Board Paper of Class 10 2019 Maths Delhi(Set 3)  Solutions
General Instructions:
(i) All questions are compulsory.
(ii) The question paper consists of 30 questions divided into four sections – A, B, C and D.
(iii) Section A comprises 6 questions of 1 mark each. Section B contains 6 questions of 2 marks each. Section C contains 10 questions of 3 marks each. Section D contains 8 questions of 4 marks each.
(iv) There is no overall choice. However, an internal choice has been provided in two questions of 1 mark, two questions of 2 marks, four questions of 3 marks each and three questions of 4 marks each. You have to attempt only one of the alternative in all such questions.
(v) Use of calculators is not permitted.
 Question 1
Two positive integers a and b can be written as a = x^{3}y^{2 }and b = xy^{3} . x, y are prime numbers. Find LCM (a, b). VIEW SOLUTION
 Question 2
How many two digits numbers are divisible by 3? VIEW SOLUTION
 Question 3
In Fig. 1, DE  BC, AD = 1 cm and BD = 2 cm. What is the ratio of the ar (Δ ABC) to the ar (Δ ADE)?
VIEW SOLUTION
 Question 4
Find the coordinates of a point A, where AB is diameter of a circle whose centre is (2, –3) and B is the point (1, 4). VIEW SOLUTION
 Question 5
For what value of k, the roots of the equation x^{2} + 4x + k = 0 are real?
OR
Find the value of k for which the roots of the equation 3x^{2} – 10x + k = 0 are reciprocal of each other. VIEW SOLUTION
 Question 6
Find A if tan 2A = cot (A – 24°)
OR
Find the value of (sin^{2 }33° + sin^{2} 57°) VIEW SOLUTION
 Question 7
Find, how many two digit natural numbers are divisible by 7.OrIf the sum of first n terms of an AP is n^{2}, then find its 10th term. VIEW SOLUTION
 Question 8
A game consists of tossing a coin 3 times and noting the outcome each time. If getting the same result in all the tosses is a success, find the probability of losing the game. VIEW SOLUTION
 Question 9
Find the ratio in which the segment joining the points (1, –3) and (4, 5) is divided by xaxis? Also find the coordinates of this point on xaxis. VIEW SOLUTION
 Question 10
A die is thrown once. Find the probability of getting a number which (i) is a prime number (ii) lies between 2 and 6. VIEW SOLUTION
 Question 11
Find c if the system of equations cx + 3y + (3 – c) = 0; 12x + cy – c = 0 has infinitely many solutions? VIEW SOLUTION
 Question 12
Find the HCF of 1260 and 7344 using Euclid's algorithm.
OR
Show that every positive odd integer is of the form (4q + 1) or (4q + 3), where q is some integer. VIEW SOLUTION
 Question 13
Find all zeros of the polynomial 3x^{3} + 10x^{2} − 9x − 4 if one of its zero is 1. VIEW SOLUTION
 Question 14
PQ is a chord of length 8 cm of a circle of radius 5 cm. The tangents at P and Q intersect at point T. Find the length of TP.
VIEW SOLUTION
 Question 15
Prove that $\frac{2+\sqrt{3}}{5}$ is an irrational number, given that $\sqrt{3}$ is an irrational number. VIEW SOLUTION
 Question 16
Prove that (sin θ + cosec θ)^{2} + (cos θ + sec θ)^{2} = 7 + tan^{2 }θ + cot^{2 }θ.
Or
Prove that (1 + cot A − cosec A) (1 + tan A + sec A) = 2 VIEW SOLUTION
 Question 17
A father's age is three times the sum of the ages of his two children. After 5 years his age will be two times the sum of their ages. Find the present age of the father.OrA fraction becomes $\frac{1}{3}$ when 2 is subtracted from the numerator and it becomes $\frac{1}{2}$ when 1 is subtracted from the denominator. Find the fraction. VIEW SOLUTION
 Question 18
Find the point on yaxis which is equidistant from the points (5, −2) and (−3, 2).
OR
The line segment joining the points A(2, 1) and B(5, −8) is trisected at the points P and Q such that P is nearer to A. If P also lies on the line given by 2x − y + k = 0, find the value of k. VIEW SOLUTION
 Question 19
Find the mode of the following frequency distribution.
Class 010 1020 2030 3040 4050 5060 6070 Frequency 8 10 10 16 12 6 7
 Question 20
Water in a canal, 6 m wide and 1.5 m deep, is flowing with a speed of 10 km/hour. How much area will it irrigate in 30 minutes; if 8 cm standing water is needed? VIEW SOLUTION
 Question 21
In Fig. 3, ∠ACB = 90° and CD ⊥ AB, prove that CD^{2} = BD × AD.
OR
If P and Q are the points on side CA and CB respectively of Δ ABC, right angled at C, prove that (AQ^{2} + BP^{2}) = (AB^{2} + PQ^{2}) VIEW SOLUTION
 Question 22
Find the area of the shaded region in Fig. 4, if ABCD is a rectangle with sides 8 cm and 6 cm and O is the centre of circle. (Take π = 3.14)
VIEW SOLUTION
 Question 23
If $\mathrm{sec}\theta =x+\frac{1}{4x},x\ne 0,$ find (sec θ + tan θ). VIEW SOLUTION
 Question 24
Prove that the ratio of the areas of two similar triangles is equal to the square of the ratio of their corresponding sides. VIEW SOLUTION
 Question 25
The following distribution gives the daily income of 50 workers of a factory.
Daily income (in ₹) 200220 220240 240260 260280 280300 Number of workers 12 14 8 6 10
Or
The table below shows the daily expenditure on food of 25 households in a locality. Find the mean daily expenditure on food.Daily expenditure (in ₹) : 100150 150200 200250 250300 300350 Number of households : 4 5 12 2 2
 Question 26
Construct a ΔABC in which CA = 6 cm, AB = 5 cm and ∠BAC = 45°. Then construct a triangle whose sides are $\frac{3}{5}$ of the corresponding sides of ΔABC. VIEW SOLUTION
 Question 27
A bucket open at the top is in the form of a frustum of a cone with a capacity of 12308.8 cm^{3}. The radii of the top and bottom of circular ends of the bucket are 20 cm and 12 cm respectively. Find the height of the bucket and also the area of the metal sheet used in making it. (Use π = 3.14) VIEW SOLUTION
 Question 28
A man in a boat rowing away from a light house 100 m high takes 2 minutes to change the angle of elevation of the top of the light house from 60° to 30°.
Find the speed of the boat in metres per minute. $\left[\mathrm{Use}\sqrt{3}=1.732\right]$OR
Two poles of equal heights are standing opposite each other on either side of the road, which is 80 m wide. From a point between them on the road, the angles of elevation of the top of the poles are 60° and 30° respectively. Find the height of the poles and the distances of the point from the poles. VIEW SOLUTION
 Question 29
Two water taps together can fill a tank in $1\frac{7}{8}$ hours. The tap with longer diameter takes 2 hours less than the tap with smaller one to fill the tank separately. Find the time in which each tap can fill the tank separately.
OR
A boat goes 30 km upstream and 44 km downstream in 10 hours. In 13 hours, it can go 40 km upstream and 55 km downstream. Determine the speed of the stream and that of the boat in still water. VIEW SOLUTION
 Question 30
If the sum of first four terms of an AP is 40 and that of first 14 terms is 280. Find the sum of its first n terms. VIEW SOLUTION

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