Find n such as Tn approximates with a 15 digit precision. What irrational number is approximating?
Find n such as Tn approximates with a 15 digit precision. What irrational number is approximating?
(15 pts) 4) Determine if the fol answer. Ln(n) Tn (15 pts) 4) Determine if the fol answer. Ln(n) Tn
Use S - SN<bN+1 to find the smallest value of N such that Sn approximates the value of the sum S to within an error of at most 104 S = (-1)"+1 11 n(n+1)(n+2) (Give your answer as a whole number.)
What is the result of a computer with Z-digit precision performing the computation (7.21 / 5.38 ) + 4.42 @ 5.76 5.72 5.70 O 5.80
Problem VI.(15 pts.) Suppose that is an irrational number. 1. Prove that j + cannot be a rational number 9 with gl < 2. 2. Can j + be a rational number whose absolute value is greater than 2? Why or why not?
Find the Taylor polynomials of degree n approximating1/(4-4x)for x near 0: For n = 3, P3(x) = _______ For n = 5, P5(z) = _______ For n = 7, P7(x) = _______ The function f(x) is approximated near z = 0 by the second degree Taylor polynomial P2(x) = 3 + 3x - 2x2 Give values: f(0) = _______ f'(0) = _______ f''(0) = _______
a) Find a recurrence relation for an - number of n digit quarternary sequences (using digts from (0, 1,2, 3]) with at least one 1 and the first 1 occurring before the first O.( It is possible that there is no 0 in the sequence). Hint: Consider the cases: the sequence starts with a 1 or with a 2 or with a 3. Note that it cannot start with a O. Explain all steps a) Find a recurrence relation for...
3. (10 points) Let T = {A, B,C), and let tn be the number of T-strings of length n which do not contain AA or BA as substrings. Find a recurrence for tn, and then use that to find a closed-form (i.e. non-recursive) formula for tn.
Given a single precision floating point number 8.0, what is the smallest precision floating point number that is bigger than 8.0?
n is equal to the last two digit of a student number so in my case it is 83 so i have to find the square root of n the values we asked to find above is a= 1.6356 h= 2.5445 p= 190.89 2) In the following truss find Feg by section method. a=2+-n/25 (m) h=3+-n/20 (m) P=200+-n (N) IP C E B D H a a
15. Given the digits 1, 2, 3, 4, and 5, find how many 4-digit numbers can be formed from them: (a) If no digit may be repeated. (b) If repetitions of a digit are allowed. (c) If the number must be even, without any repeated digit. (d) If the number must be even.