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4 votes
4 votes

\tt If\;\; \sqrt[3]{x}+a=b,\:then \; x=

User Sio
by
2.7k points

2 Answers

24 votes
24 votes

Answer:

x = b³ - 3b²a + 3a²b - a³

Explanation:

Given:


\sqrt[3]{x} + a = b

To determine the value of "x", we need to isolate it. Start out by subtracting "a" both sides. Then, we can cube both sides to remove the cube root. Finally, we can simplify both sides to obtain the value of x.

Subtract "a" both sides to isolate ∛x:


\implies \sqrt[3]{x} + a - a = b - a


\implies \sqrt[3]{x} = b - a

Cube both sides to remove the cube root on the L.H.S:


\implies (\sqrt[3]{x})^(3) = (b - a)^(3)


\implies x= (b - a)^(3)

Use the formula (a - b)³ = a³ - 3a²b + 3ab² - b³


\implies x = b^(3) - 3(b)^(2)(a) + 3(b)(a)^(2) - a^(3)


\implies \boxed{x = b^(3) - 3b^(2)a + 3a^(2)b - a^(3)}

Thus, the value of x is b³ - 3b²a + 3a²b - a³.

User Ruben Vreeken
by
2.5k points
18 votes
18 votes

Answer:


x=(b-a)^(3)

Explanation:

  • Subtract ‘a’ from both sides
  • This gives
    \sqrt[3]{x}=b-a
  • Cube both sides
  • This gives
    x=(b-a)^(3)