## Negative power differentiation

We can rewrite each rational term in the expression as a negative power of x

## Derivatives of inverse trigonometric function

the formula for the derivative of arctan(x)=1/(1+x2).

## What are the properties of quadrilaterals?

In geometry, the parallelogram and the trapezoid are the fundamental quadrilaterals respectively to classify their own type. The types of parallelograms are the rectangle, rhombus, and square. The types of the trapezoid are the isosceles trapezoid and a right trapezoid.

## Implicit differentiation

In implicit differentiation, we differentiate both sides of the equation according to x and treat y as an implicit function of x

## Triangle Proofs

In triangle proofs, we try to prove two triangles to be congruent based on the five main theorems alongside with some other statements to fill out or given. However, they are two triangle theorems that are known as “donkey theorems” because the two triangles are not congruent.

## Revolutions

In France and Russia, there were slogans shouting out for what the vast majority of the people wanted during the French Revolution and the Russian Revolution.

## How to Find Prime Numbers In A Chart of 1 to 100?

Finding prime numbers in a chart of 1 to 100 can be helpful to memorize and to understand with dealing with small numbers. However, a chart would not be practical for doing homework, a quiz, or a test. Nevertheless, the steps that I have provided in dealing with numbers from 1 to 100 is a…

## How to Find Prime Numbers?

Prime numbers are numbers that can be divided by 1 and itself. 1 is not a prime number since it is only divided by 1. It has to have only two factors. For example, 8 is not a prime number because it has more than two factors. We call this a composite number, which has…

## Differentiating trigonometric function

(1) d/dx(sinx)= cosx (2) d/dx(cosx)= -sinx (3) d/dx(tanx)= -( secx)2 (4) d/dx(cotx)= -(cosecx)2 (5) d/dx(secx)= secx.tanx (6) d/dx(cosecx)= -cosecx.cotx

## Differentiating trigonometric function

d/dx(sinx)=cosx d/dx(cosx)=-sinx d/dx(tanx)=(secx)2

## Composite exponential function differentiation

When we differentiate the composite exponential function, we want to use the product rule and the chain rule.

## Second Derivative

NOTATION FOR SECOND DERIVATIVE Leibniz’s notation is d2y/dx2 Lagrange’s notation is f”

## Roman Republic

By around 494 BCE, the plebians revolted and set their base camp outside of the city Rome’s walls. The patricians or the aristocrats helped end the revolt and made a way for plebians and other citizens of Rome to understand the rules. They posted it in the Forum, which was like a metropolitan area.

## chain rule twice

The chain rule tells us how to take the derivative of their composition. d/dx(f(g(x)))=f'(g(x)).g'(x)