%2F2-(2m%2B1)%2F3%2Bm%2F5%2B3%3D2m-1%2F3.jpeg "(m-3)/2-(2m+1)/3+m/5+3=2m-1/3")
Solving the Equation: (m-3)/2-(2m+1)/3+m/5+3=2m-1/3
This article will guide you through the steps of solving the equation (m-3)/2-(2m+1)/3+m/5+3=2m-1/3.
Step 1: Find a Common Denominator
The first step is to find a common denominator for all the fractions in the equation. The least common multiple of 2, 3, and 5 is 30.
- Multiply the first fraction by 15/15: (m-3)/2 * (15/15) = (15m-45)/30
- Multiply the second fraction by 10/10: (2m+1)/3 * (10/10) = (20m+10)/30
- Multiply the third fraction by 6/6: m/5 * (6/6) = (6m)/30
Now the equation looks like this:
(15m-45)/30 - (20m+10)/30 + (6m)/30 + 3 = (2m-1)/3
Step 2: Simplify the Equation
- Combine the fractions on the left side of the equation: (15m - 45 - 20m - 10 + 6m)/30 + 3 = (2m-1)/3
- Simplify the numerator: (m-55)/30 + 3 = (2m-1)/3
Step 3: Eliminate Fractions
- Multiply both sides of the equation by 30: (m-55) + 90 = 10(2m-1)
- Distribute on the right side: (m-55) + 90 = 20m - 10
Step 4: Isolate the Variable
- Subtract m from both sides: -55 + 90 = 19m - 10
- Add 10 to both sides: 35 = 19m
- Divide both sides by 19: m = 35/19
Solution
The solution to the equation is m = 35/19.