__(x+0.50)=25

To solve the equation \( (x + 0.50) = 25 \), you can follow these steps:

1. Subtract 0.50 from both sides of the equation:

\[ x + 0.50 - 0.50 = 25 - 0.50 \]

This simplifies to:

\[ x = 24.50 \]

So, the solution to the equation is:

\[ x = 24.50 \]

What’s the answer

The answer to the equation \( (x + 0.50) = 25 \) is:

\[ x = 24.50 \]

Nooo fill in the equations to compute the cost of each mechanical pencils

To compute the cost of each mechanical pencil, you can represent the total cost using an equation. Let’s denote the cost of each mechanical pencil as \( p \) and the number of pencils as \( n \). If the total cost is known, you can use the following equation:

\[ n \cdot p = \text{Total Cost} \]

If you have a specific total cost and number of pencils, you can plug those values into the equation to find the cost of each mechanical pencil.

For example, if you have a total cost of $25 and you're buying 50 mechanical pencils, the equation would look like this:

\[ 50 \cdot p = 25 \]

To find \( p \):

\[ p = \frac{25}{50} = 0.50 \]

So, each mechanical pencil costs $0.50.

If you provide specific values for the total cost or number of pencils, I can help you with that calculation!