For a 0 , t ∈(0, (π/2)) , let x = √a sin-1t and y = √a cos-1t, Then 1+ ((dy/dx))2 equals :

Question

For a > 0 , t ∈(0, (π/2)) , let x = √a sin-1t and y = √a cos-1t, Then 1+ ((dy/dx))2 equals : (A) (x2/y2) (B) (y2/x2) (C) (x2 + y2 /y2) (D) (x2 + y2 /x2)

Tardigrade Admin · Accepted Answer

Let x = √a sin-1t ⇒ x2 = a sin-1t ⇒ 2 log x = sin-1 t . log a ⇒ (2/x) = ( log a/√1-t2) . (dt/dx) ⇒ (2√1-t2/x log a) = (dt/dx) ....(1) Now, let y = √a cos-1t ⇒ 2 log y = cos-1 t . log a ⇒ (2/y) . (dy/dx) = (- log a/√1-t2) . (dt/dx) ⇒ (2/y) . (dy/dx) = (- log a/√1-t2 ) × (2√1-t2/x log a) (from (1) ⇒ (dy/dx) = - (y/x) Hence , 1+ ((dy/dx))2 = 1 + ((-y/x))2 = (x2 +y2/x2)

Q. For $a > 0, t \in (0, \frac{π}{2}),$ let $x = a^{s i n^{- 1} t}$ and $y = a^{c o s^{- 1} t},$ Then $1 + (\frac{d y}{d x})^{2}$ equals :

$\frac{x ^{2}}{y ^{2}}$

$\frac{y ^{2}}{x ^{2}}$

$\frac{x ^{2} + y ^{2}}{y ^{2}}$

$\frac{x ^{2} + y ^{2}}{x ^{2}}$

Q. For a>0,t∈(0,2π​), let x=asin−1t​ and y=acos−1t​, Then 1+(dxdy​)2 equals :

y2x2​

x2y2​

y2x2+y2​

x2x2+y2​

Q. For $a > 0, t \in (0, \frac{π}{2}),$ let $x = a^{s i n^{- 1} t}$ and $y = a^{c o s^{- 1} t},$ Then $1 + (\frac{d y}{d x})^{2}$ equals :

$\frac{x ^{2}}{y ^{2}}$

$\frac{y ^{2}}{x ^{2}}$

$\frac{x ^{2} + y ^{2}}{y ^{2}}$

$\frac{x ^{2} + y ^{2}}{x ^{2}}$