Mathematics Standard - Outside Delhi set 3 2019-2020 English Medium Class 10 Question Paper Solution

The sum of exponents of prime factors in the prime-factorisation of 196 is ______.

3

4

5

2

Euclid’s division Lemma states that for two positive integers a and b, there exists unique integer q and r satisfying a = bq + r, and ______.

0 < r < b

0 < r ≤ b

0 ≤ r < b

0 ≤ r ≤ b

The zeroes of the polynomial x² – 3x – m (m + 3) are ______.

m, m + 3

– m, m + 3

m, – (m + 3)

– m, – (m + 3)

The value of k for which the system of linear equations x + 2y = 3, 5x + ky + 7 = 0 is inconsistent is ______.

`- 14/3`

`2/5`

5

10

The roots of the quadratic equation x² – 0.04 = 0 are ______.

± 0.2

± 0.02

0.4

2

The common difference of the A.P. `1/p, (1 - p)/p, (1 - 2p)/p`, ... is ______.

1

`1/p`

–1

`- 1/p`

The n^th term of the A.P. a, 3a, 5a, ... is ______.

na

(2n – 1)a

(2n + 1)a

2na

The point P on x-axis equidistant from the points A(–1, 0) and B(5, 0) is ______.

(2, 0)

(0, 2)

(3, 0)

(2, 2)

The co-ordinates of the point which is reflection of point (–3, 5) in x-axis are ______.

(3, 5)

(3, –5)

(–3, –5)

(–3, 5)

If the point P(6, 2) divides the line segment joining A(6, 5) and B(4, y) in the ratio 3 : 1, then the value of y is ______.

4

3

2

1

In figure, MN || BC and AM : MB = 1 : 2, then `(ar(ΔAMN))/(ar(ΔABC))` = ______.

In given figure, the length PB = ______ cm.

In ΔABC, AB = `6sqrt(3)` cm, AC = 12 cm and BC = 6 cm, then B = ______.

Two triangles are similar if their corresponding sides are ______.

The value of (tan 1° tan 2° ...... tan 89°) is equal to ______.

The value of sin 32° cos 58° + cos 32° sin 58° is ______.

The value of `(tan 35^circ)/(cot 55^circ) + (cot 78^circ)/(tan 12^circ)` is ______.

If sin A + sin² A = 1, then find the value of the expression (cos² A + cos⁴ A).

In the following figure is a sector of circle of radius 10.5 cm. Find the perimeter of the sector. `("Take"  π = 22/7)`

If a number x is chosen at random from the numbers –3, –2, –1, 0, 1, 2, 3, then find the probability of x² < 4.

What is the probability that a randomly taken leap year has 52 Sundays?

Find the area of the sector of a circle of radius 6 cm whose central angle is 30°. (Take π = 3.14)

Find the class marks of the classes 20 – 50 and 35 – 60.

Answer the following question:

1. How many of the above ten, are not polynomials?   [1]
2. How man of the above ten, are quadratic polynomials?   [1]

In the following figure, ABC and DBC are two triangles on the same base BC. If AD intersects B at O, show that `(ar(ΔABC))/(ar(ΔDBC)) = (AO)/(DO)`

In the following figure, if AD ⊥ BC, then prove that AB² + CD² = BD² + AC².

Prove that `1 + (cot^2 α)/(1 + "cosec"  α) = "cosec"  α`

Show that tan⁴θ + tan²θ = sec⁴θ – sec²θ

The volume of a right circular cylinder with its height equal to the radius is `25 1/7` cm³. Find the height of the cylinder.

Find the mode of the following frequency distribution:

From a solid right circular cylinder of height 14 cm and base radius 6 cm, a right circular cone of same height and same base removed. Find the volume of the remaining solid.

If 2x + y = 23 and 4x – y = 19, find the values of (5y – 2x) and `(y/x - 2)`.

Solve for x: `1/(x + 4) - 1/(x + 7) = 11/30, x ≠ - 4, 7`.

Show that the sum of all terms of an A.P. whose first term is a, the second term is b and the let term is c is equal to `((a + c)(b + c - 2a))/(2(b - a))`.

Solve the equation: 1 + 4 + 7 + 10 + ... + x = 287.

In a flight of 600 km, an aircraft was slowed due to bad weather. Its average speed for the trip was reduce by 200 km/hr and time of flight increased by 30 minutes. Find the original duration of flight.

If the mid-point of the line segment joining the points A(3, 4) and B(k, 6) is P(x, y) and x + y – 10 = 0, find the value of k.

Find the area of triangle ABC with A(1, –4) and the mid-points of sides through A being (2, –1) and (0, –1).

In the following figure, if ΔABC ∼ ΔDEF and their sides of lengths (in cm) are marked along them, then find the lengths of sides of each triangle.

Which term of the A.P. `20, 19 1/4, 18 1/2, 17 3/4,` ..... is the first negative term?

Find the middle term of the A.P. 7, 13, 19, ...., 247.

Water in a canal, 6 m wide and 1.5 m deep, is flowing with a speed of 10 km/h. How much area will it irrigate in 30 minutes, if 8 cm standing water is required?

Show that `(cos^2(45^circ + θ) + cos^2(45^circ - θ))/(tan(60^circ + θ) tan(30^circ - θ)) = 1`

Prove that `sqrt(5)` is an irrational number. 

It can take 12 hours to fill a swimming pool using two pipes. If the pipe of larger diameter is used for four hours and the pipe of smaller diameter for 9 hours, only half of the pool can be filled. How long would it take for each pipe to fill the pool separately?

Draw a circle of radius 2 cm with centre O and take a point P outside the circle such that OP = 6.5 cm. From P, draw two tangents to the circle.

Construct a triangle with sides 5 cm, 6 cm and 7 cm and then construct another triangle whose sides are `3/4` times the corresponding sides of the first triangle.

From a point on the ground, the angles of elevation of the bottom and the top of a tower fixed at the top of a 20 m high building are 45° and 60° respectively. Find the height of the tower.

Draw a circle of radius 3.5 cm. From a point P, 6 cm from its centre, draw two tangents to the circle.

Construct a ΔABC with AB = 6 cm, BC = 5 cm and ∠B = 60°. Now construct another triangle whose sides are `2/3` times the corresponding sides of ΔABC.

A solid is in the shape of a hemisphere surmounted by a cone. If the radius of hemisphere and base radius of cone is 7 cm and height of cone is 3.5 cm, find the volume of the solid. `("Take"   π = 22/7)`