Mathematics Standard Official Delhi set 3 2024-2025 English Medium Class 10 Question Paper Solution

A 30 m long rope is tightly stretched and tied from the top of the pole to the ground. If the rope makes an angle of 60° with the ground, the height of the pole is ______.

`10sqrt3` m

`30sqrt3` m

15 m

`15sqrt3` m

On the top face of the wooden cube of side 7 cm, hemispherical depressions of radius 0.35 cm are to be formed by taking out the wood. The maximum number of depressions that can be formed is ______.

400

100

20

10

The cumulative frequency for calculating median is obtained by adding the frequencies of all the ______.

classes up to the median class

classes following the median class

classes preceding the median class

all classes

If the mode and median of the given set of observations are 13 and 11, respectively, then the value of the mean is ______.

17

7

10

28

In the adjoining figure, AC is the diameter of the larger circle with centre O. AB is tangent to the smaller circle with centre O. If OD = r, then BC is equal to:

r

`(3r)/2`

2r

4r

A parallelogram having one of its sides 5 cm circumscribes a circle. The perimeter of a parallelogram is ______.

20 cm

less than 20 cm

more than 20 cm but less than 40 cm

40 cm

E and F are points on the sides AB and AC, respectively, of a ΔABC, such that `(AE)/(EB) = (AF)/(FC) = 1/2`. Which of the following relations is true?

EF = 2BC

BC = 2EF

EF = 3ВС

BC = 3EF

Which of the following statements is true for a polynomial p(x) of degree 3?

p(x) has at most two distinct zeroes.

p(x) has at least two distinct zeroes.

p(x) has exactly three distinct zeroes.

p(x) has at most three distinct zeroes.

Letters A to F are mentioned on six faces of a die such that each face has a different letter. Two such dice are thrown simultaneously. The probability that vowels turn up on both dice is ______.

`1/4`

`1/3`

`1/9`

`1/36`

If x = ab³ and y = a³b, where a and b are prime numbers, then [HCF (x, y) – LCM (x, y)] is equal to ______.

1 − a³b³

ab (1 − ab)

ab − a⁴b⁴

ab (1− ab) (1 + ab)

`(1 + sqrt3)^2 -  (1 - sqrt3)^2` is ______.

a positive rational number

a negative integer

a positive irrational number

a negative irrational number

The value of ‘a’ for which ax² + x + a = 0 has equal and positive roots is ______.

2

−2

`1/2`

`-1/2`

The distance of point P(1, –1) from the x-axis is ______.

1

–1

0

`sqrt2`

The number of red balls in a bag is 10 more than the number of black balls. If the probability of drawing a red ball at random from this bag is `3/5`, then the total number of balls in the bag is ______.

50

60

80

40

The value of ‘p’ for which the equations px + 3y = p − 3, 12x + py = p has infinitely many solutions is ______.

−6 only

6 only

± 6

Any real number except ± 6.

ΔABC and ΔPQR are shown in the adjoining figures. The measure of ∠C is:

140°

80°

60°

40°

sec A = 2 cos A is true for A = ______.

0°

30°

45°

60°

Which of the following statement is true?

sin 20° > sin 70°

sin 20° > cos 20°

cos 20° > cos 70°

tan 20° > tan 70°

Assertion (A): Tangents drawn at the end points of a diameter of a circle are always parallel to each other.

Reason (R): The lengths of tangents drawn to a circle from a point outside the circle are always equal.

Both Assertion (A) and Reason (R) are true, and Reason (R) is the correct explanation of Assertion (A).

Both Assertion (A) and Reason (R) are true, but Reason (R) is not the correct explanation of Assertion (A).

Assertion (A) is true, but Reason (R) is false.

Assertion (A) is false, but Reason (R) is true.

Assertion (A): The Unit digit of 3ⁿ cannot be an even number for any natural number n.

Reason (R): 2 is not a prime factor of 3ⁿ for any natural number n.

Both Assertion (A) and Reason (R) are true, and Reason (R) is the correct explanation of the Assertion (A).

Both Assertion (A) and Reason (R) are true, but Reason (R) is not the correct explanation of the Assertion (A).

Assertion (A) is true, but Reason (R) is false.

Assertion (A) is false, but Reason (R) is true.

A 1.5 m tall boy is walking away from the base of a lamp post which is 12 m high, at the speed of 2.5 m/sec. Find the length of his shadow after 3 seconds.

In the parallelogram ABCD, side AD is produced at point E, and BE intersects CD at point F. Prove that ΔABE ∼ ΔCFB.

Find the coordinates of the point C, which lies on the line AB produced such that AC = 2BС, where the coordinates of points A and B are (–1, 7) and (4, –3), respectively.

Find the value of x for which (sin A + cosec A)² + (cos A + sec A)² = x + tan² A + cot² A.

Evaluate the following:

`(3 sin 30° - 4 sin^3 30°)/(2 sin^2 50° + 2 cos^2 50°)`

Renu and Simran were born in the year 2000, which is a leap year. Find the probability that:

1. Both have the same birthday.
2. Both have different birthdays.

Solve the following system of equations algebraically:

73x − 37y = 109

37x − 73y = 1

Р(x, y), Q(–2, –3), and R(2, 3) are the vertices of a right triangle PQR right-angled at P. Find the relationship between x and y. Hence, find all possible values of x for which y = 2.

Prove that `(cosA + sinA - 1)/(cosA - sinA + 1)` = cosec A − cot A.

If cot θ + cos θ = p and cot θ − cos θ = q, prove that `p^2 - q^2 = 4sqrt(pq)`.

If α and β are the zeroes of the polynomial ax² − x + c. Obtain a polynomial whose zeroes are α − 3 and β − 3.

Rectangle ABCD circumscribes the circle of radius 10 cm. Prove that ABCD is a square. Hence, find the perimeter of ABCD.

Prove that `sqrt(2)` is an irrational number.

Let x and y be two distinct prime numbers, and p = x²y³, q = xy⁴, r = x⁵y². Find the HCF and LCM of p, q, and r. Further check if HCF (p, q, r) × LCM (p, q, r) = p × q× r or not.

The perimeter of a rectangle is 70 cm. The length of the rectangle is 5 cm more than twice its breadth. Express the given situation as a system of linear equations in two variables and hence solve it.

The corresponding sides of ΔABC and ΔPQR are in the ratio 3 : 5. AD ⊥ BC and PS ⊥ QR, as shown in the following figures:

1. Prove that ΔADC ~ ΔPSR.
2. If AD = 4 cm, find the length of PS.
3. Using (ii) find ar(ΔABC) : ar(ΔPQR).

State the basic proportionality theorem. Use it to prove the following:

If three parallel lines l, m, n are intersected by transversals q and s as shown in the adjoining figure, then `(AB)/(BC) = (DE)/(EF)`.

A bat manufacturing company made a huge bat for charity and got it signed by the World Cup-winning team.

The dimensions of the bat, which is in the form of a cuboid with a cylindrical handle at the top, are as follows:

Length = 2 m, width = 0.5 m, thickness = 0.1 m

Diameter of cylindrical part = 0.1 m

Height of cylindrical part = 0.7 m

Find the volume of wood used in the bat. Also, find the total surface area of the wooden bat.

The following table shows the absentee records of 40 students in an academic year:

Find the ‘mean’ and ‘mode’ of the above data.

The sides of a right triangle are such that the longest side is 4 m more than the shortest side and the third side is 2 m less than the longest side. Find the length of each side of the triangle. Also, find the difference between the numerical values of the area and the perimeter of the given triangle.

Express the equation `(x - 2)/(x - 3) + (x - 4)/(x - 5) = 10/3`; (x ≠ 3, 5) as a quadratic equation in standard form. Hence, find the roots of the equation so formed.

Based on the above information, answer the following questions:

1. Represent the above situation with the help of a diagram. (1)
2. Find the distance between the ambulance and the site of the accident (P) at the particular instant. (Use `sqrt3` = 1.73) (1)
3. 1. Find the time (in seconds) in which the angle of depression changes from 30° to 45°. (2)
      OR
   2. How long (in seconds) will the ambulance take to reach point P from a point T on the highway, such that the angle of depression of the ambulance at T is 60° from the drone? (2)

Based on the above information, answer the following questions:

1. Find the radius of each circular ring. (1)
2. What is the measure of ∠AOB? (1)
3. 1. Find the area of the shaded region R₁. (2)
      OR
   2. Find the length of rope around the unshaded regions. (2)

Based on the above information, answer the following questions using arithmetic progression:

1. Find the distance of the 10^th pole from the base. (1)
2. Find the distance between the 15^th pole and the 25^th pole. (1)
3. 1. Find the time taken by the cable car to reach the 15^th pole from the top if it is moving at the speed of 5 m/sec and coming from the top. (2)
      OR
   2. Find the total number of poles installed along the entire journey. (2)