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  • INDIAN NAVY SAILORS Numerical Ability Study Material

Digitization help student to explore and study their academic courses online, as this gives them flexibility and scheduling their learning at their convenience. Kidsfront has prepared unique course material of Numerical Ability Integrals for INDIAN NAVY SAILORS student. This free online Numerical Ability study material for INDIAN NAVY SAILORS will help students in learning and doing practice on Integrals topic of INDIAN NAVY SAILORS Numerical Ability. The study material on Integrals, help INDIAN NAVY SAILORS Numerical Ability students to learn every aspect of Integrals and prepare themselves for exams by doing online test exercise for Integrals, as their study progresses in class. Kidsfront provide unique pattern of learning Numerical Ability with free online comprehensive study material and loads of INDIAN NAVY SAILORS Numerical Ability Integrals exercise prepared by the highly professionals team. Students can understand Integrals concept easily and consolidate their learning by doing practice test on Integrals regularly till they excel in Numerical Ability Integrals.


Integrals
When derivative of a function is given and we have to determine the function, this process is called _________ .

a) Derivation
b) Integration
c) Limits
d) Differentiation



Answer
Correct Answer Is : Integration
Solution Is :
The integration is the inverse process of a ____________.

a) Differentiation
b) Limits
c) Applications of integration
d) Applications of differentiation



Answer
Correct Answer Is : Differentiation
Solution Is :
If∫ f (x)dx, f(x) is?

a) An integral
b) Derivative
c) Any function
d) All of these



Answer
Correct Answer Is : An integral
Solution Is :
If∫ f (x)dx, f(x) is an integral and x is ?

a) A constant variable
b) A variable of integral
c) A variable of constant
d) A integration function



Answer
Correct Answer Is : A variable of integral
Solution Is :
If a and b are any non-zero real number,∫(1/(ax + b))dx = ?

a) Log |ax + b|/a + c
b) Log |ax + b|/a
c) Log |ax + b|/b + c
d) Log |ax - b|/a + c



Answer
Correct Answer Is : Log |ax + b|/a + c
Solution Is :
If a and b are any non-zero real number,∫cos (ax + b)dx = ?

a) Sin (ax + b) /a
b) Sin (ax + b) /a + c
c) Sin (ax - b) /a
d) Sin (ax - b) /a + c



Answer
Correct Answer Is : Sin (ax + b) /a + c
Solution Is :
True or false: integral is also called anti-derivative.

a) TRUE
b) FALSE
c) Maybe
d) None of these



Answer
Correct Answer Is : TRUE
Solution Is :
If a and b are any non-zero real number,∫(e^(ax + b))dx = ?

a) E^(ax + b)
b) E^(ax + b)/a
c) E^(ax + b)/a + c
d) All of these



Answer
Correct Answer Is : E^(ax + b)/a + c
Solution Is :
If a and b are any non-zero real number,∫(sin(ax + b))dx = ?

a) (-cos(ax + b))
b) (cos(ax + b))
c) (-cos(ax + b))/a
d) (-cos(ax + b))/a + c



Answer
Correct Answer Is : (-cos(ax + b))/a + c
Solution Is :
If f(x) and g(x) are two real value functions such that∫ f(x)dx and∫ g(x)dx exist, then

a) ∫[f(x) ± g(x)]dx =∫ f(x)dx ±∫ g(x)dx
b) ∫[f(x) ± g(x)]dx =∫ f(x)dx +∫ g(x)dx
c) ∫[f(x) ± g(x)]dx =∫ f(x)dx -∫ g(x)dx
d) All of these



Answer
Correct Answer Is : All of these
Solution Is :

Preparation for Exams

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