How do you multiply $e^{\frac{2 π}{3} i} \cdot e^{3 \frac{π}{2} i}$ $e^(( 2 pi )/ 3 i) * e^( 3 pi/2 i )$ in trigonometric form?

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How do you multiply $e^{\frac{2 π}{3} i} \cdot e^{3 \frac{π}{2} i}$ $e^(( 2 pi )/ 3 i) * e^( 3 pi/2 i )$ in trigonometric form?

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Answer 1 · 2016-04-07T16:25:22

$C_{12} = e^{(\frac{2 π}{3} + \frac{3 π}{2})} = e^{\frac{13 π}{6} i}$ $C_12=e^[((2 pi)/3 +(3pi)/2)] = e^ [(13pi)/6i]$

Explanation:

Given: Two complex numbers,
$C_{1} = e^{\frac{2 π}{3} i}, C_{2} = e^{\frac{3 π}{2} i}$ $C_1=e^((2 pi)/ 3 i), C_2= e^((3 pi)/2i)$

Required: The product, $C_{1} \cdot C_{2} = e^{\frac{2 π}{3} i} \cdot e^{\frac{3 π}{2} i}$ $C_1*C_2=e^((2 pi)/ 3 i)*e^((3 pi)/2i)$

Solution Strategy: Use complex multiplication mechanism using the general exponential product rule, $e^{a i} \cdot e^{b i} = e^{a i + b i}$ $e^(ai)* e^(bi) = e^(ai+bi)$
Thus;
$C_{12} = C_{1} \cdot C_{2} = e^{\frac{2 π}{3} i} \cdot e^{\frac{3 π}{2} i} = e^{(\frac{2 π}{3} i) + (\frac{3 π}{2} i)}$ $C_(12)=C_1*C_2=e^((2 pi)/ 3 i)*e^((3 pi)/2i)=e^[((2 pi)/ 3 i)+((3pi)/2i)]$
$C_{12} = e^{(\frac{2 π}{3} + \frac{3 π}{2})} = e^{\frac{13 π}{6} i}$ $C_12=e^[((2 pi)/3 +(3pi)/2)] = e^ [(13pi)/6i]$

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How do you multiply $e^{\frac{2 π}{3} i} \cdot e^{3 \frac{π}{2} i}$ $e^(( 2 pi )/ 3 i) * e^( 3 pi/2 i )$ in trigonometric form?

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Explanation:

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