Question

Solve the d/dx(sin30(degree))

Answer 1

Answer:

Derivative cos x = - sin x

derivative y = cos ax

y '= - a sin ax

-30 sin 30x °

Answer 2

Answer:

the derivative of sin 30 degrees will be zero.

Step-by-step explanation:

First of all, we need to know what is the value of sin 30 degrees.

Step 1:- According to the trigonometric ratio table, the value of sin 30 degrees is 1/2 i.e. 0.5

So, it is a constant value.

Step 2:- ∵ In differentiation, we have a constant rule which states that the derivative of a constant function is zero because the rate of change is zero, which leads to a horizontal line

So,

= d/dx (sin 30 degree)

= d/dx (1/2)

= 0 [Ans]

Therefore, the derivative of sin 30 degrees will be zero.

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