Asymptotes, Logarithms, and Inequalities

log base 5 of 625 equals 4

log base 4 of 625 equals 5

log base 625 of 5 equals 4

log base 5 of 4 equals 625

The base of the log becomes the argument, and the log's answer is the base.

The argument of the log becomes the base, and the log's answer is the exponent.

The base of the log becomes the exponent, and the log's answer is the base.

The base of the log becomes the base of the power, and the log's answer is the exponent.

5

2

3

4

It eliminates the need for logarithms.

It makes the equation quadratic.

It allows for direct comparison of exponents.

It simplifies the equation to a linear form.

x = 4/5

x = 10/9

x = 9/10

x = 5/4

Use the power rule of logarithms to bring the exponent down.

Use substitution to simplify the equation.

Graph the equation and find the intersection points.

Convert the equation to a quadratic form.

x ≈ 0.69

x ≈ 3.14

x ≈ 2.71

x ≈ 1.61

Solutions that are greater than 10.

Roots that are not integers.

Solutions that make the base negative.

Extraneous roots that make the argument negative.

x = 6

x = 7

x = 4

x = 5

They are always increasing.

They are always decreasing.

They have a horizontal asymptote at y = 0.

They have a vertical asymptote at y = 0.