What is the solution for ${cos}^{n} x - {sin}^{n} x = 1$ $cos^nx-sin^nx=1$ witn $n in NN^+$ ?

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What is the solution for ${cos}^{n} x - {sin}^{n} x = 1$ $cos^nx-sin^nx=1$ witn $n in NN^+$ ?

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Answer 1 · 2016-11-06T14:24:42

$x=2kpi, k=0,+-1, +-2, +-3,...$ , sans odd k, when n is odd. In these omitted cases, x = (2k+1)pi/2, for odd k and odd n.

Explanation:

Let me solve $cos^n x+ sin^n x=1$ , instead.

Squaring both sides,

$(cos^(2n)x+sin^(2n)x)+2cos^nxsin^nx$

$=(1)+2cos^nx sin^nx=1$

So,

#(sinx cos x)^n=0 to( sin (2x))^n=0 to sin (2x)=0 to 2x=kpi to x = k/2pi,

k=0, +-1, +-2, +-3, ...#. This includes extraneous solutions for odd k

against even n.#

With this clue, let us consider the given problem.

Rearranging as $cos^n x-1+sin^n x$ and squaring,

$cos^(2n) x=(1+sin^n x)^2=sin^(2n) x+2 sin^n x+1$

Rearranging,

$1-2 sin^nx=(cos^(2n)x-sin^(2n) x)=1$

So,

$sin^nx=0 to sin x =0 to x=kpi, k=0,+-1, +-2, +-3,...$ .

Here, odd k gives extraneous solution for odd n.

To include these cases as well, let us try squaring the alternative

rearrangement.

$sin^(2n) x=(cos^n x-1)^2 to cos^n x=0 to cos x =0 to x=(2k+1)pi/2$ ,

k=+-1, +-3, +-5.... n=1, 3, 5, ..#

Answer 2 · 2016-11-08T11:04:21

If $n$ is even the solution is $x=pm kpi, k=0,1,2,cdots$
If $n$ is odd the solution is $x=-pi/2pm2kpi, k=0,1,2,cdots$

Explanation:

For $n=1$ we have

$cosx-sinx=1$ or $cosx+cos(x+pi/2)=1$

We know that

$cos(a+b)+cos(a-b)=2cosacosb$ so using $a=x+pi/4, b=-pi/4$ we have

$cosx-sinx=sqrt(2)cos(x+pi/4)=1$ Solving for $x$ we have

$x = 0+2kpi$ and $x = -pi/2+2kpi$ for $k=0,1,2,3,cdots$

Now supposing $n=2k$ an even integer

$cos^(2k)x-sin^(2k)x = 1->cos^(2k)x=1+sin^(2k)x$

but $abs (cos x) le 1$ so the solution is

$sinx=0$ or $x=pm kpi, k = 0,1,2,cdots$

now supposing $n=2k+1$ an odd integer, we have

$cos^(2k+1)x-sin^(2k+1)x = cos^(2k+1)(-x)-sin^(2k+1)(-x) = cos^(2k+1)(y)+sin^(2k+1)(y) = 1$ with $y=-x$

but

$cos^2y cos^(2k-1)y-sin^2ysin^(2k-1)yle cos^2y+sin^2y = 1$

so the equality is observed only when

$cos^(2k-1)y=1, sin^(2k-1)y=0$ or when $cos^(2k-1)y=0, sin^(2k-1)y=1$
and the solutions are

$y=kpi$ for the first case and $y=pi/2+2kpi$ for the second.

Ressuming

If $n$ is even the solution is $x=pm kpi, k=0,1,2,cdots$
If $n$ is odd the solution is $x=-pi/2pm2kpi, k=0,1,2,cdots$

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What is the solution for ${cos}^{n} x - {sin}^{n} x = 1$ $cos^nx-sin^nx=1$ witn $n in NN^+$ ?

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