If e y (x + 1) = 1, then show that y d x 2 = ( dx ) 2 .

x e y + e y = 1 ...(i) Differentiating (i) w.r.t. x, we get x e y dx + e y + e y dx = 0 dx = x + 1 …(ii) From (ii), ( dx ) 2 = ( x + 1 ) 2 = (x + 1) 2 …(iii) Differentiating (ii) w.r.t. x, we get y d x 2 = (x + 1) 2 ..(iv) From (iii) and (iv), we get y d x 2 = ( dx ) 2 Hence proved. .

Continuity and Differentiability — Class 12 Maths Solution

ncert exercise SA NCERT Ex.5.7 ,Q.16,Page 184

Question

If ${e^y}(x + 1) = 1,$ then show that $\cfrac{{{d^2}y}}{{d{x^2}}} = {\left( {\cfrac{{dy}}{{dx}}} \right)^2}$ .

Step-by-step Solution

$x{e^y} + {e^y} = 1$ ...(i)
Differentiating (i) w.r.t. x, we get

$x{e^y}\cfrac{{dy}}{{dx}} + {e^y} + {e^y}\cfrac{{dy}}{{dx}} = 0$ $\Rightarrow$

$\cfrac{{dy}}{{dx}} = \cfrac{{ - 1}}{{x + 1}}$ …(ii)

From (ii), ${\left( {\cfrac{{dy}}{{dx}}} \right)^2} = {\left( {\cfrac{{ - 1}}{{x + 1}}} \right)^2} = \cfrac{1}{{{{(x + 1)}^2}}}$ …(iii)

Differentiating (ii) w.r.t. x, we get
$\cfrac{{{d^2}y}}{{d{x^2}}} = \cfrac{1}{{{{(x + 1)}^2}}}$ ..(iv)

From (iii) and (iv), we get
$\cfrac{{{d^2}y}}{{d{x^2}}} = {\left( {\cfrac{{dy}}{{dx}}} \right)^2}$

Hence proved. .

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