The velocity of a falling parachutist is given by v = (1- e 5 whereg = 9.8. For a parachutist with a drag coefficient c = 14 kg/s, compute the mass m so that thevelocity is v = 35 m/s at t = 7 s. Calculate using (1) Bisection Method and (2) False PositionMethod to determine for the value of m up to an acceptable level of ɛ, < 0.1%. For bracketingmethods, make initial guesses for upper and lower limits.

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Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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A study of the sale of DVD players gave the following model: DVD; = 432 + 24Y; – 2.5P; t ratio (11.4) (3.56) (-2.8) R? = 0.8314 DW = 1.24 N = 30 where the variables are: DVD = monthly sale of DVD players Y; = income of households during monthi P = price of DVD players during month i DW = Durbin-Watson statistics a) Fomally construct hypothesis testing to test the significance of slope coefficients at 5% level of significance. b) Interpret the slope coefficients. c) Examine the hypothesis of is there serially correlated residuals? d) Interpret the implications of autocorrelation for the estimated model above. e) List two alternative ways to overcome autocorrelation.
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A leaky 10-kg bucket is lifted from the ground to a height of 10 m at a constant speed with a rope that weighs 0.7 kg/m. Initially the bucket contains 30 kg of water, but the water leaks at a constant rate and finishes draining just as the bucket reaches the 10-m level. How much work is done? (Use 9.8 m/s² for g.) Show how to approximate the required work (in J) by a Riemann sum. (Let x be the height in meters above the ground. Enter x.* as x₁.) Σ( j=1 Express the work (in J) as an integral in terms of x (in m). lim n-∞ Ax dx Evaluate the integral (in J). (Round your answer to the nearest integer.)
A particle is moving along a straight line such that when it is at the origin it has a velocity of 6 m/s. If it begins to decelerate at the rate of a = (-0,5v/2) m/s², where v is in m/s, determine the distance it travels before it stops. Express your answer using three significant figures and include the appropriate units. µA ? S = Value
The rate (in liters per minute) at which water drains from a tank is recorded at half-minute intervals. Use the average of the left- and right-endpoint approximations to estimate the total amount of water drained during the first 3 min. t min 0 0.5 1 1.5 2 2.5 3 I/min 48 46 44 42 40 38 36 Answer: liters.

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