Rewrite log₃81 = 4 exponentially

Rewrite log₅ (1/5)= -1 exponentially

Select all that can help you solve for x

Check all that can help you solve for x

Evaluate log₂(1/2)

Solve for x
$$\log_2x$$   = 1/2

Solve for x
$$\log_2\left(\frac{1}{16}\right)$$   = x

Rewrite 4² = 16 into logarithmic form.

What are the effects of changing the parameter h in the general logarithmic function?

Does a change in h cause a change in the domain and range?

What are the effects of changing the parameter a in the general logarithmic function? Select all that apply.

Does a change in a cause a change in the domain and range?

What are the effects of changing the parameter k in the general logarithmic function?

Does a change in k cause a change in the domain and range?

bⁿ x b^m =

bⁿ / b^m =

(bⁿ)^m =

1. Rewrite the statement b⁰ = 1 in logarithmic form:

1. Rewrite the statement b¹ = b in logarithmic form.

1. Rewrite the statement bⁿ • b^m = b^{n + m} in logarithmic form. Let bⁿ = p and b^m = q.

Rewrite the statement bⁿ /b^m = b^{n - m} in logarithmic form. Again, let bⁿ = p and b^m = q.

Rewrite the expression log(3x) as an equivalent logarithmic expression using only addition.

Rewrite the expression below as an equivalent logarithmic expression using only subtraction.

log₄(10 / 4)

Apply the properties of logarithms to simplify each expression for x ≥ 0.

log_x(27) − log_x(3) =

Apply the properties of logarithms to simplify each expression for x ≥ 0.

log₁₀(2) + log₁₀(5) =

Apply the properties of logarithms to simplify each expression for x ≥ 0.

log (2 / x) + log (x / 2)

Rewrite the statement (bⁿ ) ^m = b^nm in logarithmic form. Again, let bⁿ = p and b^m = q.

Expand the logarithm fully using the properties of logs. Express the final answer in terms of log x, and log y.

log (x³ / y²)

Expand the logarithm fully using the properties of logs. Express the final answer in terms of log x, and log y.

log 7x⁴

Expand the logarithm fully using the properties of logs. Express the final answer in terms of log x, and log y.

log xy³