Solve “c = 0.75m + 4.”

To solve the equation \( c = 0.75m + 4 \), we need to isolate \( m \).

1. Start with the equation: \[ c = 0.75m + 4 \]

2. Subtract 4 from both sides: \[ c - 4 = 0.75m \]

3. Now, divide both sides by 0.75 to solve for \( m \): \[ m = \frac{c - 4}{0.75} \]

4. To express \( m \) in decimal form, you can rewrite it as: \[ m = \frac{c - 4}{0.75} = \frac{c - 4}{\frac{3}{4}} = \frac{4(c - 4)}{3} \]

Now, you can substitute any value for \( c \) to find the value of \( m \). Once you provide a specific value for \( c \), I can help you calculate \( m \) rounded to the nearest hundredth.

To express the solution to the equation \( c = 0.75m + 4 \) in decimal form, we previously derived:

\[ m = \frac{c - 4}{0.75} \]

This is what we use to calculate \( m \) in decimal form. If you provide a specific value for \( c \), I can evaluate \( m \) and provide the decimal output rounded to the nearest hundredth.

However, if you'd like an example with a specific value, let's say \( c = 10 \):

1. Substitute \( c = 10 \) into the equation: \[ m = \frac{10 - 4}{0.75} \]

2. Calculate: \[ m = \frac{6}{0.75} = 8 \]

Thus, if \( c = 10 \), then \( m = 8.00 \).

Please provide a specific value for \( c \) so I can compute \( m \) in decimal form for you.