# Algebra 1 : Functions and Lines

## Example Questions

### Example Question #4211 : Algebra 1

The number of math problems Ricky solves in half and hour varies inversely with the number of distractions present. Even though there were 12 distractions in his room, he was able to complete 10 problems in 30 minutes. If he needs to do 15 problems in the next half hour, how many distractions does he need to remove?

Explanation:

If the number of math problems varies inversely with the number of distractions, we can write an equation to solve for some constant, k. To make things easier, let's use the variable P for the number of math problems Ricky can solve, and D for the number of distractions. We can write this in a couple ways, but it will be easier later if we write it as:

. We could just as easily have written it as , and actually those equations are equivalent, or the same.

We know that Ricky can solve 10 problems with 12 distractions, so we can plug in 10=P and 12=D to solve for k:

to solve for k, multiply both sides by 10:

Now that we know k, we can figure out how many distractions Ricky can handle in order to solve 15 problems in the same amount of time. We'll do this by pluggin in 120 for k, and 15 for P:

Dividing gives us an answer of . This means that he can only handle 8 distractions. The question is asking us how many he needs to remove. Right now he has 12, so to get only 8 he'd have to remove 4.

### Example Question #4212 : Algebra 1

Find the inverse of the following algebraic function:

Explanation:

To find the inverse, switch the placement of the  and  variables:

Next,  should be isolated, providing the inverse function:

### Example Question #4213 : Algebra 1

Find the inverse of:

Explanation:

The notation  means a function in terms of .  Replace this notation with .

Interchange the  and  variables.

Solve for .  Subtract six on both sides.

Divide by three on both sides to isolate .

### Example Question #4214 : Algebra 1

If , what is ?

Explanation:

The notation  is asking for the inverse of the function.

First, replace  with .

Swap the variables.

Solve for .  Subtract seven on both sides.

Divide by four on both sides.

Simplify both sides.

The inverse function is:

### Example Question #931 : Functions And Lines

Given , find .

Explanation:

To determine the inverse function, first replace the  with .

Interchange the x and y variables.

Solve for y.  Add nine on both sides.

Divide by two on both sides.

Simplify both sides.

### Example Question #936 : Functions And Lines

Find the inverse:

Explanation:

To find the inverse, first interchange the x and y variables in the equation.

Solve for y.  Add 6 on both sides.

Simplify.

Divide by four on both sides.

Simplify both sides.

The inverse is:

### Example Question #931 : Functions And Lines

Find the inverse of:

Explanation:

Interchange the x and y variables.

Solve for y.  First distribute the two inside the parentheses.

Subtract six from both sides.

Simplify.

Divide by two on both sides.

Simplify and reduce.

### Example Question #931 : Functions And Lines

Find the inverse of:

Explanation:

Interchange the x and y variables.

Solve for y.

Simplify both sides.

Divide by ten on both sides.

Simplify both sides.

### Example Question #932 : Functions And Lines

Find the inverse of:

Explanation:

Interchange the x and y variables.

Solve for y.

Simplify both sides.

Divide by negative nine on both sides.

Simplify both sides and separate the terms.

### Example Question #933 : Functions And Lines

Find the inverse of:

Explanation:

Interchange the x and y variables.

Solve for y.  Add 18 on both sides.

Simplify both sides.

Divide by 2 on both sides.

Simplify both fractions.

The inverse function is: