It is a universally accepted standard.

It simplifies arithmetic operations.

It is the only base that can be used in calculus.

It allows for easier differentiation and integration.

Multiply both sides by the log base.

Change the base of the log.

Rewrite the equation with the base as the subject.

Add a constant to both sides.

2 = e^(2 log e)

2 = e^(log 2)

2 = e^2

2 = log(e^2)

To change the base of the expression.

To simplify the differentiation process.

To make the expression more complex.

To eliminate the log from the expression.

x^n

nx^(n-1)

nx^(n+1)

n^x

log 2

x

e^x

x * log 2

a^m / a^n

a^(m+n)

a^(m*n)

a^m * a^n

To ensure understanding and accuracy.

To confuse the reader.

To fill up space on the page.

To make the solution longer.

e^(x * log 2) / log 2

x * e^(x * log 2)

log 2 * e^(x * log 2)

e^(x * log 2) * x

x * 2^x

log 2 * 2^x

2^x

e^(x * log 2)