COMPLEX JEAPORDY

1. COMPLEX JEAPORDY 10 10 10 10 20 20 20 20 30 30 30 30 100 100 100 50

2. 10 points. Log Rules • Write as the log of a single number: • 3log(5)+2log(3)-log(5) log225

3. 20 points. Exponential Equations • Solve 23x-1=12 X=1.528

4. 30 points. Log equation • Solve ln(x+3)=ln(x)+ln(3) X=3/2 or 1.5

5. 50 points. Solving with logs • Solve this for x in terms of k

6. 10 points. Argand Diagrams, manipulation • What are the complex numbers a and c ? • Find ac where a and c are shown below: A=(1+2i) C=(-3+4i) AC=(-11-2i)

7. 20 points. Modulus • Find the modulus of z where z=2+3i [z]=√13

8. 30 points. Imaginary factors is a root of Find the value of A A=6

9. 10 points. Simplify

10. 20 points. Rationalise the denominator

11. 30 points. Irrational Equation • Solve: X=8 (x=1 does not hold)

12. 100 points. Harder solving • Solve the equation X=19.6 or 1.38

13. 10 points. Use the factor theorem to factorise & hence solve (x-1)(x+2)(x+5)=0 X=1,-2 or -5

14. 20 points. Solve the following equation by completing the square

15. 30 points. Solving • One root of the equation is 2i. • Find the value of k and the two remaining roots. • f(2i)=0 since 2i is a root. By substitution (factor theorem) k must equal 32. • Roots are 2i, -2i (conjugate root theorem) and -8 (by evaluating constant)

16. 100 points. Binomial Expansion Find the value of the term that is independent of x (the constant) in the expansion of: For r=8, the (9th) term is:

17. 100 points. Algebraic Proof • Show that if w and z are two complex numbers. • Let w=x+yi and z=a+ib • LHS: (x-yi)(a+bi)=ax+bxi-ayi-byi2=ax+by+bxi-ayi=ax+by+(bx-ay)i • RHS: =LHS Therefore statement is true