If the solution curve of the differential equation&nbsp; <math> <mrow> <mrow> <mo>(</mo> <mrow> <mn>2</mn> <mi>x</mi> <mo>−</mo> <mn>1</mn> <mn>0</mn> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>3</mn> </mrow> </msup> </mrow> <mo>)</mo> </mrow> <mi>d</mi> <mi>y</mi> <mo>+</mo> <mi>y</mi> <mi>d</mi> <mi>x</mi> <mo>=</mo> <mn>0</mn> <mo>,</mo> </mrow> </math> passes through the points (0, 1) and (2, b), then b is a root of the equation:

y5 – y2 – 1 = 0

y5 – 2y – 2 = 0

2y5 – 2y – 1 = 0

2y5 – y2 – 2 = 0

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Exact Differential Equation Differential Equations Maths Class 12th

If the solution curve of the differential equation $(2 x - 10 y^{3}) d y + y d x = 0,$ passes through the points (0, 1) and (2, b), then b is a root of the equation:

Option 1 -

y⁵ – y² – 1 = 0

Option 2 -

y⁵ – 2y – 2 = 0

Option 3 -

2y⁵ – 2y – 1 = 0

Option 4 -

2y⁵ – y² – 2 = 0

2 Views | Posted a month ago

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1 Answer

Answered by

alok kumar singh | Contributor-Level 10

a month ago

Correct Option - 1

Detailed Solution:

$(2 x - 10 y^{3}) d y + y d x = 0$

$\frac{d x}{d y} + \frac{2 x}{y} - 10 y^{2} = 0$

$\frac{d x}{d y} + \frac{2}{y} x = 10 y^{2} \to$ Linear differential equation

$P = \frac{2}{y}, Q = 10 y^{2}$

$N o w p u t x = 2, y = β t h e n 2 β^{2} = 2 β^{5} - 2$

or $β^{5} - β^{2} - 1 = 0$

So B will be roots of $y^{5} - y^{2} - 1 = 0$

<math> <mrow> <mrow> <mo>(</mo> <mrow> <mn>2</mn> <mi>x</mi> <mo>−</mo> <mn>1</mn> <mn>0</mn> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>3</mn> </mrow> </msup> </mrow> <mo>)</mo> </mrow> <mi>d</mi> <mi>y</mi> <mo>+</mo> <mi>y</mi> <mi>d</mi> <mi>x</mi> <mo>=</mo> <mn>0</mn> </mrow> </math>               <math> <mrow> <mfrac> <mrow> <mi>d</mi> <mi>x</mi> </mrow> <mrow> <mi>d</mi> <mi>y</mi> </mrow> </mfrac> <mo>+</mo> <mfrac> <mrow> <mn>2</mn> <mi>x</mi> </mrow> <mrow> <mi>y</mi> </mrow> </mfrac> <mo>−</mo> <mn>1</mn> <mn>0</mn> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msup> <mo>=</mo> <mn>0</mn> </mrow> </math>               <math> <mrow> <mfrac> <mrow> <mi>d</mi> <mi>x</mi> </mrow> <mrow> <mi>d</mi> <mi>y</mi> </mrow> </mfrac> <mo>+</mo> <mfrac> <mrow> <mn>2</mn> </mrow> <mrow> <mi>y</mi> </mrow> </mfrac> <mi>x</mi> <mo>=</mo> <mn>1</mn> <mn>0</mn> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msup> <mo>→</mo> </mrow> </math> Linear differential equation <math> <mrow> <mi>P</mi> <mo>=</mo> <mfrac> <mrow> <mn>2</mn> </mrow> <mrow> <mi>y</mi> </mrow> </mfrac> <mo>,</mo> <mi>Q</mi> <mo>=</mo> <mn>1</mn> <mn>0</mn> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msup> </mrow> </math>               <math> <mrow> <mi>N</mi> <mi>o</mi> <mi>w</mi> <mtext> </mtext> <mtext> </mtext> <mi>p</mi> <mi>u</mi> <mi>t</mi> <mtext> </mtext> <mtext> </mtext> <mi>x</mi> <mo>=</mo> <mn>2</mn> <mo>,</mo> <mi>y</mi> <mo>=</mo> <mi>β</mi> <mtext> </mtext> <mtext> </mtext> <mi>t</mi> <mi>h</mi> <mi>e</mi> <mi>n</mi> <mtext> </mtext> <mtext> </mtext> <mn>2</mn> <msup> <mrow> <mi>β</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msup> <mo>=</mo> <mn>2</mn> <msup> <mrow> <mi>β</mi> </mrow> <mrow> <mn>5</mn> </mrow> </msup> <mo>−</mo> <mn>2</mn> </mrow> </math>              or <math> <mrow> <msup> <mrow> <mi>β</mi> </mrow> <mrow> <mn>5</mn> </mrow> </msup> <mo>−</mo> <msup> <mrow> <mi>β</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msup> <mo>−</mo> <mn>1</mn> <mo>=</mo> <mn>0</mn> </mrow> </math>  So B will be roots of <math> <mrow> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>5</mn> </mrow> </msup> <mo>−</mo> <msup> <mrow> <mi>y</mi> </mrow> <mrow> <mn>2</mn> </mrow> </msup> <mo>−</mo> <mn>1</mn> <mo>=</mo> <mn>0</mn> </mrow> </math>

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If the solution curve of the differential equation $(2 x - 10 y^{3}) d y + y d x = 0,$ passes through the points (0, 1) and (2, b), then b is a root of the equation:

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If the solution curve of the differential equation ( 2 x − 1 0 y 3 ) d y + y d x = 0 , passes through the points (0, 1) and (2, b), then b is a root of the equation:

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If the solution curve of the differential equation $(2 x - 10 y^{3}) d y + y d x = 0,$ passes through the points (0, 1) and (2, b), then b is a root of the equation: