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7 votes
What is the x-value in the solution to this system of linear equations?

2x − y = 11

x + 3y = −5

−3
−1
2
4

User Rafael Merlin
by
3.0k points

2 Answers

20 votes
20 votes

Answer:

x = 4

Explanation:

2x - y = 11

x + 3y = -5

To calculate the value of x , firstly we need to find value of y.

solve for y

  • 2x - y = 11

subtract 2x from both side

  • 2x - 2x - y = 11 - 2x
  • -y = 11 - 2x

change the sign of both side of equation

  • y = -11 + 2x

rewrite

  • y = 2x - 11

Solve for x

  • y = 2x - 11
  • x + 3y = -5

substitute the value of y in the equation

  • x + 3( 2x - 11 ) = -5

distribute 3

  • x + 3 × 2x - 3× 11 = -5
  • x + 6x - 33 = -5

combine like terms

  • 7x - 33 = -5

Add 33 on both side

  • 7x - 33 + 33 = -5 + 33
  • 7x = 28

divide both side by 7

  • 7x / 7 = 28 / 7
  • x = 4

User Kaushik NP
by
2.6k points
24 votes
24 votes

Answer:

4

General Formulas and Concepts:

Pre-Algebra

Order of Operations: BPEMDAS

  1. Brackets
  2. Parenthesis
  3. Exponents
  4. Multiplication
  5. Division
  6. Addition
  7. Subtraction
  • Left to Right

Distributive Property

Equality Properties

  • Multiplication Property of Equality
  • Division Property of Equality
  • Addition Property of Equality
  • Subtraction Property of Equality

Algebra I

  • Terms/Coefficients
  • Solving systems of equations using substitution/elimination

Explanation:

Step 1: Define Systems

2x - y = 11

x + 3y = -5

Step 2: Rewrite Systems

2x - y = 11

  1. [Subtraction Property of Equality] Subtract 2x on both sides: -y = 11 - 2x
  2. [Division Property of Equality] Divide -1 on both sides: y = 2x - 11

Step 3: Redefine Systems

y = 2x - 11

x + 3y = -5

Step 2: Solve for x

Substitution

  1. Substitute in y [2nd Equation]: x + 3(2x - 11) = -5
  2. [Distributive Property] Distribute 3: x + 6x - 33 = -5
  3. Combine like terms: 7x - 33 = -5
  4. [Addition Property of Equality] Add 33 on both sides: 7x = 28
  5. [Division Property of Equality] Divide 7 on both sides: x = 4
User Erwin Mayer
by
3.1k points