1. What is the solution to the equation: x + 35 = -13 Use inverse operations to solve!

To solve the equation x + 35 = -13 using inverse operations, we need to isolate the variable x on one side of the equation.

First, we'll subtract 35 from both sides of the equation:

x + 35 - 35 = -13 - 35

Simplifying, we get:

x = -48

So, the solution to the equation x + 35 = -13 is x = -48.

What is the value of x? Use inverse operations to solve. x+1/10=29/90

To solve the equation x + 1/10 = 29/90 using inverse operations, we need to isolate the variable x on one side of the equation.

To do this, we'll subtract 1/10 from both sides of the equation:

x + 1/10 - 1/10 = 29/90 - 1/10

Simplifying, we get:

x = 29/90 - 9/90

Combining the fractions on the right side, we have:

x = (29 - 9) / 90

Simplifying the numerator, we get:

x = 20/90

Now, we'll simplify the fraction by dividing both the numerator and denominator by their greatest common denominator (GCD), which is 10 in this case:

x = 20/90 = 2/9

So, the value of x is x = 2/9.

What is the solution to the equation? Use inverse operations to solve. y/5 = 15

To solve the equation y/5 = 15 using inverse operations, we can multiply both sides of the equation by 5 to isolate the variable y.

Multiplying both sides by 5:

(y/5) * 5 = 15 * 5

Simplifying, we get:

y = 75

Therefore, the solution to the equation y/5 = 15 is y = 75.

6. Amelia baked some cookies. She was able to give 5 cookies each to 8 friends without having any cookies left over. How could you set up this problem as an algebraic equation to find out how many cookies Amelia baked in total?(1 point)

To set up this problem as an algebraic equation, let's represent the number of cookies Amelia baked as "x".

According to the problem, Amelia was able to give 5 cookies each to 8 friends without having any cookies left over. So, if each friend received 5 cookies, then the total number of cookies given out would be 5 * 8 = 40 cookies.

Since this is the total number of cookies that Amelia baked (x), we can set up the equation as:

x = 40

Therefore, the algebraic equation to find out how many cookies Amelia baked in total is x = 40.

Amelia baked some cookies. She was able to give 5 cookies each to 8 friends without having any cookies left over. How could you set up this problem as an algebraic equation to find out how many cookies Amelia baked in total?(1 point) Responses c×8=5 c+8=5 c divided by 8=5 c-8=5

To set up this problem as an algebraic equation, let's represent the number of cookies Amelia baked as "c".

According to the problem, Amelia was able to give 5 cookies each to 8 friends without having any cookies left over.

So, we can set up the equation as:

5 * 8 = c

This equation represents that 5 cookies multiplied by the number of friends (8) equals the total number of cookies baked by Amelia (c).

Therefore, the algebraic equation to find out how many cookies Amelia baked in total is 5 * 8 = c.

wrong

Apologies for the confusion. Let's try again.

Let's represent the number of cookies Amelia baked as "x".

According to the problem, Amelia was able to give 5 cookies each to 8 friends without having any cookies left over.

To calculate the total number of cookies baked by Amelia, we can set up the equation:

5 * 8 = x

This equation represents that 5 cookies multiplied by the number of friends (8) equals the total number of cookies baked by Amelia (x).

Therefore, the algebraic equation to find out how many cookies Amelia baked in total is 5 * 8 = x.

its c divided by 8=5

Apologies for the previous incorrect response. You are correct.

To represent the total number of cookies Amelia baked as "c", and given that she was able to give 5 cookies each to 8 friends without any cookies left over, we can set up the equation:

c/8 = 5

This equation represents that the total number of cookies "c" divided by the number of friends (8) equals the number of cookies each friend received (5).

Therefore, the correct algebraic equation to find out how many cookies Amelia baked in total is c/8 = 5.

14. Johan practices the drums for 45 minutes on Saturday and 25 minutes on most weekdays. Last week he practiced 120 minutes. How many weekdays did he practice? Write an equation in the form of px + q = r to represent this problem.(3 points)