How do you step through solving $4 cos (4 θ) = - 2 sin (θ)$ $4cos(4theta) = -2sin(theta)$ ?

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How do you step through solving $4 cos (4 θ) = - 2 sin (θ)$ $4cos(4theta) = -2sin(theta)$ ?

I’ve tried a number of steps but having a hard time calculating

3 Answers

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Answer 1 · 2018-08-05T01:30:58

$x = k π + {(- 1)}^{k} arcsin (s_{i}), i = 1, 2, 3, 4$ $x = kpi + ( - 1 )^k arcsin ( s_i), i = 1, 2, 3, 4$
$and k = 0, +- 1, +-2, +- 3, ...$ , where
${s_i}, i = 1, 2, 3, 4$ = ( -0.96460 -0.34258 0.46343 0.85435 )

Explanation:

Let $s = sin theta$ . Then

$s = - 2 cos 4theta = -2 ( 1 - 2 sin^2(2theta) )$

$= - 2 ( 1 - 8 sin^2theta cos^2theta ) = - 2 ( 1 - 8 s^2 ( 1 - s^2 ))$

giving the biquadratic

$16 s^4 - 16 s^2 + s + 2 = 0$ .

Graph locates s near $- 1, - 0.25, 0.5 and 1$
graph{16 x^4-16 x^2+x+2-y=0[-2 2 -1 1]}
5-sd s near $-1$ is #-0.96460, giving

$theta = - 74. 71^o in [ - pi/2, pi/2 ]$ , from the general solution

$( 180 k + ( - 1 )^k( - 74.71)^o, k = 0, +_ 1, +- 2, +- 3, ...$
graph{16 x^4-16 x^2+x+2-y=0[-0.9646 -0.964595-0.0001 0.0001]}

To be continued, in my 2nd answer, due to heavy graphics load, on my low-memory computer.

Answer 2 · 2018-08-05T05:37:41

Continuation, for the 2nd part of my answer. Please wait, for more details, in 3rd part..

Explanation:

Graph for cross check, for $s = s_1 = -0.96460$ , giving solutions

$theta = ...-105.29^o, -74.71^o, 254.71^o, ...$

$= ... - 1.838 rad, -1.304 rad, 4.445 rad, ..$

Graph for common values, from the sine waves

$sin theta and -2 cos 4theta$ :
graph{(y-sin x)(y+2 cos (4x))(x+1.838+0.0001y)(x+1.304+0.0001y)(x-4.445+0.0001y)=0[-2 6 -2 2]}

Note the common points, on these $theta$ -solution lines.

The second $s = -0.34258$
graph{16 x^4-16 x^2+x+2-y=0[-0.342583 -0.34258 -0.0001 0.0001]}
Correspondingly,

$theta = kpi + ( - 1 )^k arcsin (-0.34258) = ... , -159.57^o,$

$- 20.03^o, 200.03^o ...$

$= ...-2.875 rad, -0.3496 rad, 3.491 rad, ...$

To be continued.

Answer 3 · 2018-08-06T05:06:15

Continuation, for completion. Answer:
$x = kpi + ( - 1 )^k arcsin ( s_i), i = 1, 2, 3, 4$
$and k = 0, +- 1, +-2, +- 3, ...$ , where
${s_i}, i = 1, 2, 3, 4$ = ( -0.96460 -0.34258 0.46343 0.85435 )

Explanation:

The third 5-sd $s = 0.46243$ .

Correspondingly,

$x = kpi + ( - 1 )^k arcsin ( 0.46343), k = 0, +- 1, +-2, +_ 3, ...$
graph{y-16(x^4-x^2)-x-2=0[0.43242 0.43243 -0.0001 0.0001]}
As the $s^3$ -term is absent in the biquadratic,

the sum of the four s values is 0.

So, the fourth s = - ( sum of the other three ) = 0.85475.

Correspondingly,

$x = kpi + ( - 1 )^k arcsin ( 0.85475), k = 0, +- 1, +-2, +_ 3, ...$

Answer:

$x = kpi + ( - 1 )^k arcsin ( s_i), i = 1, 2, 3, 4$

$and k = 0, +- 1, +-2, +- 3, ...$ , where

${s_i}, i = 1, 2, 3, 4 = ( -0.96460 -0.34258 0.46343 0.85435 )$

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How do you step through solving $4 cos (4 θ) = - 2 sin (θ)$ $4cos(4theta) = -2sin(theta)$ ?

I’ve tried a number of steps but having a hard time calculating

3 Answers

Explanation:

Explanation:

Explanation:

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How do you step through solving 4cos(4theta) = -2sin(theta)4cos(4θ)=−2sin(θ)4cos(4theta) = -2sin(theta)?

I’ve tried a number of steps but having a hard time calculating

3 Answers

Explanation:

Explanation:

Explanation:

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How do you step through solving $4 cos (4 θ) = - 2 sin (θ)$ $4cos(4theta) = -2sin(theta)$ ?