English

CBSECommerce (English Medium) Class 12

Question Papers

Question Papers2581

Textbook Solutions20345

MCQ Online Mock Tests42

Important Solutions22695

Concept Notes & Videos607

Which of the following is the principal value branch of cos–1x? - Mathematics

Advertisements

Advertisements

Question

Which of the following is the principal value branch of cos^–1x?

Options

`[(-pi)/2, pi/2]`
(0, π)
[0, π]
`(0, pi) - {pi/2}`

MCQ

Advertisements

Solution

[0, π]

Explanation:

Principal value branch of cos^–1x is [0, π]

shaalaa.com

Inverse Trigonometric Functions - Inverse Trigonometric Functions - Principal Value Branch

Is there an error in this question or solution?

Chapter 2: Inverse Trigonometric Functions - Exercise [Page 37]

APPEARS IN

NCERT Exemplar Mathematics [English] Class 12

Chapter 2 Inverse Trigonometric Functions
Exercise | Q 20 | Page 37

Video TutorialsVIEW ALL [2]

RELATED QUESTIONS

The principal solution of the equation cot x=`-sqrt 3 ` is

Find the principal value of the following:

`sin^-1(tan (5pi)/4)`

For the principal value, evaluate of the following:

`sin^-1(-1/2)+2cos^-1(-sqrt3/2)`

Find the principal value of the following:

`tan^-1(1/sqrt3)`

Find the principal value of the following:

`tan^-1(2cos (2pi)/3)`

Find the principal value of the following:

`sec^-1(-sqrt2)`

Find the principal value of the following:

`cosec^-1(-sqrt2)`

Find the principal value of the following:

`cosec^-1(2cos (2pi)/3)`

For the principal value, evaluate the following:

`sin^-1(-sqrt3/2)+\text{cosec}^-1(-2/sqrt3)`

For the principal value, evaluate the following:

`sec^-1(sqrt2)+2\text{cosec}^-1(-sqrt2)`

Find the principal value of the following:

`cot^-1(tan (3pi)/4)`

The index number by the method of aggregates for the year 2010, taking 2000 as the base year, was found to be 116. If sum of the prices in the year 2000 is ₹ 300, find the values of x and y in the data given below

Commodity	A	B	C	D	E	F
Price in the year 2000 (₹)	50	x	30	70	116	20
Price in the year 2010 (₹)	60	24	y	80	120	28

Find the value of `cos^-1(cos (13pi)/6)`.

Prove that tan(cot^–1x) = cot(tan^–1x). State with reason whether the equality is valid for all values of x.

Find the value of `sec(tan^-1 y/2)`

Find value of tan (cos^–1x) and hence evaluate `tan(cos^-1 8/17)`

Which of the following corresponds to the principal value branch of tan^–1?

The principal value of the expression cos^–1[cos (– 680°)] is ______.

The value of cot (sin^–1x) is ______.

The principal value of `sin^-1 ((-sqrt(3))/2)` is ______.

The greatest and least values of (sin–¹x)² + (cos^–1x)² are respectively ______.

Find the value of `tan^-1 (tan (5pi)/6) +cos^-1(cos (13pi)/6)`

Find the value of the expression `sin(2tan^-1 1/3) + cos(tan^-1 2sqrt(2))`

If `cos(sin^-1 2/5 + cos^-1x)` = 0, then x is equal to ______.

The value of sin (2 tan^–1(0.75)) is equal to ______.

The value of `cot[cos^-1 (7/25)]` is ______.

The value of `sin^-1 (sin (3pi)/5)` is ______.

The value of expression `tan((sin^-1x + cos^-1x)/2)`, when x = `sqrt(3)/2` is ______.

The period of the function f(x) = cos4x + tan3x is ____________.

`"cos" ["tan"^-1 {"sin" ("cot"^-1 "x")}]` is equal to ____________.

If `"tan"^-1 ("a"/"x") + "tan"^-1 ("b"/"x") = pi/2,` then x is equal to ____________.

What is the value of x so that the seven-digit number 8439 × 53 is divisible by 99?

What is the principle value of `sin^-1 (1/sqrt(2))`?

Assertion (A): Maximum value of (cos^–1 x)² is π².

Reason (R): Range of the principal value branch of cos^–1 x is `[(-π)/2, π/2]`.

Evaluate `sin^-1 (sin (3π)/4) + cos^-1 (cos π) + tan^-1 (1)`.

Notifications