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Answer it please .
mathematics question.​

Answer it please . mathematics question.​-example-1
User Agaase
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2 Answers

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x + (1)/(x) = (5)/(2) \\ = > {(x + (1)/(x) )}^(2) = {( (5)/(2) )}^(2) \\ = > {x}^(2) + 2 * x * (1)/(x) + \frac{1}{ {x}^(2) } = (25)/(4) \\ = > {x}^(2) + \frac{1}{ {x}^(2) } = (25)/(4) - 2 \\ = > {x}^(2) + \frac{1}{ {x}^(2) } = (25 - 8)/(4) \\ = > {x}^(2) + \frac{1}{ {x}^(2) } = (17)/(4)


{x}^(2) + \frac{1}{ {x}^(2) } = (17)/(4) \\ = > {( {x}^(2) + \frac{1}{ {x}^(2) } )}^(2) = {( (17)/(4) )}^(2) \\ = > {x}^(4) + 2 * {x}^(2) * \frac{1}{ {x}^(2) } + \frac{1}{ {x}^(4) } = (289)/(16) \\ = > {x}^(4) + \frac{1}{ {x}^(4) } = (289)/(16) - 2 \\ = > {x}^(4) + \frac{1}{ {x}^(4) } = (289 - 32)/(16) \\ = > {x}^(4) + \frac{1}{ {x}^(4) } = (257)/(16)

Hope you could understand.

If you have any query, feel free to ask.

User Kkk
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11 votes
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Explanation:

We have: {x+(1/x)} = 5/2

On, squaring on both sides,we get

⇛{x+(1/x)}² = (5/2)²

Comparing the given expression with (a+b)², we get

a = x and b = 1/x

Now, using (a+b)² = a²+b²+2ab, we get

⇛x² + (1/x)² + 2(x)(1/x) = (5/2)²

Both x will cancel out because they are in multiple sign.

⇛x² + (1/x²) + 2 = {(5*5)/(2*2)}

⇛x² + (1/x²) + 2 = 25/4

Shift the number 2 from LHS to RHS, changing it's sign.

⇛x² + (1/x²) = (25/4) - 2

⇛x² + (1/x²) = (25/4 ) - (2/1)

Take the LCM of the denominator 4 & 1 is 4 is RHS.

⇛x² + (1/x²) = {(25*1 - 2*4)/4)

⇛x² + (1/x²) = {(25-8)/4}

⇛x² + (1/x²) = (17/4)

Again, squaring on both sides, we get

{x² + (1/x²)}² = (17/4)²

Comparing the given expression with (a+b)², we get

a = x² and b = (1/x²)

Now, using (a+b)² = a²+b²+2ab, we get

⇛(x²)² + (1/x²)² + 2(x²)(1/x²) = (17/4)²

⇛x⁴ + (1/x⁴) + 2(x²)(1/x²) = (17/4)²

Both x² will cancel out because they are in multiple sign.

⇛x⁴ + (1/x⁴) + 2 = {(17*17)/(4*4)}

⇛x⁴ + (1/x⁴) + 2 = (289/16)

Shift the number 2 from LHS to RHS, changing it's sign.

⇛x⁴ + (1/x⁴) = (289/16) - 2

⇛x⁴ + (1/x⁴) = (289/16) - (2/1)

Take the LCM of 16 and 1 is 16 in RHS.

⇛x⁴ + (1/x⁴) = {(289*1 - 2*16)/16}

⇛x⁴ + (1/x⁴) = {(289-32)/16}

⇛x⁴ + (1/x⁴) = (257/16)

Therefore, x⁴ + (1/x⁴) = 257/16

Answer: Hence, the value of x⁴ + (1/x⁴) is 257/16.

Please let me know if you have any other questions or doubt in my explanation.

User Bruno Klein
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