m < c = (5x - 3)o
To solve the equation m < c = (5x - 3)o, we need to isolate the variable x.
First, let's simplify the equation. Since the equal sign is not in the correct position, let's break it down into two separate inequalities:
m < c and c = (5x - 3)o.
Now let's focus on the second part, c = (5x - 3)o. We need to isolate the variable x on one side of the equation.
Step 1: Add 3 to both sides of the equation to eliminate the -3 on the right side.
c + 3 = 5x
Step 2: Divide both sides of the equation by 5 to isolate x.
(c + 3)/5 = x
Now we have the value of x in terms of c.
Next, let's consider the first inequality, m < c. Since we don't have any information about m or c specifically, we can't solve for x directly using this inequality. However, we can express the relationship between m, c, and x.
If we substitute the value of x obtained from the second equation into the first inequality, we can see how m and c relate to each other:
m < c
Now let's substitute the value of x:
m < (c + 3)/5
This result shows how m and c are related when x is expressed in terms of c. However, without additional information about m or c, we cannot further simplify or find a specific solution to this equation.