If a - b = 3 and ab = 10, find: a^3 - b^3.

Using the formula, [∵ (x \- y) 3 = x 3 \- y 3 \- 3xy(x \- y)] So, (a \- b) 3 = a 3 \- b 3 \- 3ab(a \- b) Putting the values a \- b = 3 and ab = 10, we get ⇒ (3) 3 = a 3 \- b 3 \- 3 x 10 x 3 ⇒ 27 = a 3 \+ b 3 \- 90 ⇒ a 3 \+ b 3 = 27 \+ 90 ⇒ a 3 \+ b 3 = 117 Hence, the value of a 3 \+ b 3 is 117.

Mathematics

If a - b = 3 and ab = 10, find: a³ - b³.

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Answer

Using the formula,

[∵ (x - y)³ = x³ - y³ - 3xy(x - y)]

So,

(a - b)³ = a³ - b³ - 3ab(a - b)

Putting the values a - b = 3 and ab = 10, we get

⇒ (3)³ = a³ - b³ - 3 x 10 x 3

⇒ 27 = a³ + b³ - 90

⇒ a³ + b³ = 27 + 90

⇒ a³ + b³ = 117

Hence, the value of a³ + b³ is 117.

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If a - b = 3 and ab = 10, find: a³ - b³.

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