Worked Solution & Example Answer:10 (a) Solve \( \frac{9 + x}{7} = 11 - x \)
\( x = \)
(b) Simplify \( \frac{4(y + 3)^3}{(y + 3)^2} \)
\( = \) - Edexcel - GCSE Maths - Question 13 - 2019 - Paper 3
Step 1
Solve \( \frac{9 + x}{7} = 11 - x \)
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Answer
To solve the equation, we first eliminate the fraction by multiplying both sides by 7:
9+x=7(11−x)
Expanding the right side gives:
9+x=77−7x
Next, we isolate all terms containing ( x ) on one side of the equation. Adding ( 7x ) to both sides results in:
9+x+7x=77
Simplifying this, we have:
9+8x=77
Now we subtract 9 from both sides:
8x=77−9
Thus:
8x=68
Dividing by 8 gives:
x=868=8.5
Step 2
Simplify \( \frac{4(y + 3)^3}{(y + 3)^2} \)
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Answer
To simplify the expression, we can divide the two terms. Since the numerator and the denominator share a common factor of ( (y + 3)^2 ), we can reduce it:
