As the table is not given I have taken the table from your previous question. Table is mention below in the image.
1272) Refer to the LT table. f(t)-4t^2. Determine tNum, a, b and n. ans: 4 9...
1270) Refer to the LT table. f(t)=7. Determine tNum,a,b and n. ans:4 1271) Refer to the LT table. f(t)=4t. Determine tNum,a,b and n. ans:4 1272) Refer to the LT table. f(t)=5t^2. Determine tNum,a,b and n. ans:4 1273) Refer to the LT table. f(t)=7exp(3t). Determine tNum,a,b and n. ans:4 1274) Refer to the LT table. f(t)=8(1-exp(3t)). Determine tNum,a,b and n. ans:4 Table of Laplace Transforms le transforms of some common functions are given in Table 36-1. Instead of ansforming a function...
dx Determine x= f(t) for (t? +4t) 4x + 4,t> 0; f(1) = 3. dt For (1? + 4t) dx dt = 4x +4, x= f(t) =
T(n) = aT(n/b)+O(nd) T(n) = 4T(n/2) + 5nlogn a = 4, b = 2, d = ? <----I don't know how to find d If d > logba, then T(n) = O(nd) If d = logba, then T(n) = O(nd logn) If d < logba, then T(n) = O(nlogba) Question 5 What is the tightest bound the Master Theorem can put on this recurrence relation? T(n) 4 T(n/2) 5n log n O O 1.1 O o(n2 og n o(n2) O(n)...
Determine Laplace Transform of f(t) = 2sin3t + 4t? OF(8) 6 + 24 82 +9 24 84 OF(S) 3 - + $2 +9 84 None of them 0 F (s) = 27, +42
a. Find the curvature of the curve r(t)- (9+3cos 4t)i-(6+sin 4t)j+10k. o. Find the unit tangent vector T and the principal normal vector N to the curve -π/2<t<π/2. r(t) = (4 + t)i-(8+In(sect))j-9k, Find the tangential and normal components of the acceleration for the curve r(t)-(t2-5)i + (21-3)j +3k. a. Find the curvature of the curve r(t)- (9+3cos 4t)i-(6+sin 4t)j+10k. o. Find the unit tangent vector T and the principal normal vector N to the curve -π/2
Solve the recurrence relations: T(n) = 4T(n/2)+1 when n>2 and T(n) = 1 when n = 2. T(n) = 4T(n/4)+1 when n>4 and T(n) = 1 when n = 4
Show the recursion tree for T(n) = 4T(n/4) + c and derive the solution using big-Theta notation. Explain the intuition why this result is different from the solution of T(n) = 4T(n/2) + c.
3. Solve the follwoing recurrences using the master method. (a) T(n) = 4T (n/2) + navn. (8 pt) (b) T(n) = 2T (n/4) + n. (8 pt) (c) T(n) = 7T(n/2) +n?. (8 pt)
ANS: T PTS:4 The slope of a distance vs. time graph is the acceleration. ANS: A racecar driver steps on the gas, changing his speed from 10 m/s to 30 m/s in 4 seconds. The acceleration of the racecar is 10 m/s?. ANS: F When an object reaches its terminal speed, its acceleration is zero. ANS:T As you go higher and higher above the surface of the earth, the mass of a body stays constant. ANS: T As an artillery...
2. Consider the following system y 412/ where the input is f(t) 20sin (4t 5) (a) Determine the steady state response Answer: ss(t) 62.5 sin (4t 9.5)