Chapter 3.4, Problem 1E

a.

To determine

To fill:

The given blank for the given statement.

Answer to Problem 1E

The complete statement would be: $a^x=a^y$ if and only if $\underset{\_}{x=y}$ .

Explanation of Solution

Given:

An incomplete statement: $a^x=a^y$ if and only if $\underset{\_}{}$ .

Calculation:

According to one-to-one property of exponents, when an exponential equation has same base on both sides of equation, then the arguments must be equal.

We can see that the base on both sides of equation is a. So, by one-to-one property, the value of x must be equal to y.

Therefore, the correct word for the given blank would be $\underset{\_}{x=y}$ .

b.

To determine

To fill:

The given blank for the given statement.

Answer to Problem 1E

The complete statement would be: ${\log }_a(x)={\log }_a(y)$ if and only if $\underset{\_}{x=y}$ .

Explanation of Solution

Given:

An incomplete statement: ${\log }_a(x)={\log }_a(y)$ if and only if $\underset{\_}{}$ .

Calculation:

According to one-to-one property of logarithms, when a logarithmic equation has same base on both sides of equation, then the arguments must be equal.

We can see that the base on both sides of equation is a. So, by one-to-one property, the value of x must be equal to y.

Therefore, the correct word for the given blank would be $\underset{\_}{x=y}$ .

c.

To determine

To fill:

The given blank for the given statement.

Answer to Problem 1E

The complete statement would be: $a^{{\log }_a(x)}=\underset{\_}{x}$ .

Explanation of Solution

Given:

An incomplete statement: $a^{{\log }_a(x)}=\underset{\_}{}$ .

Calculation:

According to inverse property of exponents, $a^{{\log }_a(x)}=x$ .

Therefore, the correct word for the given blank would be $\underset{\_}{x}$ .

d.

To determine

To fill:

The given blank for the given statement.

Answer to Problem 1E

The complete statement would be: ${\log }_a\left(a^x\right)=\underset{\_}{x}$ .

Explanation of Solution

Given:

An incomplete statement: ${\log }_a(x)={\log }_a(y)$ if and only if $\underset{\_}{}$ .

Calculation:

According to inverse property of logarithms, ${\log }_a\left(a^x\right)=x$ .

Therefore, the correct word for the given blank would be $\underset{\_}{x}$ .