1. Velocity of a rocket is given as a function of time in table 1. Table...
QUESTION 1 The following velocity vs time data is given. To find polynomial interpolation are the velocity at t-14.9s, the three time data points you would choose for second order ime (s Velocity (m/s) 22 O 0. 15, 18 O 15, 18, 22 O o. 15, 22 O 0, 18, 24 15 18 37 25 123 QUESTION 2 The data of velocity vs time is given. 15 18 36 24 Velocity(m/s) 23 5 The velocity in m/s att-16s using linear...
QUESTION 1 (25 MARKS) a) The fuel consumption of an engine has been recorded as shown in the following table. 1.2 1.7 1.8 2.0 Time (hour) Fuel (liter) 0.3320 0.5474 0.7389 Predict the missing term, x using second order Lagrange's interpolation method. Correct your answer in 4 significant figures.] [8 marks] b) The upward velocity of a rocket is given as a function of time in the following table. Time, 1 (seconds,s) Velocity, vt) (m/s) 0 0 10 227.04 15...
i need matlab code for this question please solve in matlab
platform
4. The upward velocity of the rocket is measured with respect to time and the data is given in the following table Velocity vs time data for a rocket Time,(s) Velocity,v (m/s 106.8 5 279.2 12 We wanted to approximate the velocity profile by Construct the set of linear equation and solve the equation for the coefficients a,b,and c in d)
4. The upward velocity of the rocket...
Consider the function f(x) 1 25x which is used to test various interpolation methods. For the remainder of this problem consider only the interval [-1, 1] The x-values for the knots (or base-points) of the interpolation algorithm are located at x--1,-0.75, -0.5, -0.25, 0, 0.25, 0.5, 0.75 1. (a) Create a "single" figure in Matlab that contains 6 subplots (2x3) and is labelled as figure (777), i.e the figure number is 777. Plot in each subplot the function f(x) using...
please write the matlab code for these questions in matlab
platform.
4. The upward velocity of the rocket is measured with respect to time and the data is given in the following table Velocity vs time data Time, r 106.8 279.2 We wanted to approximate the velocity profile by 12 Construct the set of linear equation and solve the equation for the coefficients a,b,ande in 5. By taking u6 u4 solve the following system of equations u2+4u3-u4-04+0.8 u3+4u4-us 0.6+1.0 -u4+4u5...
The velocity of a rocket is given as a function of time at discrete points as 3. Time (s) 3 5 8 12 Velocity (m/s) 4 32 16 8 Using Trapezoidal Rule with unequal segments, the dista most nearly is (circle correct response) [15 points] (show your work nce covered by the rocket between 7 and 12 seconds (A) 60.00 m (B) 66.67 m (C) 93.33 m (D) 96.00 m At the end of conducting 100 iterations, an iterative scheme...
a model rocket is launched straight upward. It’s altitude y as
a function is given by y=bt-ct^2, where b= 81 m/s, c=4.9 m/s ^2, t
is the time in seconds, and y is in meters
Exercise 2.21 Constants 1 Periodic Table Part A A modei rocket is launched straight upward Its alt tude y as a unction of time is given by ybt -ct, where b81 m/s Use difterentiation to find a general expression for the rocket's velocity as a...
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explain correctly
Problem 1 Use the trapezoidal rule technique to approximate the following integrals: a) 「(x2+1)dr(Note: use 0.5 increments forx) b) sina d INote: use a MATLAB function to subdivide the interval into eight equal parts) c e dx (Note: use 0.25 increments for x Problem 2 Use the Simpson's rule to evaluate the following integrals aDdr Problem 3: Given the polynomial: x3-6x2 + 30-0, Use MATLAB to find all roots of this polynomial. Use MATLAB's...
1. A rocket is launched straight up with constant unknown acceleration a). A time t) after liftoff, a bolt breaks loose off near the bottom of the rocket. The bolt hits the ground a time (t) later. Therefore, the total ne from launch, to when the bolt hits the ground ist, + t a. State the type of motion while the bolt is attached to the rocket. b. State the type of motion after the bolt has fallen off of...
need help doing this in matlab. 1.2-1.4
Problem #1. For five data points listed in Table 1, you are asked to do the following: Write down the form of a Newton's interpolating polynomial function of 4th-order with five constants (b, i = 1:5). 1.2 Calculate the following three divided differences (Newton bracket) (showing the detailed steps and numbers on a white paper): [xy, x,]= [xx, x,]= S[X2, x3, x,]= Plot both the data points and the interpolating function by using...