Question

differentiate π^4 with respect to 'x'​

Answer 1

Answer:

y=n⁴

diff. w.r.t. x on both sides

dy/dx=0

because derivative of constant fun. is Alwaz 0

Answer 2

It is given that :- Y = π⁴

We have to differentiate π⁴ with respect to x which means we have to find out dy/dx.

Therefore now :-

$\implies \: y = {\pi}^{4}$

Now differentiating both sides :-

$\implies \: \dfrac{dy}{dx} = \dfrac{d{(\pi}^{4} )}{dx}$

We know that differentiation of constant term is zero. And here π⁴ is a constant term ( since value of π is 3.14 or 22/7 .)

Therefore we get :-

$\implies \: \dfrac{dy}{dx} = 0$

Answer : 0

$\dfrac{dy}{dx} =\dfrac{d{(\pi}^{4} )}{dx} = 0$

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d(x^n)/dx = n x^(n-1)

d(e^x)/dx = e^x

d(logx)/dx = 1/x

d(sinx)/dx = cosx

d(cos x)/dx = -sin x

d(cosec x)/dx = -cot x cosec x

d(tan x)/dx = sec²x

d(sec x)/dx = secx tanx

d(cot x)/dx = - cosec² x

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