# Integration MCQ Questions And Answers - Mathematics Class 12

Integration MCQs : This section focuses on the "Integration" in Mathematics Class 12. These Multiple Choice Questions (MCQs) should be practiced to improve the Mathematics Class 12 skills required for various interviews (campus interview, walk-in interview, company interview), placement, entrance exam and other competitive examinations.

Question 1

Integration is the calculation of an integral.

A. TRUE
B. FALSE
C. Can be true or false
D. Can not say

Question 2

Integrals in maths are used to find many useful quantities such as?

A. areas
B. volumes
C. displacement
D. All of the above

Question 3

How many major types of calculus?

A. 1
B. 2
C. 3
D. 4

Question 4

An integral that contains the upper and lower limits then it is a _________ integral.

A. definite
B. indefinite
C. simple
D. continuos

Question 5

What are the real-life applications of integration?

A. centre of gravity
B. centre of mass
C. to predict the position of the planets
D. All of the above

Question 6

Integration of function is same as the ___________

A. Indefinitely small difference of a function
B. Multiplication of two function with very small change in value
C. Joining many small entities to create a large entity
D. Point where function neither have maximum value nor minimum value

Question 7

If differentiation of any function is zero at any point and constant at other points then it means?

A. Function is parallel to y-axis at that point
B. Function is parallel to x-axis at that point
C. Function is constant
D. Function is discontinuous at that point

Question 8

If differentiation of any function is infinite at any point and constant at other points then it means ___________

A. Function is parallel to y-axis at that point
B. Function is constant
C. Function is parallel to x-axis at that point
D. Function is discontinuous at that point

Question 9

Integration of function y = f(x) from limit x1 < x < x2 , y1 < y < y2, gives ___________

A. Volume of f(x) within x1 < x < x2
B. Slope of f(x) within x1 < x < x2
C. Maximum value of f(x) within x1 < x < x2
D. Area of f(x) within x1 < x < x2