Mathematical Concepts in Integration and Proofs

Ensuring the axes are labeled

Using the correct scale and curvature

Drawing them in different colors

Making them intersect at the origin

To make the proof longer

To ensure no marks are lost

To improve the clarity of the proof

To confuse the reader

The color of the graph

The boundaries of integration

The type of paper used

The speed of calculation

Using a calculator

Understanding the area concept

Drawing straight lines

Memorizing formulas

To simplify the equation

To make the graph look better

To find the limits of integration

To determine the color of the graph

Quotient rule

Sum rule

Chain rule

Product rule

To make it look simpler

To change its color

To find stationary points

To increase its degree

The assumption step

The base case

The hypothesis

The conclusion

To make the proof longer

To add more steps

To ensure clarity and correctness

To confuse the reader

To conclude the proof

To assume the statement is true for a particular case

To skip the proof

To establish a base case