrix equation. Where 

A= 3   2 & B= a   1 & C= 4     5 

      4   1          5   b         -3     5

With the relation AB= C

in general, if AB = AC, A≠ 0, does it imply B= C ?

25) From the adjoining diagram, write down:

i) tan+90- x)

ii) tan(90- y)

in terms of a, b and h.

Hence show that 

BC= h(90- x) - tan(90- y)

If x= 30° , y= 45° and h= 10m, find BC .

26) For the adjoining model of a solid which is drawn to a scale of 1: 200, calculate:

a) the surface area in π m²

b) the volume of litres.

Test paper - 5

1) Rajesh sold was 20% profit. if it had been solved 20% loss, then the selling price would have been Rs 100 less. Find the cost price of the watch.

2) The population of a city has been increasing at the rate of 10% every 5 years. The present population is 48400. What was it 10 years ago?

3) lines l and m are lines of symmetry quadrilateral EFGH. Prove that EFGH is a rectangle.

4) In the adjoining figure MP= NP, RT perpendicular to PN and RS perpendicular to PM

Prove that RT. RM = NR. RS.

5) in a plane, what is the locus of points equidistant from the sides of an angle?

What is the locus of points equidistant from two perpendicular lines ?

6) state the coordinates of the points (4,3) after reflection in the x-axis, followed by reflection in the line x= -2.

State true or false: 'Under reflection, lines which are parallel to the mirror line, have images which are also parallel to the mirror line '.

7) A horse is teethered to one corner of a square plot of side 42m, by a rope 35m long. Find 

a) what area it can graze ?

b) what area will be left ungrazed ?

8) if the following pair of lines are perpendicular, find the value of k.

x/3+ y/7= 0 and ky = 3x + 5.

9) A shopkeeper allows 20% discount on his advertised price and then makes a profit of 25% on his outlay. What is the advertise price on which he gains Rs 8000?

10) In the adjoining figure. AD is the bisector of angle A. Prove that 

BD/DC = AB/AC.

11) A and B each borrow equal sums for 3 years at 10% simple interest and compound interest respectively. At the time of repayment B has to pay Rs 125.50 more than A. Find the sum borrowed and the interest paid by each.

12) O(0,0), A(4,3) and B(5,0) are the vertices of a ∆ OAB. Find the image A' of A under reflection in the line OB.

a) Show that OA= OB= 5.

b) Assign special name to OABA'.

C) What is the relation between angle AOB and angle A'OB ?

13) Mr Harshad invest Rs 20000. He invests Rs 9000 in 12%, 100 rupees share at Rs 75, Rs 7000 in 10% ten rupees shares at Rs 7 and the remainder in 8%, 100 rupees shares . if the total income from his investment is 14.2%, find at what price did he buy 8% shares ?

14) Find i) the mean ii) the median iii) the mode, for the following numbers, which represent the weights (in kg) of 10 new-born babies:

 3.2, 3.4, 3.8, 4.7, 3.7, 4.2, 3.8, 3, 3.5.

15) Find the value of x, satisfy the inequation: 3x - 2> x +4≤ 9; x belongs to R.

Graph the solution set on the number line.

16) A spherical lead shell of external diameter 18cm is melted into a conical vessel 14cm in radius and 31/7 cm high. Find the inner diameter of the shell.

17) x articles cost Rs (3x +20) and (x +4) similar articles cost Rs (5x -4). Find x.

18) Given that AB= 6, BC= 8, angle B= angle M= 90°, find 

a) tan angle ABM

b) sin angle ABM.

19) For the following distribution draw an ogive:

Mark    frequency 

5-9         6

10-14    15

15-19    25 

20-24    31

25-29    27

30-34    20

35-39    16

From the ogive obtain the semiinterquartile

20) Find the equation of a line parallel to the line y - 3x = 5 and bisecting the segment joining (-1,2) and (5,7).

21) Construct the rhombus ABCD in which each of the four equal sides= 3.4cm and the diagonal AC= 5.8cm using straight edge and compass only, construct:

a) the circle circumscribed to the triangle ACD,

b) the centre P, of the largest circle that can be drawn within the ∆ ACD to touch the sides of the ∆ ACD.

22) If X= 1  2 & Y= 2  0 & C= 1  2 & D= 7

                0  1          0  2          0  1          3

a) Find the matrix A and B if

a) XA= Y

b) CB = D.

23) The angle of depression of two boats at B and C on a river from the top of a tree on the bank of the river at 30° and 45°. The height of the tree is 20m and the boats are in line with the tree and on the same side of it

Find the distance BC between the boats.

24) For the adjoining model of a rocket, which is drawn to scale of 1:1500, calculate:

a) the total surface area in π m².

b) the total volume of the rocket in m³.

Test paper - 6

1) A sales a watch to B at a gain of 20% and B sales it to C at a loss of 10%. If C pays Rs 432, what did it cost to A ?

2) The amount of a certain sum with simple interest at a certain rate of interest are Rs 520 in 3 years and Rs 600 in 5 years. Find the sum and the rate of interest.

3) Draw all the lines of symmetry of the adjoining regular hexagon.

 What is the image of P under a clockwise rotation of 180° above O ?

What is the magnitude of angle POS

4) In the adjoining diagram, AP= 3, PQ= 4, BC= 6 and PQ is parallel to BC. Calculate 

a) PB 

b) PQ/BC . AM/AN

5) a) State the locus of the centre of a circle of radius 2cm touching a fixed circle of radius 3cm,  Centre A.

b) State the locus of the centre of a circle of varying radius touching two arms of angle ABC.

6) A point P is reflected in the origin. Coordinates of its image are (-3,2).

a) find the coordinates of P.

b) Find the coordinate of the image P under the reflection the y-axis.

7) Calculate the area of the shaded part of the semicircle in the adjoining diagram, given BC= 20cm. AC =12cm π= 3.142).

8) Points A, B and C have coordinates (1,2), (1,0), (4,0). If ABCD is a parallelogram. Find the coordinates of D.

9) Vishal marks his goods at such a price that he can reduce 20% for cash and yet makes 28% profit. What is the marked price of the article, which cost him Rs 250?

10) In the adjoining diagram, AB, CD and EF are parallel lines. Given that AB= 9cm, CD= y cm, EF= 15cm, AC= 6 cm and CF= x cm, calculate 

a) x b) y. c) BC. BE d) BD: DF.

11) A sum of money lent out at simple interest amounts to Rs 7000 in 5 years and to Rs 7800 in 7 years. Find the sum and the rete percent .

12) A and B have coordinates (4,3) and (0,0).  Find :

a) the image A' of A under reflection in the y-axis.

b) the image B' of B under reflection in the line AA'.

c) Calculate the length of A'B'.

13) A man invests Rs 8000 in a company paying 8% p.a, when a share of face value of Rs 100 is selling at Rs 60 premium.

a) what is annual income ?

b) what percentage does he get on his money ?

14) From the adjoining diagram, calculate:

a) angle DCA b) angle ACB

15) Calculate the mean and the medium for the following distribution:

number    frequency 

10              20

15              12

20               8 

25              10 

30               9 

35               1

16) Find the values of x, which satisfy the inequation:

x - 5/2≤ 1+ x/3 ≤ x + 1/3, x belongs to W

graph the solution set on the number line.

17) In the diagram, ABCD is a parallelogram and AB is a diameter. If angle BCE=50°,  Calculate 

a) angles BED, ABD, AID.

18) water flows through a circular pipe of internal radius 7cm per second. if the pipe is always half full, find the number of litres discharged in 10 minutes.

19) a man buys a identical articles for a total cost Rs 20. If the price of each article was increased by Rs 2, he would be able to buy two less than the original number for Rs 18. Obtain on equation for x and solve it.

20) a) Evaluate sin 60 + cos 30 + tan²30 sin 90.

b) verify : tan60= (2 tan39)/(1 - tan²30).

21) using the data given below construct the cumulative frequency table and draw the ogive. From the ogive determine.

a) the median 

b) the interquartile range 

Mass   no of packets

60-70        2 

70-80        5 

80-90       12 

90-100     10

100-110    8

110-120    3 

22) The coordinates of P,Q,R. the vertices of a triangle PQR are (1,1),(5,4),(4,0). if the altitude through P meets QR in X, find 

a) the gradient of PX

b) the equation of PX.

23) If A= 2  12 & B= 4   x

                0   1           0   1 

find the value of x that A²= B.

24) If A= 2  1 & B= x & C= 6

               -4. 3          y          8 with the relation AB= C.

25) From the adjoining figure, calculate the height of the tower, correct to the nearest cm.

Test paper -7

Section - A

1) The cost price of 30 eggs is equal to the selling price of 20 eggs. Find the profit percent.

2) The amount of a certain sum with simple interest at a certain rate of interest is Rs 520 in 3 years and 600 in 5 years. Find the sum and the rate of interest.

3) PQRSTU is a regular hexagon with Centre O.

a) What is the image of P under the reflection in the line RU ?

b) also draw all its lines of symmetry.

c) does the hexagon have a point symmetry ?

d) write down the magnitude of angle POT.

4) for the adjoining trapezium,

AB= 4cm , DC= 6cm, PC=  7.5 cm, find 

a) AP b) DP: PB c) AD: BC

5) P is a moving point in the plane of ∆ ABC. State the locus of P in the following cases:

a) PA= PC

b) P is equidistant from AB and BC.

c) P is equidistant from AB and AC 

Assign special name to a point P, satisfying koci in (b) and (c(.

6) Find the coordinates of the image of (3,1) under reflection in the x-axis followed by reflection in the line x= 1.

7) ABCD represents a flower bed if OA= 28 m and OD= 21m,

find

a) the area of the flower bed.

b) the perimeter of the flower bed .

8) The lines represented by 2x + 5y= 1 and px + 2y= 2 are perpendicular. Find the value of p.

9) A shopkeeper makes his goods at such a price that after allowing a discount of 25/2% for cash payment, he still make a profit of 10%. Find the marked price of an article which cost him Rs 45.

10) If N is the midpoint of AB in the diagram, and triangle ABC has an area 20cm²,

find:

a) the area of ∆ AMN.

b) The area of ∆ NMC.

11) A certain sum amounts to Rs 4640 in 2 years and Rs 4960 in 3 years . Find the principal and the rate percent at SI.

12) A frustum of a cone has diameter of 6cm and 18cm and a slant height of 10cm.

Calculate the height of the cone of which the frustrum is a part.

Section - B

13) a man invests Rs 10080 in 6%, 100 rupees shares at Rs 112. finds his annual income. When the shares fall to Rs 96. He sales out the shares and invests the proceeds in 10%, Rs 10 shares at Rs 8. Find his change in annual income.

14) Calculate the mean for the following distribution, using shortcut method :

marks   students 

10-20       6 

20-30       8

30-40      12

40-50      15

50- 60     10

60-70        9

15) Find the solution set of the inequation:

1≤ x - 3/2 ≤ 5/2; x belongs to R.

graph the solution set on the real number line.

16) in the adjoining figure O is the centre of the circle and ABCD is a parallelogram.

If angle B= 52,

calculate 

Angles BEC, EOD, ECD

17) From a solid cylinder of height 4cm and base radius 3 cm, a conical cavity of the same height and base hollowed out. Find the surface area of the remaining solid. Leave your answer in terms of π.

18) 3 years ago Amit's agge was 6 times the square of his son's age. 6 years hence his age will be three times of his son's age. Find their percentage ages.

19) If A= 60°, B= 30°,  Prove the following:

a) cos(A+ B) cos(A - B)= cos²A - sin²B.

b) sin(A+ B) sin(A - B)= sin²A - sin²B.

20) For the following frequency distribution, draw an ogive:

Marks. No of students 

00-10    30

11-20    50

21-30    100

31-40    150

41-50    150

51-60    130

61-70     90

71-80     60

81-90     30

91-100   10

use your ogive to determine 

a) the median mark

b) the percentage of candidate that fails, if the pass marks is 50 .

c) the lower and upper quartile .

21) if the midpoint of the portion of a line between the coordinates axes is (-3,4),find equation of the line.

22) If A= 0     -1

                1      0, then show that 

A²= 1    0

        0    1 

23) If A= -1     -1

                 0      0, then show that A³= A.

24) At the foot of a mountain the elevation of its summit is found in 45°. After ascending 1000m towards the mountain up a slope of 30° inclination the elevation is found to be 60°. Find the height of the mountain.

 

Test paper - 8

Section - A

1) Vishal sold his radio set at 10% loss. If he sold it for Rs 45 more, he would have made 5% profit. Find the selling price of the radio.

2) The sum of Rs 1500 was lent in such a way that its certain part was lent at 10% per annum and the remaining part 7% per annum. The total simple interest earned in 3 years was Rs 396. Find the sum lent at each rate.

3) Prove that for an isosceles triangle, the perpendicular bisectors of the base is a line of symmetry.

4) From the adjoining diagram, prove that DE bisects angle ADC.

Hence calculate the length CE, given that AD= 3cm, AE= 2.6cm and DC= 5cm

Write down the ratio AD: DB.

5) Draw a line AB of length 6cm. Mark the mid-point M. Construct 

a) the locus of points 3cm of AB.

b) the locus of points 5cm from M.

Mark two points P and Q satisfying the above loci.

Measure the distance between P and Q.

6) Find the coordinates of the image of (-2,-3) under reflection in the line y= -1, followed by reflection in the y-axis.

7) The co-ordinates of A,B,C of a rectangle ABCD are (0,2),(-2,0),(1, 3) respectively. Find the coordinates of D.

also find the area of the rectangle.

8) Two dealer offer an article at the same list price. The first allows discount of 25% and 15%, the other allows 30% and 10%. which is better offer ?

9) From the adjoining diagram,

a) prove that ∆ ADB and ∆ BDC are similar.

n) prove that BD²= AD. DC

c) prove that BC²= DC. CA.

d) find ∆ ABC : ∆ BDC.

10) If Rs 50000 amount to Rs 73205 in 4 years, find the rate of compound interest payable yearly.

11) If point A is reflected in the y-axis, coordinates of its image are (4,-3).

a) Find the coordinates of A.

b) Find the coordinates of A under reflection in the line x= -2.

Section -B

12) A man buys 400 ten rupees shares at a premium Rs2.5 each share. If the rate of dividend is 8%. find

a) his investment.

b) dividend received 

c) yield

13) Water flows through a circular pipe of internal radius 7cm at 5 m per second. if the pipe is always half full. find the number of litres discharge in 10 minutes.

14) for the following distribution, construct the cumulative frequency tube and draw the ogive.

Class     frequency 

00-02      17

03-045    22

06-08      29

09-11      18

12-14        9

15-17        5

From the ogive determine 

a) the medium 

b) the quartiles

c) 

15) From the adjoining diagram 

a) calculate x, if y= 2x.

b) prove that ∆ ADE is an isosceles, if y= 90.

16) A cylindrical tube with open ends of uniform thickness is made of copper. The tube has external diameter 10cm and internal diameter 7cm and is 28cm long, if the copper weight is 8.9 gm/cm³, calculate the weight of the tube in kg, correct to the nearest gm.

17) A journey of 450km would take 1 hour less, if the speed is increased by 5 kmph. Find the usual speed.

18) If tanx - 3 = 0, find 

a) cosx.

b) (sin²x + cos²x)².

c) the value of x, if the angle x is acute.

d) State the value of sin90 cos90 tan45.

19) Draw a histogram for the following:

Marks   no of students 

00-10      6

10-20      8

20-30     12

30-40      8

40-50      6

Hence find the mode.

20) The ordinate of the point P and Q are (-1, 2) and (2,4) respectively. Find 

a) the gradient of PQ.

b) the inquation of PQ.

c) the co-ordinates of the point, where the line PQ intersect the y axis.

21) using ruler compass only, draw an equilateral triangle of side 6cm and draw its incircle. Measure the radius of the circle.

22) find x and y if the relation AB= C

a) A= 3   5 & B= x & C= 2

      1   2              y          8

b) A= x.   3 & B= 2 & C= 5

          1    y          -1         0

23) Find the height of the adjourning church .

24) find the slope of the line 11x - 10y = 13.

Teest paper - 9

Section - A

1) Ajay made a profit of 20% when selling a TV set at Rs 3000. If he has to now pay Rs 500 more for the set, what should be his new selling price in order to make the same percentage profit?

2) At what rate percent per annum will Rs2560 amount to Rs 6250 in four years at compound interest?

3) Draw a regular Pentagon. Does it have line/s of symmetry ? If yes , draw the line/s of symmetry .

4) Using ruler and compass only, construct an isosceles triangle ABC, whose base BC= 6cm and vertex angle BAC=30°(without calculating the base angles ). Hence or otherwise draw circumcircle of ∆ ABC.

5) In the adjoining figure,

if AB= AC, then show that BC= DC.

6) State the coordinates of the point (2,3) after reflection in 

a) the line x= 0

b) the line y= 0.

c) the origin.

7) Show that (2,-2),(8,4),(5,7) and (-1,1) are the vertices of a rectangle.

8) Mr Joshi, a tradesman marks his goods at 25% above the cost price. if he allows his customers 10% discount, how much profit% does does he make ?

9) BM and CN are the altitude from B and C respectively to the opposite sides of a triangle BC. Prove that:

a) AB/AC = BM/CN = AM/AN.

b) BN/MC . PN/MP = BP²/CP².

10) A shopkeeper buys 180 articles at Rs 40 each from a wholesaler. He fixes the selling price per article to give him a profit of 40% of the cost price and selling 2/5 of the article at this price. He then lowers the selling price per article so that the profit is only 25% of the cost price. Find his total profit, if all the articles are sold.

11)  A race track is an form of a circular ring whose inner circumference is 440m and the outer circumference is 506m.  Find the width of the track and also area of the track. (π= 22/7)

Section - B

12) Mrs. Shah invests Rs 4800 in shares of a company which was paying 8% dividend at the time when Rs 100 shares were available at Rs 60 premium. Find 

a) her annual income from the shares .

b) the rate of interest she gets from her investment.

13) The following data shows a record of weight of 200 students in kg. Draw an ogive for this distribution.

Wt in kg    no of students 

40-45.        5

45-50        17

50-55        22

55-60        45

60-65        51

65-70        31

70-75        20

75-80         9

Use the ogive to estimate 

a) what fraction of the students weigh 55 kg or above ?

b) what is the weight above which we can find the heftiest 30% of the students ?

14) Solve the following inequation and represent the solution set on the number line : -20≤ 2x - 24 ≤ 16 - 3x, x belongs to W.

15) A rectangular vessel is 40 cm x 16 cm x 11cm and is full of water. This water is poured into a conical vessel of base radius 20cm. If the vessel is completed filled,  find the height of the conical vessel .

16) a journey of 192 km from Bombay to Pune takes two hours less by a fast train than by a slow train. if the average speed of the slow train is 16 kmph less than that of the first train , find the average speed of each train.

17) In the adjoining figure

AB|| EC sides AD and BC are 4cm each and perpendicular to AB. Given that angle AED= 60°, angle ACD= 45° find 

Ai) AB ii) AC iii) AE.

18) A(2,5) and B(4,1) are two points. Find the equation of the perpendicular bisector of AB. Find the intercepted made by the perpendicular bisector on the axis.

19) Draw two circles with radius 3cm and 5cm with their centres 8 cm apart. Draw a direct common tangent and hence find its length.

20) 

If A= 0  1  -1 & B= 1  2  3  & C= 1 -1  1

       -1   0   2          2   3 1          -1  1 -1

        0   2  -2                                1 -1  1

Verify that (BC)A= B(CA).

Test paper - 10

Section - A

1) A merchant buys 200 kg of rice at Rs 1.25 per kilogram, 400 kilogram of rice at 75 paise per kilogram. He mixes them and sells one third of the mixture at 1 rupee per kilogram. At what rate should he sell the remaining mixture so that he may earn a profit of 20% on the whole outlay.

2) the compound interest on a sum of money for 2 years is Rs 410 and the simple interest on the same sum for the same period and aat the same rate is Rs 400. Find the sum of the rate percent ?

3) in the adjoining diagram. AB is a diameter of a circle of radius 10cm, BC =12 cm, CD= 5cm.

a) calculate the lengths of BD and DA.

b) calculate the lengths of DE and AE.

c) Name a pair of similar triangles in the diagram.

d) find ∆ ADE ~ ∆ BDC.

4) State the locuss of the centre of a circle of varying radius, touching fixed lines BC and BD. if angle CBD=45°, draw the locus.

5) A is (6,-1) what are the co-ordinates of the image of a A under reflection in the x-axis followed by reflection in the y-axis ?

6) In the figure diameter of the biggest semi circle is 216cn and diameter of the smallest circle is 72cm. Calculate the area of the shaded portion.

7) If the following pairs of lines are perpendicular, find p, 2y - px =3 and 5y+ 2x =7.

8) a bicycle agent allows 25% discount on his advertisement price and then makes profit of 20% of his outlay. What is the advertised price on which he gains Rs 40.

9) The median BD, CE of a triangle ABC meet at G.

a) prove that the triangle EGD and CGB are similar, hence show that CG= 2GE.

b) prove that AE. AC = AB. AD.

10) find the compound interest on Rs4000 for 3/2 years at 8% p.a, if interest is compounded semi annually.

11) Find the coordinate of the image of (-1,-2) under reflection in the line x= -1 followed by reflection in the y axis.

Section - B

12) A man invests Rs 5400 in 6% Rs 100 shares at Rs 112. Find his annual income. When the shares fall to Rs 96, he sales out the shares and Invests the proceeds in 10% Rs 10 shares at Rs 8. Find his change in annual income.

13) in the ad 0joining diagram: PS = SQ, angle QPS= 54, angel SRQ= 26. Find angle TQR, RTQ

14) in a class test the marks of 30 peoples were:

6, 5, 3,4,5, 5, 8, 3, 1, 4,3, 6,4, 5, 8, 5, 4, 2, 3, 4, 4, 7, 4, 2, 5, 4, 7, 9, 8, 10  .find 

a) the mean

b) the mode

c) the median 

15) If x belongs to R, find the solution set for the following inequation.

25x²≥ 16

Represent the solution set on a number line.

16) In the adjoining diagram, if angle ABC=50°,

Calculate angle CXO

b) Angle AOC

Hence prove that AXCO is a cyclic quadrilateral.

17) The dimension of the hut closed at both ends, are shown in the adjoining figure. Calculate 

a) the volume of the hut.

b) The total surface, excluding the floor.

Given AB= 12m, BC= 20m, CD= 10m, PM= 8m and PR= PS.

18) Find the area of the rectangular plot of ground whose perimeter is 68m and whose diagonal is 26m,

19) Evaluate :

(Sin²60°+ cos²45)/(Tan²60 - son90 cos90).

20) draw a histogram to illustrate the marks of 100 students in an examination.

Marks  no of students 

00-09     12 

10-19     16

20-29     34 

30-39     24

40-49     14 

Hence estimate the mode.

21)  Find the equation of the line joining (-2,3) and (1,-2). If the above line passes through (4, k), find k.

22) If A= sinx     cosx

                cosx   - sinx  show that A²= I.

I is unit Matrix and x =90°

23) a man 2 m tall is 50m away from a building 40m high. What is the angle of elevation of the top of the building, from his eye ?

Test paper- 11

Section - A 

1) A man sold his watch at a loss of 5%. Had he sold it for Rs 56.25 more he would have gained 10%. Find the cost price of the watch.

2) Find the sum which amounts to Rs 4410 at 10% compound interest for 3/2 years, interest calculated half yearly.

3) In the adjoining ∆ ABC, PR|| CA and RQ||BC. if BP= 15cm, PC=  20cm, AQ= 16cm and BR= 18 cm, calculate 

a) AR

b) QC

c) RQ/BC. AR/ABA.

4) PQ is a line of length 8 cm. State the locus of the sense of the circle if its radius is 3 cm and it touches PQ. Draw the locus completely.

5) The boundary of the shaded region in the given diagram consists of 5 semi circular areas, calculate 

a) the length of the boundary.

b) the area of the shaded region correct to the nearest square metre.

6) if the point (-5, a)(-1,5) and (7,1) are collinear, find a.

7) A tradesman marks his goods at 25% above cost price. If he allows his customers 10% discount, how much percent profit does he make ?

8) in the adjoining trapezium PQRS , PQ=12cm, RS= 24 cm, RT= 18cm, PL= 8cmQR= 20cm. , Calculate 

a) RM

b) PT

c) LM.

9) A man invests Rs 4000 in 10% Rs 100 shares at Rs 125.

Find 

a) his annual dividend 

b)  the rate of interest on is investment.

10) in the adjoining diagram, AB and XY are diameters of a circle, with Centre 0.

If angle APX = 30°, 

a) angle AOX, APY, BPY, OAX

Prove that arc AX= arc BY.

11) Calculate the mean of the following distribution, using short-cut method.

marks        students

10-20           6 

20-30          12

40-50          15

50-60          10 

60-70           9 

12) Find the solution set of 2≤3(x -2)+5< 2x +5; x belongs to W. represent the solution set on a number line.

13) In the adjoining diagram AB= Cd and angle ABC= 132, calculate 

a) angle BAC, AEB, AED, COD

14) A metal pipe of thickness 1cm has an external diameter of 28 cm. Find the volume of metal in 3.5m of the pipe.

15) The length of a rectangle is 3cm greater than its width and the area of the rectangle is 108cm². Find the length.

16) The vertices of a ∆ ABC are A(-1,2, B(2,1) and C(0,4). Find the equation of the median AM.

17) Draw two circles of radius 3cm and 2cm touching each other externally . Draw an arc of a circle of radius 7cm to touch these two circles .

18) If A= 3      1

               -1      2

Find the value of A²- 5A + 7I, where I is the unit matrix of order two.

19) If A= 1   -1 & B= 4   5 & C= 2    7

                2   -2          3    3         1    5

Verify AB= AC.

TEST PAPER 12

1) The cost of the type-setting for a book is Rs 1200. The cost of paper binding etc., Rs 150 per hundred copies. 1000 copies are printed and only 850 copies are sold at the rate of Rs 10 each , the remaining copies are given as free specimen to the institutions . Find the profit percent on the whole transaction.

2) A man borrows Rs 6000 at 50% compound interest . If he repays Rs 1500 at the end each year. Find the amount of loan outstanding at the end of the fourth year.

3) In the adjoining trapezium, if OB: OD=  1:2, write down 

a) DO: BD

b) AO: AC.

c) DC: AB

d) BD: BO.

4) Find the coordinates of the image of (-2, -3) under:

a) reflection in the x-axis 

b) reflection in the origin 

c) reflection in the line y= -1, followed by reflection in the y-axis.

5) A circular road runs round a circular of diameter 14m. if the  difference between the circumference of the outer circle and the inner circle is 88m.  Find 

a) the width of the road.

b) the area of the road.

6) State the reasons whether the lines : 2x + 3y= 6 and 6x = 5+ 4y are parallel or perpendicular to each other. Write down the intercepts made by each line on the axes.

7) A dealer is selling an article at a discount of 20%.

a) what is the selling price, if the market price is Rs 300 ?

b) what is the cost price, if he makes 20% profit.

8) A(-2,4) and B(-4,2) are reflected in the y-axis.

If A' and B' are images of A and B respectively, find the coordinates of A' and B'. Assign special name to AA'BB' . state whether AB'= BA'.

9) Find the principal for which the difference of compound and simple interest in 2 years at 10% per annum is Rs 40. Hence find find the compound interest at the end of 3/2 years. if the compound is payble half yearly.

Section - B

11) Which is better investment: 7% Rs 100 shares at Rs 120 or 8% Rs 10 shares at Rs 13.50 ?

12)  P and Q have coordinates (3,2) and (7,6) respectively, write down:

a) the gradient of PQ.

b) the equation of the perpendicular bisector of PQ.

c) the values of a, if (1,a) lies on the perpendicular bisector of PQ .

13) For the following distribution draw an ogive:

Age    no of students 

25-31     15 

31-37.    18

37-43     20 

43-49     13

49-55      4 

from the ogive 

a)state the median age.

b) state the age 20% of the teachers exceed.

14) Find the value of x, which satisfy the inequation;

(x +3)(x -5)≤ (x -2)(x +4), x belongs to Z.

15) In the adjoining circle, AC is a diameter, TC is a tangent. BD = CD and angle DCT= 50. Calculate:

AnglesnDAC, DAB, DCB.

16) A journey of 600km would take 6 hours less, if the speed is increased by 5 kmph. Find the usual speed.

TEST PAPER - 13

S