The 2nd derivative of a sin3t with respect to a cos3t at t=(π/4) is

Question

The 2nd derivative of a sin3t with respect to a cos3t at t=(π/4) is (A) (4√2/3a) (B) 2 (C) (1/12a) (D) None of these

Tardigrade Admin · Accepted Answer

Let y= asin3t and x = a cos3 t On differentiating w.r.t. t, we get (dy/dt)=3a sin2 t cos t and (dx/dt)=3a cos2 t(-sin t) ∴ (dy/dx)=(((dy/dt))/((dx)dt)) =(3a sin2 t cos t/3a cos2 t(-sin t)) =-tan t Again differentiating w.r.t. x, we get (d2 y/dx2)=-sec2 t (dt/dx) =-(-sec2 t/3a cos2 t(-sin t)) =(1/3a)((sec4 t/sin t)) ∴ ((d2y/dx2))t=(π/4)=(1/3a)⋅(4/(1)√2) =(4√2/3a)

Q. The $2^{n d}$ derivative of $a s i n^{3} t$ with respect to $a co s^{3} t$ at $t = \frac{π}{4}$ is

$\frac{4 2}{3 a}$

$2$

$\frac{1}{12 a}$

None of these

Q. The 2nd derivative of asin3t with respect to acos3t at t=4π​ is

3a42​​

2

12a1​

None of these

Q. The $2^{n d}$ derivative of $a s i n^{3} t$ with respect to $a co s^{3} t$ at $t = \frac{π}{4}$ is

$\frac{4 2}{3 a}$

$2$

$\frac{1}{12 a}$