Addition operations in polar form? $sqrt(18)(cos175°+isin175°)+(cos40°+isin40°)$

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Addition operations in polar form? $sqrt(18)(cos175°+isin175°)+(cos40°+isin40°)$

What would be the best way to perform addition operations in the polar form? Convert to cartesian form then add Re/Im components or is there another way? I only know how to multiply/divide in polar form.

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Answer 1 · 2018-06-25T11:10:08

$color(brown)(=> -3.4605 + 1.0126 i$

Explanation:

$z= a+bi= r (costheta+isintheta)$

$r=sqrt(a^2+b^2), " " theta=tan^-1(b/a)$

$r_1(cos(theta_1)+isin(theta_2))+r_2(cos(theta_2)+isin(theta_2))=r_1cos(theta_1)+r_2cos(theta_2)+i(r_1sin(theta_1)+r_2sin(theta_2))$
$sqrt18(cos 175 + i sin 175) + 9cos 40 + i sin 40)$

$=> (sqrt18 cos 175 + cos 40) + i (sqrt18 sin 175 + sin 40)$

$=>( -4.2265 + 0.7660) + i (0.3698 + 0.6428)$

$color(brown)(=> -3.4605 + 1.0126 i$

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Addition operations in polar form? $sqrt(18)(cos175°+isin175°)+(cos40°+isin40°)$

What would be the best way to perform addition operations in the polar form? Convert to cartesian form then add Re/Im components or is there another way? I only know how to multiply/divide in polar form.

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

Addition operations in polar form? sqrt(18)(cos175°+isin175°)+(cos40°+isin40°)sqrt(18)(cos175°+isin175°)+(cos40°+isin40°)

What would be the best way to perform addition operations in the polar form? Convert to cartesian form then add Re/Im components or is there another way? I only know how to multiply/divide in polar form.

1 Answer

Explanation:

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Impact of this question

Addition operations in polar form? $sqrt(18)(cos175°+isin175°)+(cos40°+isin40°)$