QUESTION IMAGE
Question
week 5 packet
part a: checking solutions by substitution
directions: substitute the given value of x into both sides of the equation. if both sides are equal, the value is a solution.
- ( 5x - 3 = 4(2x + 3) ); ( x = -5 )
- ( 6x + 1 - 4x = x + 7 ); ( x = 8 )
Problem 1: \( 5x - 3 = 4(2x + 3) \); \( x = -5 \)
Step 1: Substitute \( x = -5 \) into the left - hand side (LHS) of the equation.
The left - hand side of the equation is \( 5x-3 \). Substitute \( x=-5 \):
\( 5\times(-5)-3=-25 - 3=-28 \)
Step 2: Substitute \( x = -5 \) into the right - hand side (RHS) of the equation.
The right - hand side of the equation is \( 4(2x + 3) \). First, substitute \( x=-5 \) into the expression inside the parentheses: \( 2\times(-5)+3=-10 + 3=-7 \). Then multiply by 4: \( 4\times(-7)=-28 \)
Step 3: Compare LHS and RHS.
Since LHS \(=-28\) and RHS \(=-28\), LHS = RHS.
Step 1: Simplify the left - hand side (LHS) of the equation.
Combine like terms on the LHS: \( 6x-4x + 1=2x + 1 \)
Step 2: Substitute \( x = 8 \) into the LHS.
Substitute \( x = 8 \) into \( 2x+1 \): \( 2\times8+1=16 + 1=17 \)
Step 3: Substitute \( x = 8 \) into the right - hand side (RHS) of the equation.
The RHS of the equation is \( x + 7 \). Substitute \( x = 8 \): \( 8+7 = 15 \)
Step 4: Compare LHS and RHS.
Since LHS \(=17\) and RHS \(=15\), LHS \(
eq\) RHS.
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\( x = - 5 \) is a solution.