Using the applesauce scenario from the previous problem, how many servings could you make with 32 apples?(1 point)

It is not possible to determine the number of servings that could be made with 32 apples without knowing the amount of applesauce that can be made from each apple.

You are trying to make the best applesauce in the entire world. The recipe calls for 8 apples in 2 servings, 16 apples in 4 servings, and so on. How many apples are for 10 servings?(1 point) Question 2 Using the applesauce scenario from the previous problem, how many servings could you make with 32 apples?

Based on the information provided, we can see that the number of apples needed for each serving is increasing by 8 apples for every 2 servings.

For example:
- 2 servings require 8 apples
- 4 servings require 16 apples

So, to find out how many apples are needed for 10 servings, we can find the pattern:
- 2 servings: 8 apples
- 4 servings: 16 apples
- 6 servings: 24 apples
- 8 servings: 32 apples
- 10 servings: ?

We can see that for every 2 servings, 8 more apples are needed. So for 10 servings, we add another 8 apples to the existing pattern:

10 servings: 32 apples + 8 apples = 40 apples

Therefore, you would need 40 apples to make 10 servings of applesauce.

For the second question, using the 32 apples provided, we can follow the same pattern:

32 apples / 8 apples per 2 servings = 4 servings

Therefore, you could make 4 servings of applesauce with 32 apples.

Fill the blanks with true, false, or identity

An equation with no solutions is a _____ equation. When an equation has one solution, it is a _____ . A _____ equation is an equation with an infinity number of solution

An equation with no solutions is a false equation. When an equation has one solution, it is an identity. A true equation is an equation with an infinity number of solutions.

How many solutions does this equation have? 2x+1=x−7+x
Which one is true: Infinitely many, One solution. The solution is 8 One solution. The solution is -8 One solution.There are zero solutions

To determine how many solutions the equation 2x + 1 = x - 7 + x has, we can simplify it:

2x + 1 = x - 7 + x
2x + 1 = 2x - 7

Next, we can isolate the variable on one side of the equation:

2x - 2x + 1 = 2x - 2x - 7
1 = -7

Since the equation simplifies to 1 = -7, which is not true, there are zero solutions. Therefore, the statement "One solution" is not true, "The solution is 8" is not true, "The solution is -8" is not true, and "There are zero solutions" is the correct statement.

Solve the following equations:
−3x−7=23
2x+8=4x−12

To solve the equation -3x - 7 = 23, we'll isolate the variable x.

Step 1:
Start by adding 7 to both sides of the equation:
-3x - 7 + 7 = 23 + 7
-3x = 30

Step 2:
Next, we'll divide both sides of the equation by -3 to solve for x:
(-3x) / -3 = 30 / -3
x = -10

Therefore, the solution to the equation -3x - 7 = 23 is x = -10.

Next, let's solve the equation 2x + 8 = 4x - 12.

Step 1:
Start by subtracting 2x from both sides of the equation:
2x - 2x + 8 = 4x - 2x - 12
8 = 2x - 12

Step 2:
Next, add 12 to both sides of the equation:
8 + 12 = 2x + 12
20 = 2x

Step 3:
Finally, divide both sides of the equation by 2 to solve for x:
20 / 2 = 2x / 2
10 = x

Therefore, the solution to the equation 2x + 8 = 4x - 12 is x = 10.