Advertisements
Advertisements
प्रश्न
Find the principal solutions of the following equation:
sin 2θ = `− 1/(sqrt2)`
Advertisements
उत्तर
sin 2θ = `− 1/(sqrt2)`
Since, θ ∈ (0, 2π), 2θ ∈ (0, 4π)
`∴ sin 2θ = − 1/(sqrt2) = − sin π/4 = sin (π + π/4) = sin (2π − π/4) = sin (3π + π/4) = sin (4π − π/4) ...[∵ sin (π + θ) = sin (2π − θ) = sin (3π + θ) = sin (4π − θ) = − sin θ]`
∴ `sin 2θ = sin (5π)/4 = sin (7π)/4 = sin (13π)/4 = sin (15π)/4`
∴ `2θ = (5π)/4 or 2θ = (7π)/4 or 2θ = (13π)/4 or 2θ = (15π)/4`
∴ `θ = (5π)/8 or θ = (7π)/8 or θ = (13π)/8 or θ = (15π)/8`
Hence, the required principal solutions are `{(5π)/8, (7π)/8, (13π)/8, (15π)/8}`
APPEARS IN
संबंधित प्रश्न
Show that `2sin^-1(3/5) = tan^-1(24/7)`
Find the principal value of the following:
`tan^(-1) (-sqrt3)`
`sin^-1 1/2-2sin^-1 1/sqrt2`
Evaluate the following:
`\text(cosec)^-1(-2/sqrt3)+2cot^-1(-1)`
Evaluate the following:
`tan^-1(1) + cos^-1(1/2) + sin^-1(1/2)`
Prove the following:
`sin^-1(-1/2) + cos^-1(-sqrt(3)/2) = cos^-1(-1/2)`
Prove the following:
`tan^-1(1/2) + tan^-1(1/3) = pi/(4)`
Prove the following:
`tan^-1[sqrt((1 - cosθ)/(1 + cosθ))] = θ/(2)`, if θ ∈ (– π, π).
Find the principal solutions of the following equation:
cot 2θ = 0.
`tan^-1(tan (7pi)/6)` = ______
Prove that sin `[tan^-1 ((1 - x^2)/(2x)) + cos^-1 ((1 - x^2)/(1 + x^2))]` = 1
Prove that:
`tan^-1 (4/3) + tan^-1 (1/7) = pi/4`
Show that `tan^-1 (1/2) + tan^-1 (2/11) = tan^-1 (3/4)`
Find the principal value of `tan^-1 (sqrt(3))`
The principle solutions of equation tan θ = -1 are ______
In Δ ABC, with the usual notations, if sin B sin C = `"bc"/"a"^2`, then the triangle is ______.
The principal value of `sin^-1 (sin (3pi)/4)` is ______.
`tan[2tan^-1 (1/3) - pi/4]` = ______.
The domain of the function defined by f(x) = sin–1x + cosx is ______.
Show that `2tan^-1 (-3) = (-pi)/2 + tan^-1 ((-4)/3)`
`("cos" 8° - "sin" 8°)/("cos" 8° + "sin" 8°)` is equal to ____________.
If `"cos"^-1 "x + sin"^-1 "x" = pi`, then the value of x is ____________.
`"tan"^-1 (sqrt3)`
`"cos" ["tan"^-1 {"sin" ("cot"^-1 "x")}]` is equal to ____________.
If `"cot"^-1 (sqrt"cos" alpha) - "tan"^-1 (sqrt "cos" alpha) = "x",` then sinx is equal to ____________.
If |Z1| = |Z2| and arg (Z1) + arg (Z2) = 0, then
If `sqrt(2)` sec θ + tan θ = 1, then the general value of θ is
The inverse of `f(x) = sqrt(3x^2 - 4x + 5)` is
What will be the principal value of `sin^-1(-1/2)`?
Find the principal value of `tan^-1 (sqrt(3))`
`sin(tan^-1x), |x| < 1` is equal to
What is the values of `cos^-1 (cos (7pi)/6)`
Find the principal value of `cot^-1 ((-1)/sqrt(3))`
If f'(x) = x–1, then find f(x)
Assertion (A): The domain of the function sec–12x is `(-∞, - 1/2] ∪ pi/2, ∞)`
Reason (R): sec–1(–2) = `- pi/4`
If θ = `sin^-1((2x)/(1 + x^2)) + cos^-1((1 - x^2)/(1 + x^2))`, for `x ≥ 3/2` then the absolute value of `((cosθ + tanθ + 4)/secθ)` is ______.
cos–1(cos10) is equal to ______.
If x ∈ R – {0}, then `tan^-1 ((sqrt(1 + x^2) + sqrt(1 - x^2))/(sqrt(1 + x^2) - sqrt(1 - x^2)))`
If tan–1 (2x) + tan–1 (3x) = `π/4`, then x = ______.
If 2 tan–1 (cosx) = tan–1 (2 cosec x), then sin x + cos x is equal to ______.
If y = `tan^-1 (sqrt(1 + x^2) - sqrt(1 - x^2))/(sqrt(1 + x^2) + sqrt(1 - x^2))`, then `dy/dx` is equal to ______.
Find the value of `cos(x/2)`, if tan x = `5/12` and x lies in third quadrant.
The value of `tan(cos^-1 4/5 + tan^-1 2/3)` is ______.
Find the value of `sin(2cos^-1 sqrt(5)/3)`.
Find the value of `tan^-1(x/y) + tan^-1((y - x)/(y + x))`
