This is question 5 in exercise 2.3 from the Cambridge
5. on an Argand diagram the points p and q represent the numbers z1 and z2 respectively. OPQ is an equilateral triangle. Show that z1^2+zx^2=z1z2
Can I use cosine rule to prove this or do I need to use the worked solutions method in which you let a=cispi/3 then at some point they write (1+a^2)=a which i dont understand if anyone could explain that step?
5. on an Argand diagram the points p and q represent the numbers z1 and z2 respectively. OPQ is an equilateral triangle. Show that z1^2+zx^2=z1z2
Can I use cosine rule to prove this or do I need to use the worked solutions method in which you let a=cispi/3 then at some point they write (1+a^2)=a which i dont understand if anyone could explain that step?