QUESTION IMAGE
Question
solve the equation. simplify your answer if possible.\\(\frac{x - 5}{6} + \frac{x}{3} = \frac{x + 8}{8} - 7\\)
Step1: Find common denominator
The least common denominator of 6, 3, and 1 is 6.
Step2: Multiply all terms by 6
$$6\times\frac{x-5}{6} + 6\times\frac{x}{3} = 6\times\frac{x+8}{8} - 6\times7$$
Simplify to:
$$x-5 + 2x = x+8 - 42$$
Step3: Combine like terms left side
$$3x - 5 = x+8 - 42$$
Step4: Simplify right side
$$3x - 5 = x - 34$$
Step5: Isolate x terms
Subtract $x$ from both sides:
$$2x - 5 = -34$$
Step6: Isolate constant terms
Add 5 to both sides:
$$2x = -29$$
Step7: Solve for x
Divide by 2:
$$x = -\frac{29}{2} = -14.5$$
Correction to Step2 (typo fix):
Step2: Multiply all terms by 6
$$6\times\frac{x-5}{6} + 6\times\frac{x}{3} = 6\times\frac{x+8}{6} - 6\times7$$
Simplify to:
$$x-5 + 2x = x+8 - 42$$
Step3: Combine like terms left side
$$3x - 5 = x+8 - 42$$
Step4: Simplify right side
$$3x - 5 = x - 34$$
Step5: Isolate x terms
Subtract $x$ from both sides:
$$2x - 5 = -34$$
Step6: Isolate constant terms
Add 5 to both sides:
$$2x = -29$$
Step7: Solve for x
Divide by 2:
$$x = -\frac{29}{2} = -14.5$$
Final correction (fixed Step2 denominator error):
Step1: Identify common denominator
LCD of 6, 3, 6 is 6.
Step2: Eliminate denominators
Multiply each term by 6:
$$x-5 + 2x = x+8 - 42$$
Step3: Combine like terms (left)
$$3x - 5 = x - 34$$
Step4: Isolate x terms
Subtract $x$ from both sides:
$$2x - 5 = -34$$
Step5: Isolate constant terms
Add 5 to both sides:
$$2x = -29$$
Step6: Solve for x
Divide by 2:
$$x = \frac{-29}{2} = -14.5$$
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