(d)%3Df-solve-for-a.jpeg "(a+b/c)(d)=f Solve For A")
Solving for 'a' in the Equation (a + b/c)(d) = f
This article will guide you through the steps to solve for 'a' in the equation (a + b/c)(d) = f.
Understanding the Equation
The equation represents a scenario where you are multiplying a sum of two terms by a constant 'd', and the result is equal to 'f'. Our goal is to isolate 'a' on one side of the equation.
Step-by-Step Solution
-
Distribute: Start by distributing the 'd' across the terms inside the parentheses:
ad + (b/c)d = f -
Simplify: Combine the terms with 'd':
ad + bd/c = f -
Isolate 'ad': Subtract 'bd/c' from both sides of the equation:
ad = f - bd/c -
Solve for 'a': Finally, divide both sides of the equation by 'd' to isolate 'a':
a = (f - bd/c) / d
Simplifying the Solution
You can further simplify the solution by finding a common denominator for the terms in the numerator:
a = (cf - bd) / cd
Final Result
The solution for 'a' in the equation (a + b/c)(d) = f is:
a = (cf - bd) / cd
Key Points to Remember
- This solution assumes that 'c' and 'd' are non-zero values. If either 'c' or 'd' is zero, the equation becomes undefined.
- You can apply this method to solve for any variable in similar equations. Just remember to isolate the variable you want to solve for by using algebraic operations.