# Quant Question Bank by VP - Set 2

• Q4) A set of 7 pens, 9 erasers and 11 sharpeners cost Rs. 79 and 2 pens, 5 erasers and 8 sharpeners cost Rs. 42. Find the total cost of one sharpener, one eraser and one pen.

• Q5) Given that w, x, y and z are natural numbers such that 4w = xyz, 4x = wyz and 4z = wxy. Which of thefollowing is a possible value of (w + x + y – z)^2 ?
(a) 25
(b) 9
(c) 36
(d) 1

• Q6) The value of A is given by the square of the volume of a sphere drawn by taking the longest diagonal of a cube as the diameter of the sphere. The value of B is taken as the cube of the sum of the areas of all the circles of maximum radius that can be enclosed inside each of the faces of the above cube. Find A/B

• Q7) In a school committee comprising 12 members, there are, exactly two students from each of the class from class 7 to class 12. In how many ways can a sub-commitiee of four students be formed, such that no two students in the sub committee belong to the same class.

• Q8) How many ordered pairs (P, Q) are there such that the unit’s digits of P^P and Q^Q are the same?
P and Q are natural numbers less than 10 and are not necessarily distinct

• Q9) lf the length and breadth of a rectangle are increased by 4 units each, then the area of the rectangle increases by 100%. lf the breadth is Decreased by 6 units and the length is increased by 2 units, then the area decreased by 75%. Find the ratio of the length of the diagonal of the rectangle and the length of the rectangle.

• Q10) P is a group of four numbers 1, 2, 3 and 1. In every step, 1 is added to any two numbers in group P. In how many such steps is it possible to make all the four numbers in group P equal?

• Q11) A triangle has its longest side as 38 cm. lf one of the other two sides is 10 cm and the area of the triangle is 152 sq cm, find the length of the third side.

• Q12) A circle of radius 3 units is drawn with centre as (8,7) and another circle is drawn taking the line segment joining (-12, 8) and (4, -4) as diameter. Find the number of common tangents that can be drawn to these two circles

• Q13) A boat moves at a speed of 12 kmph in stillwater. lt has to travel a distance of 6O km downstream fromP to Q. The moment the boat reached a point R,between P and Q, the speed of the current suddenlydoubled. lf as a result, the boat reached itsdestination half an hour earlier than it normally would have, what is the speed of the stream ?

• Q14) A natural number n is such that 120 ≤ n ≤ 240. If HCF of n and 240 is 1, how many values of n are possible?

• Q15) The function f(x) is defined such that f(2x) + f(3x) + f(x + 2) + f(3 - x) = x. for all real values of x. Find f(0)

• Q16) In an exam there are 90 questions. There are three sections, 1,2,3. Each question in section 1 carries 2 marks, each question in section 2 carries 3 marks, and each question in section 3 carries 4 marks. All questions in section 1 together carry at least 40% of the total marks of the exam. If section 3 has atleast 36 questions, section 1 has how many questions?
a. 52 or 53 or 54
b. 50 or 51 or 52
c. 51 or 52 or 53
d. 52 or 53

• Q17) Find the distance between the lines, 2x - 5y - 9 = 0 and 10y = 4x - 93

• Q18) There are three containers A, B and C filled with 60%, 75% and 80% solution of alcohol in water. The solution in the three containers are taken in a certain ratio and mixed thoroughly to form a 70% solution of alcohol in water. In this mixture, the quantity of solution taken from C is 40% less than the quantity taken from A. By what percent is the quantity taken from B less or more than the quantity taken from A?

• Q19) Y = 2, 3, 4, 5 …., 103
Sm = am : a∈Y, m∈N
Find the least element in the set[Y–(S2∪S3∪S4∪….∪S89)]

• Q20) Three natural numbers a, b and c are such that a^2 + b^2= c^2. If a = 20, how many ordered pairs (b, c) are possible?

• Q21) If all the four-digit numbers that can be formed using the digits 1, 2, 3, 4, 5, 6, 7 and 8 without repetition are arranged in ascending order, what will be the rank of the number 5283?

• Q22) Find the ratio of the sum of first 20 terms to the sum of first 40 terms of the series S, where S = (4/5) + 4/45 + 4/117 + 4/221 + ...

• Q23) How many integers “a” are there such that 9x^2 + 3ax + (a + 5) > 0 for all values of x?

61

31

45

89

53

119