Question

What is the derivative of $\pi$?

Answer 1

In this problem, we need to solve the derivative of $\pi$. Here, the number π is an irrational number with approximate value. Therefore, $\pi$ is a constant. We have a rule for calculus, the derivative of a function gives us the formula for the rate of change of a function at a given point. We have many different methods for finding the derivative of a function, and a lot of these methods involve using well-known rules and formulas for the derivative of certain functions.

Complete step by step solution:
In the given problem,
The function is $f(x) = \pi$
The derivative of a constant term is always zero
Differentiate the function,$f(x) = \pi$ with respect to $x$, we can get
$f(x) = \pi$
$\dfrac{{d(\pi )}}{{dx}} = 0$
Since $\pi$ is a constant term, the derivative of the $\pi$ is always zero.
Therefore, the derivative of $\pi$ is $0$.

Note:
We note that the derivative of a constant term is always zero. Reason being, we take derivatives with respect to a variable, $\dfrac{d}{{dx}}$ means we're taking the derivative with respect to $x$. The number,$\pi$ is just a constant, meaning it doesn't change with respect to a variable. The derivative of a constant, π is always zero. The derivative can be defined as a function taking a variable argument, a function, to some other set.