Evaluate the limit $lim_(x rarr 1) sin(pix)/(1-x)$ ?

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Evaluate the limit $lim_(x rarr 1) sin(pix)/(1-x)$ ?

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Answer 1 · 2017-05-12T09:49:27

$lim_(xrarr-1)(sin(pi*x)/(1-x))=pi$

Explanation:

The original expression was in indeterminate form. Since you get $0/0$ if you evaluate directly with $x=1$ .
Apply the L'Hospital's Rule to solve this problem. How do you use L'hospital's rule to find the limit?
Here are my steps:
$lim_(xrarr1)(sin(pi*x)/(1-x))$
$=lim_(xrarr1)((d/dx*sin(pi*x))/(d/dx*(1-x)))$
$=lim_(xrarr1)((pi*cos(pi*x))/(-1))$
$=lim_(xrarr1)((pi*cos(pi))/(-1))$
$=pi*((-1)/-1)$
$=pi$

Answer 2 · 2017-05-12T10:53:50

Answer: $pi$

Explanation:

Find the limit of
$lim_(x->1)(sin(pix))/(x-1)$

Note that this is an indeterminate form: $0//0$ . We can use L'Hopital's Rule to solve this equation.

Applying L'Hopital's Rule, we get that
$lim_(x->1)(sin(pix))/(x-1)=lim_(x->1)(d/dx(sin(pix)))/(d/dx(x-1))$
$=lim_(x->1)(picos(pix))/(-1)$
$=lim_(x->1)-picos(pix)$

The limit of a continuous function at a point is just it's value there.

$=lim_(x->1)-picos(pix)=-picos(pi)=pi$

Answer 3 · 2017-05-12T12:09:12

$lim_(x rarr 1) sin(pix)/(1-x) = pi$

Explanation:

We want to find the limit:

$L = lim_(x rarr 1) sin(pix)/(1-x)$

Let us make a simple substitution:

Let $\ \ u =pi(1-x)=pi-pix$

Then $pix = pi - u$ , and $1-x=u/pi$
As $x rarr 1 => u rarr 0$

Then the limit becomes:

$L = lim_(u rarr 0) sin(pi-u)/(u/pi)$
$\ \ = lim_(u rarr 0) pi \ {sinpicosu-cospisinu}/u$
$\ \ = pi \ lim_(u rarr 0) {sinpicosu-cospisinu}/u$

Using $sinpi=0$ and $cospi=-1$ we have:

$L = pi \ lim_(u rarr 0) (sinu)/u$

And an elementary trigonometry calculus limit is that

$lim_(theta rarr 0) (sintheta)/theta = 1$

Leading to:

$L = pi$

If we look at the graph of the function:
graph{sin(pix)/(1-x) [-4.123, 5.74, -0.818, 4.11]}

We note that at $x=1$ the function is continuous (so the limit exists), and has a value slightly above $3$ consistence with our analysis.

Answer 4 · 2017-05-12T12:43:24

$lim_(x->1) sin(pix)/(1-x)= pi$

Explanation:

The limit:

$lim_(x->1) sin(pix)/(1-x)$

is in the indeterminate form $0/0$ so we can solve it using l'Hospital's rule:

$lim_(x->1) sin(pix)/(1-x) = lim_(x->1) (d/dx sin(pix))/(d/dx (1-x)) = lim_(x->1) (picos(pix))/(-1)=pi$

Alternatively it can be resolved algebraically by substituting $t= pi(1-x)$ , so that $x=1-t/pi$ :

$lim_(x->1) sin(pix)/(1-x) = lim_(t->0) sin(pi(1-t/pi))/(1-(1-t/pi)) = pi lim_(t->0) sin(pi-t)/t$

Using the formula for the sine of the sum of two angles:

$sin(pi-t) = sinpi cos(t) -cospi sin(t) = sin(t)$

then:

$lim_(x->1) sin(pix)/(1-x) = pi lim_(t->0) sint/t = pi$

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