How do you find the derivative of $x \sqrt{1 - x}$ $xsqrt (1-x)$ ?

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How do you find the derivative of $x \sqrt{1 - x}$ $xsqrt (1-x)$ ?

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Answer 1 · 2018-03-11T17:34:31

$\frac{2 - 3 x}{2 \sqrt{1 - x}}$ $(2- 3x)/(2 sqrt(1-x))$

Explanation:

The expression is product of two functions in $x$ $x$ .

Denoting these by $f (x)$ $f(x)$ and $g (x)$ $g(x)$ , respectively,

the first is
$f (x) = x$ $f(x) = x$

and the second is
$g (x) = \sqrt{1 - x}$ $g(x) = sqrt(1 - x)$

$g (x)$ $g(x)$ is a compound function (ie ie a function of a function)

The derivative of the expression is

$f'(x)g(x) + f(x)g'(x)$

The derivative of the first function is straightforward
$f'(x) = 1$

The derivative of the second is trickier because it is a compound function. This requires the chain rule. The outer function is the square root function, and the inner function is the polynomial $(1 - x)$

writing the compound function as
$h(j(x))$ ( $h$ of $j$ of $x$ ), the derivative is

$h'(j(x))j'(x)$

That is, the derivative of the outer function evaluated at the inner function times the derivative of the inner function

It makes things simpler to rewrite $g(x)$ using index notation, that is

$g(x) = (1 - x)^(1/2)$

Evaluating the outer function is the straightforward application of the rules of polynomial differentiation applied to its index, that is

$h'(j(x)) = 1/2(1-x)^(1/2 - 1) = 1/2(1-x)^(-1/2)$

And the derivative of the inner function is
$j'(x) = -1$

So the derivative of the compound function $g(x)$ is

$g'(x) = h'(j(x))j'(x) = 1/2(1-x)^(-1/2)(-1)$
$= -1/2 (1 - x )^(-1/2)$

Or, if you prefer, reverting to the square root notation and noting the negative index

$g'(x) = - 1/(2 sqrt(1-x))$

So the overall derivative is

$f'(x)g(x) + f(x)g'(x)$

$= (1)(1 - x)^(1/2)+ (x)(-1/2 (1 - x )^(-1/2))$

$= sqrt(1-x) - x/(2 sqrt(1-x))$

$= (2(1-x))/(2 sqrt(1-x)) - x/(2 sqrt(1-x))$

$= (2- 2x- x)/(2 sqrt(1-x))$

$= (2- 3x)/(2 sqrt(1-x))$

Answer 2 · 2018-03-11T17:49:34

$(2-3x)/(2sqrt(1-x)$

Explanation:

$color(red)(d/(dx)(u*v)=u*(dv)/(dx)+v*(du)/(dx))$
and, $d/(dx)(sqrt(1-x))=d/(dx)(1-x)^(1/2)=1/2*(1-x)^(-1/2)=1/2*1/sqrt(1-x)$
$y=x*sqrt(1-x)$
$=>(dy)/(dx)=x*d/(dx)(sqrt(1-x))+sqrt(1-x)*d/(dx)(x)$
$=>(dy)/(dx)=x*1/(2sqrt(1-x))(-1)+sqrt(1-x)*1$
$=(-x)/(2sqrt(1-x))+sqrt(1-x)=(-x+2(1-x))/(2sqrt(1-x)$
$=(-x+2-2x)/(2sqrt(1-x))=(2-3x)/(2sqrt(1-x)$

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How do you find the derivative of $x \sqrt{1 - x}$ $xsqrt (1-x)$ ?

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