250+ TOP MCQs on Improper Integrals and Answers

Engineering Mathematics Multiple Choice Questions on “Improper Integrals – 1”.

1. Integration of function is same as the ___________
a) Joining many small entities to create a large entity
b) Indefinitely small difference of a function
c) Multiplication of two function with very small change in value
d) Point where function neither have maximum value nor minimum value
Answer: a
Explanation: Integration of function is same as the Joining many small entities to create a large entity.

2. Integration of (Sin(x) + Cos(x))e^x is______________
a) e^x Cos(x)
b) e^x Sin(x)
c) e^x Tan(x)
d) e^x (Sin(x)+Cos(x))
Answer: b
Explanation: Let f(x) = e^x Sin(x)
∫ e^x Sin(x)dx = e^x Sin(x) – ∫ e^x Cos(x)dx
∫ e^x Sin(x)dx + ∫ e^x Cos(x)dx = ∫ e^x [Cos(x)+Sin(x)]dx = e^x Sin(x).

3. Integration of (Sin(x) – Cos(x))e^x is ___________
a) -e^x Cos(x)
b) e^x Cos(x)
c) -e^x Sin(x)
d) e^x Sin(x)
Answer: a
Explanation: Add constant automatically
Let f(x) = e^x Sin(x)
∫ e^x Sin(x)dx = -e^x Cos(x) + ∫ e^x Cos(x)dx
∫ e^x Sin(x)d-∫ e^x Cos(x)dx = ∫ e^x [Sin(x)-Cos(x)]dx = -e^x Cos(x).

4. Value of ∫ Cos² (x) Sin² (x)dx.
a) (frac{1}{8} [x-frac{Cos(2x)}{2}])
b) (frac{1}{4} [x-frac{Cos(2x)}{2}])
c) (frac{1}{8} [x-frac{Sin(2x)}{2}])
d) (frac{1}{4} [x-frac{Sin(2x)}{2}])
Answer: c
Explanation: Add constant automatically
Given,f(x)=(int Cos^2 (x) Sin^2 (x)dx=frac{1}{4} int Sin^2 (2x) dx=frac{1}{4} int frac{[1-Cos(2x)]}{2} dx=frac{1}{8} [x-frac{Sin(2x)}{2}])

5. If differentiation of any function is zero at any point and constant at other points then it means?
a) Function is parallel to x-axis at that point
b) Function is parallel to y-axis at that point
c) Function is constant
d) Function is discontinuous at that point
Answer: a
Explanation: Since slope of a function is given by ^dy⁄_dx at that point. Hence, when ^dy⁄_dx = 0 means slope of a function is zero i.e, parallel to x axis.
Function is not a constant function since it has finite value at other points.

6. If differentiation of any function is infinite at any point and constant at other points then it means ___________
a) Function is parallel to x-axis at that point
b) Function is parallel to y-axis at that point
c) Function is constant
d) Function is discontinuous at that point
Answer: a
Explanation: Since slope of a function is given by ^dy⁄_dx at that point.Hence,when ^dy⁄_dx = ∞ means slope of a function is 90 degree i.e,parallel to y axis.

7. Integration of function y = f(x) from limit x1 < x < x₂ , y₁ < y < y₂, gives ___________
a) Area of f(x) within x1 < x < x₂
b) Volume of f(x) within x1 < x < x₂
c) Slope of f(x) within x1 < x < x₂
d) Maximum value of f(x) within x1 < x < x₂
Answer: a
Explanation: Integration of function y=f(x) from limit x1 < x < x₂ , y₁ < y < y₂, gives area of f(x) within x1 < x < x₂.

8. Find the value of ∫ ^ln⁡(x)⁄_{x dx}.
a) 3a²
b) a²
c) a
d) 1
Answer: a
Explanation: Add constant automatically
Given, f(x)=(int frac{ln⁡(x)}{x} dx)
Let, z=ln⁡(x)=>dz=(frac{dx}{x}=>f(x)=int zdz=z^2/2=frac{ln^2⁡(x)}{2})

9. Find the value of ∫^t⁄_(t+3)(t+2) dt, is?
a) 2 ln⁡(t+3)-3 ln⁡(t+2)
b) 2 ln⁡(t+3)+3 ln⁡(t+2)
c) 3 ln⁡(t+3)-2 ln⁡(t+2)
d) 3 ln⁡(t+3)+2ln⁡(t+2)
Answer: c
Explanation: Add constant automatically
Given, e^t = x => dx = e^t dt,
Given, f(x)=(int frac{ln⁡(x)}{x} dx)
Let, z=ln⁡(x)=>dz=(frac{dx}{x}=>f(x)=int zdz=frac{z^2}{2}=frac{ln^2⁡(x)}{2})

10. Find the value of ∫ cot³(x) cosec⁴ (x).
a) –([frac{cot^4⁡(x)}{4}+frac{cosec^6⁡(x)}{6}])
b) –([frac{cosec^4⁡(x)}{4}+frac{cosec^6⁡(x)}{6}])
c) –([frac{cot^4⁡(x)}{4}+frac{cot^6⁡(x)}{6}])
d) –([frac{cosec^4⁡(x)}{4}+frac{cot^6⁡(x)}{6}])
Answer: c
Explanation: Add constant automatically
Given, (int cot^3⁡(x)cosec^4 (x)dx=-int cot^3⁡(x)cosec^2 (x)dcot(x))
=-(int t^3 (1+t^2)dt=-[frac{t^4}{4}+frac{t^6}{6}]=-[frac{cot^4⁡(x)}{4}+frac{cot^6⁡(x)}{6}])