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Inequalities Question (1 Viewer)

lychnobity

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Show that (a² - b²)(c²-d²) <= (ac-bd)^2
Expand both sides

a2c2 - a2d2 - b2c2 + b2d2 ≤ a2c2 - 2abcd + b2d2

- a2d2 - b2c2 ≤ -2abcd

a2d2 + b2c2 ≥ 2abcd

.'. to prove (a2 - b2)(c2 - d2) ≤ (ac-bd)2, is to prove that:

a2d2 + b2c2 ≥ 2abcd

(ad - bc)2 ≥ 0

a2d2 + b2c2 - 2abcd ≥ 0

.'. a2d2 + b2c2 ≥ 2abcd

.'. (a2 - b2)(c2 - d2) ≤ (ac-bd)2
 

-Onlooker-

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Expand both sides

a2c2 - a2d2 - b2c2 + b2d2 ≤ a2c2 - 2abcd + b2d2

- a2d2 - b2c2 ≤ -2abcd

a2d2 + b2c2 ≥ 2abcd

.'. to prove (a2 - b2)(c2 - d2) ≤ (ac-bd)2, is to prove that:

a2d2 + b2c2 ≥ 2abcd

(ad - bc)2 ≥ 0

a2d2 + b2c2 - 2abcd ≥ 0

.'. a2d2 + b2c2 ≥ 2abcd

.'. (a2 - b2)(c2 - d2) ≤ (ac-bd)2
Nice approach.

+ Rep.
 

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