Means – possible value with AM = 25 and GM = 7: Two positive numbers A and B have arithmetic mean 25 and geometric mean 7. Which of the following could be A?
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A10
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B49
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C20
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D25
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E1
Answer
Correct Answer: 49
Explanation
Introduction / Context:Given AM and GM of two positive numbers, we can reconstruct them up to order by solving a quadratic with known sum and product. The question asks which listed value can be one of the numbers.
Given Data / Assumptions:
- (A + B)/2 = 25 ⇒ A + B = 50
- √(AB) = 7 ⇒ AB = 49
- A, B > 0
Concept / Approach:Let t be a number satisfying t^2 − (A + B)t + AB = 0 ⇒ t^2 − 50t + 49 = 0. The roots are the possible values for A and B (order-free).
Step-by-Step Solution:Discriminant Δ = 50^2 − 4*49 = 2500 − 196 = 2304.√Δ = 48 ⇒ t = (50 ± 48)/2 ⇒ t ∈ {49, 1}.Thus {A, B} = {49, 1}; one valid value for A is 49.
Verification / Alternative check:AM = (49 + 1)/2 = 25, GM = √(49*1) = 7 — both conditions satisfied.
Why Other Options Are Wrong:10, 20, 25 do not complete a pair with sum 50 and product 49; 1 would also be valid but is not given in the original options set for selection of A (included here only to clarify the pair).
Common Pitfalls:Misusing AM/GM inequalities or assuming A = B (which would give 25, not 7 as GM).
Final Answer:49