How do you simplify #i^3 (5+i) + 7i#? Precalculus Complex Numbers in Trigonometric Form Multiplication of Complex Numbers 1 Answer Shwetank Mauria Feb 18, 2016 Answer is #1+2i# Explanation: To simplify #i^3(5+i)+7i#, remember #i^2=-1# and as #i^4=(i^2)^2#, #i^4=1#. Hence #i^3(5+i)+7i# = #5i^2*i+i^4+7i# = #-5i+1+7i# = #1+2i# Answer link Related questions How do I multiply complex numbers? How do I multiply complex numbers in polar form? What is the formula for multiplying complex numbers in trigonometric form? How do I use the modulus and argument to square #(1+i)#? What is the geometric interpretation of multiplying two complex numbers? What is the product of #3+2i# and #1+7i#? How do I use DeMoivre's theorem to solve #z^3-1=0#? How do I find the product of two imaginary numbers? How do you simplify #(2+4i)(2-4i)#? How do you multiply #(-2-8i)(6+7i)#? See all questions in Multiplication of Complex Numbers Impact of this question 1331 views around the world You can reuse this answer Creative Commons License