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  • Quantitative Aptitude Practice Trigonometry 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 Trigonometry Inverse Trigonometric Functions for Quantitative Aptitude Practice student. This free online Trigonometry study material for Quantitative Aptitude Practice will help students in learning and doing practice on Inverse Trigonometric Functions topic of Quantitative Aptitude Practice Trigonometry. The study material on Inverse Trigonometric Functions, help Quantitative Aptitude Practice Trigonometry students to learn every aspect of Inverse Trigonometric Functions and prepare themselves for exams by doing online test exercise for Inverse Trigonometric Functions, as their study progresses in class. Kidsfront provide unique pattern of learning Trigonometry with free online comprehensive study material and loads of Quantitative Aptitude Practice Trigonometry Inverse Trigonometric Functions exercise prepared by the highly professionals team. Students can understand Inverse Trigonometric Functions concept easily and consolidate their learning by doing practice test on Inverse Trigonometric Functions regularly till they excel in Trigonometry Inverse Trigonometric Functions.


Inverse Trigonometric Functions
If y = f(x) and x = g(y) are two functions such that f (g(y)) = y and g (f(y)) = x, then f and y are said to be ___________ of each other.

a) Derivative
b) Product
c) Inverse
d) Integration



Answer
Correct Answer Is : Inverse
Solution Is :
If y = f(x) and x = g(y) are two functions such that f (g(y)) = y and g (f(y)) = x, then f and y are said to be inverse of each other. That means:

a) F = g
b) G = f
c) G = f^(-1)
d) F = g^(-1)



Answer
Correct Answer Is : G = f^(-1)
Solution Is :
In inverse trigonometric functions if y = f(x), then x = __________ .

a) F = g
b) G = f
c) F^(-1)(x)
d) F^(-1)(y)



Answer
Correct Answer Is : F^(-1)(y)
Solution Is :
True or false: The trigonometric equation may have infinite number of solutions.

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



Answer
Correct Answer Is : TRUE
Solution Is :
If y = sin x^(-1), then x = ________ .

a) Sin^(-1) y
b) Sin y
c) Sin^(-1) x
d) Sin x



Answer
Correct Answer Is : Sin^(-1) y
Solution Is :
An equation involving one or more trigonometrical ratios of unknown angle is called a _________ .

a) Trigonometric equation
b) Inverse trigonometric equation
c) Both 1 and 2
d) None of these



Answer
Correct Answer Is : Trigonometric equation
Solution Is :
A value of the unknown angle which satisfies the given equation, is called a __________ .

a) Root of the equation
b) Solution of the equation
c) Both 1 and 2
d) None of these



Answer
Correct Answer Is : Both 1 and 2
Solution Is :
Which equation have infinite number of solutions?

a) Trigonometric equation
b) Inverse trigonometric equation
c) Differential equation
d) Integration equation



Answer
Correct Answer Is : Trigonometric equation
Solution Is :
The least value of unknown angle which satisfies the given equation, is called a __________ .

a) Principal solution of trigonometric equation
b) Principal solution of inverse trigonometric equation
c) Solution of trigonometric equation
d) Solution of inverse trigonometric equation



Answer
Correct Answer Is : Principal solution of trigonometric equation
Solution Is :
Trigonometric function are _________ .

a) Periodic
b) Non periodic
c) Both 1 and 2
d) None of these



Answer
Correct Answer Is : Periodic
Solution Is :
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