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Consider the two differentiable equation
FIGURE 2.2.15. Solution curves for harvesting a population of alligators.
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- Q3 Find the minimum sum-of-products expressions for each of the following functions (d denotes don't care terms). (a) f(A, B, C, D) = Σm(4,11,12,13,14) + Σm(5,6,7,8,9,10) (b) f(A, B, C, D) = Σm(3,11,12,13,14) + Σm(5,6,7,8,9,10) (c) f(A, B, C, D) = m(1,2,4,13,14) + Σm(5,6,7,8,9,10) (d) f(A, B, C, D) = Σm(4,15) + Σd (5,6,7,8,9,10)arrow_forwardWhat is the other canonical form of the giver equation? F(x.y.z) = E m (0,1,2,3,4,5,6,7)arrow_forward6. (Stein's lemma) Suppose that X is normally distributed with mean u and variance o2. If g is a continuously differentiable function such that E{g(X)(X- µ)} and E{dg(X)/dx} both exist, prove that E{g(X)(X – u)} = o²E{dg(X)/dx}.arrow_forward
- Simplify the following Boolean functions using four-variable K-maps: C: F(w,x,y,z)=sum (1,3,4,5,6,7,9,11,13,15)arrow_forwardQ4: Write the parametric equation of revolution surface in matrix form only which generated by rotate a Bezier curve defined by the coefficient parameter in one plane only, for the x-axis [0,5, 10,4], y-axis [1,4,2,2] respectively, for u-0.5 and 0 = 45° Note: [the rotation about y-axis].arrow_forwardSimplify the following Boolean functions, using three-variable K-maps: F(x, y, z)=Σ(1, 2, 3, 7)arrow_forward
- Use the dsolve() function to solve the differential equation 8Dy3(t) = cos(20t) + sin(2t) for initial conditions y(10) = 50, Dy(0) = 0, Dy2(0) = 0, and y(10) = 5, Dy(0) = 0, Dy2(0) = 3. Plot your solutions on a single figure as a solid curve for the first set initial conditions and a dotted curve fo rthe second set of initial conditions for time t = -10 to 20. Make sureu to label both axes and title your figure, and turn on the plotting legend. Set teh y-axis limits to [-150 200].arrow_forward3) Simplify the following Boolean functions, using K-maps. F(w, x, y, z) = (1, 3, 4, 5, 6, 7, 9, 11, 13, 15)arrow_forward7. Solve with Python. A peristaltic pump delivers a unit flow (Q₁) of a highly viscous fluid. The network is depicted in the figure. Every pipe section has the same length and diameter. The mass and mechanical energy balance can be simplified to obtain the flows in every pipe. Solve the following system of equations to obtain the flow in every pipe using matrix inverse. S Q₂ 0₂ le 0₂ 90 Q₁+ 20-20-0 Qs+ 206-20-0 307-206-0arrow_forward
- Solved this questionarrow_forwardSimplify the following Boolean functions, using four-variable Kmaps: F (A, B, C, D)=Σ(0, 2, 4, 5, 6, 7, 8, 10, 13, 15)arrow_forwardConsider a gas in a piston-cylinder device in which the temperature is held constant. As the volume of the device was changed, the pressure was mecas- ured. The volume and pressure values are reported in the following table: Volume, m Pressure, kPa, when I= 300 K 2494 1247 831 4 623 5 499 416 (a) Usc lincar interpolation to estimate the pressure when the volume is 3.8 m. (b) Usc cubic splinc interpolation to cstimate the pressure when the vol- ume is 3.8 m. (c) Usc lincar interpolation to cstimate the volume if the pressure is meas- ured to be 1000 kPa. (d) Usc cubic splinc interpolation to cstimate the volume if the pressure is mcasured to be 1000 kPa. 4.arrow_forward
Operations Research : Applications and AlgorithmsComputer ScienceISBN:9780534380588Author:Wayne L. WinstonPublisher:Brooks Cole