1 Answer

Artem Andreev · Answer 1 · 2023-10-01T06:19:42+0000

Let's first start with the given that we have ;

${:\implies \quad \sf (dy)/(dx)=xy^(2)}$

Collect like terms in different sides ;

${:\implies \quad \sf (dy)/(y^2)=x\: dx}$

Integrating both sides will yield

${:\implies \quad \displaystyle \sf \int y^(-2)dy=\int x^(1)dx}$

${:\implies \quad \sf (y^(-2+1))/(-2+1)=(x^(1+1))/(1+1)+C}$

${:\implies \quad \sf (-1)/(y)=(x^2)/(2)+C}$

Where, C is the Arbitrary Constant;

Now, as we are given that x = 1, when y = 1, so putting these values we will obtain C = (-3/2) , putting the values ;

${:\implies \quad \sf (-1)/(y)=(x^2)/(2)-\frac32}$

${:\implies \quad \sf -(1)/(y)=(x^(2)-3)/(2)}$

${:\implies \quad \sf -y=(2)/(x^(2)-3)}$

${:\implies \quad \bf \therefore \quad \underline{\underline{y=(-2)/(x^(2)-3)}}}$

Option B) is the required answer

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