To solve the equation 0.75s - 5/8 = 44, add 5/8 to both sides to get 0.75s = 44 + 5/8. Convert 5/8 to a decimal if necessary and then divide both sides by 0.75 to solve for s.
To solve the algebraic equation 0.75s - 5/8 = 44, we first need to isolate the variable s. However, before we combine like terms, we should note that there are no like terms to combine in this case. Each term is distinct: one is a term with the variable s, and the other is a constant. The process involves moving the constant to the other side of the equation and then solving for s.
First, we add 5/8 to both sides of the equation:
0.75s - 5/8 + 5/8 = 44 + 5/8
This simplifies to:
0.75s = 44 + 5/8
To get rid of the fraction, you can convert the fraction to decimal or find a common denominator for 44 and 5/8. If we convert the fraction to decimal, the equation would be:
0.75s = 44.625
Now divide both sides by 0.75 to solve for s:
s = 44.625 / 0.75
The solution for s will be a numerical value that satisfies the original equation.