Advertisements
Advertisements
प्रश्न
Show that `tan(1/2 sin^-1 3/4) = (4 - sqrt(7))/3` and justify why the other value `(4 + sqrt(7))/3` is ignored?
Advertisements
उत्तर
We have `tan(1/2 sin^-1 3/4)`
Let `1/2 sin^-1 3/4` = θ
⇒ `sin^-1 3/4` = 2θ
⇒ sin 2θ = `3/4`
⇒ `(2 tan theta)/(1 + tan^2theta) = 3/4`
⇒ `3 tan theta^2 - 8` and θ ++ 3 = 0
⇒ tan θ = `(8 +- sqrt(64 - 36))/6`
⇒ tan θ = `(8 +- sqrt(28))/6 = (8 +- sqrt(7))/6 = (4 + sqrt(7))/3`
Now `- pi/2 ≤ sin^-1 3/4 ≤ pi/2`
⇒ `(-pi)/2 ≤ 1/2 sin^-1 3/4 ≤ pi/2`
∴ `tan((-pi)/2) ≤ tan(1/2(sin^-1 3/4)) ≤ tan pi/4`
⇒ `-1 ≤ tan (1/2 sin^-1 3/4) ≤ 1`
⇒ tan θ = `(4 - sqrt(7))/3` ....`(tan theta = (4 + sqrt(7))/3 > 1, "which is not possible")`
APPEARS IN
संबंधित प्रश्न
If `sin (sin^(−1)(1/5)+cos^(−1) x)=1`, then find the value of x.
Prove that `cot^(-1)((sqrt(1+sinx)+sqrt(1-sinx))/(sqrt(1+sinx)-sqrt(1-sinx)))=x/2;x in (0,pi/4) `
Prove that `2tan^(-1)(1/5)+sec^(-1)((5sqrt2)/7)+2tan^(-1)(1/8)=pi/4`
Prove that `tan^(-1)((6x-8x^3)/(1-12x^2))-tan^(-1)((4x)/(1-4x^2))=tan^(-1)2x;|2x|<1/sqrt3`
If `tan^-1(2x)+tan^-1(3x)=pi/4`, then find the value of ‘x’.
Find the value of the following:
`tan^-1 [2 cos (2 sin^-1 1/2)]`
Find the value of `cot(tan^(-1) a + cot^(-1) a)`
if `sin(sin^(-1) 1/5 + cos^(-1) x) = 1` then find the value of x
Prove `tan^(-1) 1/5 + tan^(-1) (1/7) + tan^(-1) 1/3 + tan^(-1) 1/8 = pi/4`
Prove `(9pi)/8 - 9/4 sin^(-1) 1/3 = 9/4 sin^(-1) (2sqrt2)/3`
Solve `tan^(-1) - tan^(-1) (x - y)/(x+y)` is equal to
(A) `pi/2`
(B). `pi/3`
(C) `pi/4`
(D) `(-3pi)/4`
Solve the following equation for x: `cos (tan^(-1) x) = sin (cot^(-1) 3/4)`
If tan-1 x - cot-1 x = tan-1 `(1/sqrt(3)),`x> 0 then find the value of x and hence find the value of sec-1 `(2/x)`.
Find the value, if it exists. If not, give the reason for non-existence
`tan^-1(sin(- (5pi)/2))`
Find the value of `sin^-1[cos(sin^-1 (sqrt(3)/2))]`
Solve: `2tan^-1 (cos x) = tan^-1 (2"cosec" x)`
Find the number of solutions of the equation `tan^-1 (x - 1) + tan^-1x + tan^-1(x + 1) = tan^-1(3x)`
Choose the correct alternative:
If `cot^-1(sqrt(sin alpha)) + tan^-1(sqrt(sin alpha))` = u, then cos 2u is equal to
Evaluate `tan^-1(sin((-pi)/2))`.
If `tan^-1x = pi/10` for some x ∈ R, then the value of cot–1x is ______.
If a1, a2, a3,...,an is an arithmetic progression with common difference d, then evaluate the following expression.
`tan[tan^-1("d"/(1 + "a"_1 "a"_2)) + tan^-1("d"/(21 + "a"_2 "a"_3)) + tan^-1("d"/(1 + "a"_3 "a"_4)) + ... + tan^-1("d"/(1 + "a"_("n" - 1) "a""n"))]`
If `sin^-1 ((2"a")/(1 + "a"^2)) + cos^-1 ((1 - "a"^2)/(1 + "a"^2)) = tan^-1 ((2x)/(1 - x^2))`. where a, x ∈ ] 0, 1, then the value of x is ______.
The value of cos215° - cos230° + cos245° - cos260° + cos275° is ______.
Solve for x : `"sin"^-1 2 "x" + sin^-1 3"x" = pi/3`
The value of `"tan"^ -1 (3/4) + "tan"^-1 (1/7)` is ____________.
`"cot" (pi/4 - 2 "cot"^-1 3) =` ____________.
`"tan"^-1 1 + "cos"^-1 ((-1)/2) + "sin"^-1 ((-1)/2)`
`"cot" ("cosec"^-1 5/3 + "tan"^-1 2/3) =` ____________.
sin (tan−1 x), where |x| < 1, is equal to:
If x = a sec θ, y = b tan θ, then `("d"^2"y")/("dx"^2)` at θ = `π/6` is:
Solve for x : `"sin"^-1 2"x" + "sin"^-1 3"x" = pi/3`
If `"tan"^-1 2 "x + tan"^-1 3 "x" = pi/4`, then x is ____________.
`"cos" (2 "tan"^-1 1/7) - "sin" (4 "sin"^-1 1/3) =` ____________.
`"cos"^-1 (1/2)`
The Government of India is planning to fix a hoarding board at the face of a building on the road of a busy market for awareness on COVID-19 protocol. Ram, Robert and Rahim are the three engineers who are working on this project. “A” is considered to be a person viewing the hoarding board 20 metres away from the building, standing at the edge of a pathway nearby. Ram, Robert and Rahim suggested to the firm to place the hoarding board at three different locations namely C, D and E. “C” is at the height of 10 metres from the ground level. For viewer A, the angle of elevation of “D” is double the angle of elevation of “C” The angle of elevation of “E” is triple the angle of elevation of “C” for the same viewer. Look at the figure given and based on the above information answer the following:
Measure of ∠CAB = ________.
`tan^-1 1/2 + tan^-1 2/11` is equal to
Find the value of `sin^-1 [sin((13π)/7)]`
`tan(2tan^-1 1/5 + sec^-1 sqrt(5)/2 + 2tan^-1 1/8)` is equal to ______.
If `cos^-1(2/(3x)) + cos^-1(3/(4x)) = π/2(x > 3/4)`, then x is equal to ______.
