Advertisements
Advertisements
प्रश्न
Differentiate `tan^-1[(sqrt(1 + x^2) - 1)/x]` w.r. to `tan^-1[(2x sqrt(1 - x^2))/(1 - 2x^2)]`
उत्तर
Let u = `tan^-1[(sqrt(1 + x^2) - 1)/x]`
Put x = tan θ, then θ = tan–1x
∴ u = `tan^-1[(sqrt(1 + tan^2theta) - 1)/(tantheta)]`
= `tan^-1[(sqrt(sec^2theta) - 1)/(tantheta)]`
= `tan^-1[(sectheta - 1)/(tantheta)]`
= `tan^-1[(1/costheta - 1)/((sintheta)/(costheta))]`
= `tan^-1[(1 - costheta)/(sintheta)]`
= `tan^-1[(2sin^2(theta/2))/(2sin(theta/2)cos(theta/2))]`
= `tan^-1[tan theta/2]`
= `theta/2`
∴ u = `1/2 tan^-1x`
Differentiating w.r.t. x, we get
`("d"u)/("d"x) = 1/((2(1 + x^2)`
Let v = `tan^-1[(2xsqrt(1 - x^2))/(1 - 2x^2)]`
Put x = sin θ, then θ = sin–1x
∴ v = `tan^-1[(2sinthetasqrt(1 - sin^2theta))/(1 - 2sin^2theta)]`
= `tan^-1[(2sinthetacostheta)/(cos2theta)]`
= `tan^-1[(sin2theta)/(cos2theta)]`
= tan−1 (tan 2θ) = 2θ
∴ v = 2sin−1x
Differentiating w.r.t. x, we get
`("d"v)/("d"x) = 2/sqrt(1 - x^2)`
∴ `("d"u)/("d"x) = ((("d"u)/("d"x)))/((("d"v)/("d"x))`
= `1/(2(1 + x^2)) xx sqrt(1 - x^2)/2`
= `sqrt(1 - x^2)/(4(1 + x^2))`
APPEARS IN
संबंधित प्रश्न
Find the derivative of the function y = f(x) using the derivative of the inverse function x = f–1(y) in the following: y = 2x + 3
Find the derivative of the function y = f(x) using the derivative of the inverse function x = f–1(y) in the following: y = ex – 3
Find the derivative of the inverse function of the following : y = x2·ex
Find the derivative of the inverse function of the following : y = x cos x
Find the derivative of the inverse of the following functions, and also find their value at the points indicated against them. y = x5 + 2x3 + 3x, at x = 1
Find the derivative of the inverse of the following functions, and also find their value at the points indicated against them. y = ex + 3x + 2
Find the derivative of the inverse of the following functions, and also find their value at the points indicated against them. y = sin(x – 2) + x2
If f(x) = x3 + x – 2, find (f–1)'(0).
Using derivative, prove that: tan –1x + cot–1x = `pi/(2)`
Choose the correct option from the given alternatives :
If g is the inverse of function f and f'(x) = `(1)/(1 + x)`, then the value of g'(x) is equal to :
If y = f(x) is a differentiable function of x, then show that `(d^2x)/(dy^2) = -(dy/dx)^-3.("d^2y)/(dx^2)`.
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 12 + 10x + 25x2
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 18x + log(x - 4).
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 25x + log(1 + x2)
If y = `"x"^3 + 3"xy"^2 + 3"x"^2"y"` Find `"dy"/"dx"`
If `"x"^3"y"^3 = "x"^2 - "y"^2`, Find `"dy"/"dx"`
If g is the inverse of f and f'(x) = `1/(1 + x^4)` then g'(x) = ______
Let f(x) = x5 + 2x – 3 find (f−1)'(-3)
Choose the correct alternative:
What is the rate of change of demand (x) of a commodity with respect to its price (y) if y = `(3x + 7)/(2x^2 + 5)`
Choose the correct alternative:
If x = at2, y = 2at, then `("d"^2y)/("d"x^2)` = ?
State whether the following statement is True or False:
If y = 10x + 1, then `("d"y)/("d"x)` = 10x.log10
State whether the following statement is True or False:
If y = 7x + 1, then the rate of change of demand (x) of a commodity with respect to its price (y) is 7
State whether the following statement is True or False:
If y = x2, then the rate of change of demand (x) of a commodity with respect to its price (y) is `1/(2x)`
The rate of change of demand (x) of a commodity with respect to its price (y), if y = 20 + 15x + x3.
Solution: Let y = 20 + 15x + x3
Diff. w.r.to x, we get
`("d"y)/("d"x) = square + square + square`
∴ `("d"y)/("d"x)` = 15 + 3x2
∴ By derivative of the inverse function,
`("d"x)/("d"y) 1/square, ("d"y)/("d"x) ≠ 0`
∴ Rate of change of demand with respect to price = `1/(square + square)`
I.F. of dx = y (x + y ) dy is a function of ______.
The I.F. of differential equation `dy/dx+y/x=x^2-3 "is" log x.`
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 12 + 10x + 25x2.
Find `dy/dx`, if y = `sec^-1((1 + x^2)/(1 - x^2))`.
If y = `cos^-1 sqrt((1 + x^2)/2`, then `dy/dx` = ______.
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 12 + 10x + 25x2.
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 12 + 10x + 25x2.
Find the rate of change of demand (x) of a commodity with respect to its price (y) if
y = 12 + 10x + 25x2
Find the rate of change of demand (x) of a commodity with respect to its price (y) if
y = `12 + 10x + 25x^2`
Find the rate of change of demand (x) of a commodity with respect to its price (y) if y = 12 + 10x + 25x2.
