A. Given z1 = 26 – j7, z2 = 3 + j4, z3 = zi, z4 = zż: 1. Find the sum and difference of z, and z2. Express the answer in rectangular form. 2. Find the sum and difference of z3 and z4. Express the answer in rectangular form. 3. Find the product and quotient of z1 and z2, showing how to find the product and quotient in rectangular and polar forms. Express the final answers in rectangular form. 4. Repeat (c) for Z3 and z4. 5. Express all the answers in (a) to (d) into its polar and exponential forms. Use the

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A. Given z1 = 26 – j7, z2 = 3 + j4, z3 = zi, z4 = zż: 1. Find the sum and difference of z, and z2. Express the answer in rectangular form. 2. Find the sum and difference of z3 and z4. Express the answer in rectangular form. 3. Find the product and quotient of z1 and z2, showing how to find the product and quotient in rectangular and polar forms. Express the final answers in rectangular form. 4. Repeat (c) for Zz and z4. 5. Express all the answers in (a) to (d) into its polar and exponential forms. Use the principal value of the argument.