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Binomial Theorem. For any n E {0,1,2, ..} and any a and b, (a + b)" = E-o G)albn-i. %3D 3D0 Exercise 3. (a) Argue that E"-o G) = 2" and verify this result by summing for each n e {2,3,4}. %3D j%30 (b) Argue that E-o(-1) (G) = 0 and verify this result by summing for n = 4. %3D (c) Evaluate 53 = (2 + 3) directly and also as a sum of 4 terms using the Binomial Theorem. (d) Evaluate 1.8* = (2 - 0.2)* directly and also as a sum of 5 terms using the Binomial Theorem. (e) Argue that E-0 ) p'(1- p)"- = 1, for any 0s p s1. (Use 0° = 1.) (f) Prove Pascal's (or Pingala's) Equation: ) = C)+("), for k = 1,.n-1. ..... This equation explains the structure of "Pascal's (or Khayyam's) Triangle."