Table of Contents

## How do you differentiate X with respect to T?

To find dy/dx when x and y both are functions of a single variable t, first we should find dy/dt and then dx/dt where dx/dt not equal to zero. Now divide dy/dt by dx/dt. You are done. you can all see examples from this site Differentiating dy/dx with respect to u( in last some examples respect to u and u replace by t).

**What is the differentiation of X square with respect to X?**

The derivative of x^2 is 2x.

**What is the differentiation of Sinwt?**

differentiation of sin we =w. cos wt.

### What is differentiated with respect to x?

Differentiation allows us to find rates of change. If y = some function of x (in other words if y is equal to an expression containing numbers and x’s), then the derivative of y (with respect to x) is written dy/dx, pronounced “dee y by dee x” . …

**What is the derivative of cos 2?**

-2sin

The derivative of cos(2x) is -2sin(2x). The process of finding this derivative uses the chain rule. We can use integrals to check our work when finding derivatives.

**What is the derivative of x 2 with respect 3?**

Derivative of x2 w.r.t. x3 is 2 3 x .

#### What’s the derivative of x 4?

Since 14 is constant with respect to x , the derivative of x4 with respect to x is 14ddx[x] 1 4 d d x [ x ] .

**Why |X| is not differentiable at x=0?**

A function is said to be differentiable at x=a, if a unique tangent passes through that point. Otherwise, it’s not differentiable at x=a. But for modulus function at x=0, no unique tangent can be drawn. Hence, |x| is not differentiable at x=0.

**What are the basic differentiation rules that should be followed?**

Some of the basic differentiation rules that need to be followed are as follows. If the function is sum or difference of two functions, the derivative of the functions is the sum or difference of the individual functions, i.e.,

## How does maxima work with differentiation?

In each calculation step, one differentiation operation is carried out or rewritten. For example, constant factors are pulled out of differentiation operations and sums are split up (sum rule). This, and general simplifications, is done by Maxima.

**What does differentiation mean in calculus?**

The meaning of differentiation is the process of determining the derivative of a function at any point. Functions are generally classified in two categories under Calculus, namely: A linear function varies with a constant rate through its domain.