Using identities — The difference of two numbers is 5 and the difference of their squares is 135. What is the sum of the numbers?
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A27
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B25
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C30
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D32
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E35
Answer
Correct Answer: 27
Explanation
Introduction / Context:Another direct application of the difference-of-squares identity. When you know a - b and a^2 - b^2, you can immediately compute a + b by rearranging the identity without solving for a and b individually.
Given Data / Assumptions:
- a - b = 5.
- a^2 - b^2 = 135.
- We need a + b.
Concept / Approach:Use a^2 - b^2 = (a - b)(a + b). Solve for a + b by dividing the known difference of squares by the known difference of the numbers. This is a fast and reliable technique in timed exams.
Step-by-Step Solution:Identity: a^2 - b^2 = (a - b)(a + b).Substitute: 135 = 5 * (a + b).Compute a + b = 135 / 5 = 27.Hence, the sum is 27.
Verification / Alternative check:Optionally solve: Let a + b = 27 and a - b = 5 → a = 16, b = 11. Then a^2 - b^2 = 256 - 121 = 135, confirming the result.
Why Other Options Are Wrong:
- 25/30/32/35: None equals 135 / 5; these values do not satisfy the identity with the given numbers.
Common Pitfalls:Multiplying instead of dividing by the known difference; mixing up (a + b) with (a - b); making arithmetic slips when dividing 135 by 5.
Final Answer:27