SOLUTION: If z1 = 4cis300� and z2 = 2cis30� , find z1z2 in its POLAR FORM: rcis(theta).

Question 1117279: If z1 = 4cis300� and z2 = 2cis30� , find z1z2 in its POLAR FORM: rcis(theta).
Answer by ikleyn(52781) (Show Source): You can put this solution on YOUR website!
.
If z1 = 4cis300� and z2 = 2cis30� , find z1z2 in its POLAR FORM: rcis(theta).
~~~~~~~~~~~~~~~~~~~~

z1*z2 = 4*2*cis(300�+30�) = 8*cis(330�).


Multiply modules and add arguments.

RELATED QUESTIONS
If z1 = 4cis300° and z2 = 2cis30° , find z1z2 in its POLAR FORM:... (answered by ikleyn)

If z1 = 2cis115� and z2 = 3cis65� , write z1z2 in its RECTANGULAR FORM: a +... (answered by ikleyn)

If z1 = 2cis115° and z2 = 3cis65° , write z1z2 in its RECTANGULAR FORM: a + bi. (answered by ikleyn)

Write z1 and z2 in polar form. (Express θ in radians. Let 0 ≤ θ <... (answered by stanbon)

find Re(z1z2/z1) and Im(1/z1z2) if... (answered by ikleyn)

find the product z1z2 and the quotient z1/z3. Express your answer in polar form. {{{ (answered by Alan3354)

If z = 3cis45° , write z^2 in its POLAR FORM:... (answered by ikleyn)

z1=1+2i; z2=1-i write z1,z2 and z1Xz2 in polar... (answered by solver91311)

Given the equivalent impedance of a circuit can be calculated by the expression... (answered by ikleyn)