(a) Write a function with the header: unsigned long factorial Func( const unsigned long n) that gets the positive integer n and calculates n! n! = n*(n-1)* (n-2)* (n-3) ... * 3 * 2 * 1; (b) The trigonometric function sin(x) can be approximately calculated using the following formula, where n! is factorial(n) - for example 3!=3*2*1 = 6 (the function in previous problem). sin x = Σ n=0 (-1) n (2n + 1)! x 2n+1 = x x³ x5 3! 5! for all a The more terms we use in the series, the higher will be accuracy of the calculations. By using infinite terms in the series we will have the exact value. Write a program that gets x and calculates sin(x) using 5, 10, 20 terms.

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(a) Write a function with the header: unsigned long factorial Func( const unsigned long n) that gets the positive integer n and calculates n! n! = n*(n-1)* (n-2)* (n-3) ... * 3 * 2 * 1; (b) The trigonometric function sin(x) can be approximately calculated using the following formula, where n! is factorial(n) - for example 3!=3*2*1 = 6 (the function in previous problem). sin z = (−1)n (2n + 1)! 2n+1 = 0 3! 5! for all c The more terms we use in the series, the higher will be accuracy of the calculations. By using infinite terms in the series we will have the exact value. Write a program that gets x and calculates sin(x) using 5, 10, 20 terms.