Answer:
(-5/8, 13/4)
General Formulas and Concepts:
Pre-Algebra
Order of Operations: BPEMDAS
- Brackets
- Parenthesis
- Exponents
- Multiplication
- Division
- Addition
- Subtraction
Equality Properties
Algebra I
- Solving systems of equations using substitution/elimination
- Solving systems of equations by graphing
Explanation:
Step 1: Define systems
2x + 5y = 15
8x + 4y = 8
Step 2: Rewrite systems
8x + 4y = 8
- Subtract 8x on both sides: 4y = 8 - 8x
- Divide 4 on both sides: y = 2 - 2x
Step 3: Redefine systems
2x + 5y = 15
y = 2 - 2x
Step 4: Solve for x
Substitution
- Substitute in y: 2x + 5(2 - 2x) = 15
- Distribute 5: 2x + 10 - 10x = 15
- Combine like terms: -8x + 10 = 15
- Isolate x term: -8x = 5
- Isolate x: x = -5/8
Step 5: Solve for y
- Define original equation: 2x + 5y = 15
- Substitute in x: 2(-5/8) + 5y = 15
- Multiply: -10/8 + 5y = 15
- Simplify: -5/4 + 5y = 15
- Isolate y term: 5y = 65/4
- Isolate y: y = 13/4
Step 6: Graph systems
Check the solution set.
The solution set is equivalent (is in decimal form).