= 1 -2t e ܘܟ ܙܢ eht + + C2 5 et + C3 Consider the system of differential equations regarding x = x(t), y = y(t), and z = z(t): x' 211 X + 212 y + 13 Z y' 021 X + 222 y + A23 Z z 031 X + 232 y + 833 Z where a 11, Q12, . , 033 are all real constants. Which of the following options could be a general solution of...
5. Consider the system of differential equations regarding x = c(t), y = y(t), and z = z(t): x' = 211 x + 212 y + 213 2 y = 221 x + 222 y + 223 2 z' = 231 2 + 232 y + 233 z where 211, 212,..., 233 are all real constants. Which of the following options could be a general solution of this system? (a) C C[-] é 2t + C2 eft (b) C-1 137...
HELLO I AM CURRENTLY IN DIFFERENTIAL EQUATIONS PLEASE EXPLAIN EACH STEP SO I CAN LEARN FROM YOU (I KNOW SOME PEOPLE ONLY CARE ABOUT TEH ANSWER, BUT WILL REALLY APPRECIATE IT) TO SAVE TIME FEEL FREE TO JUST SAY A LAW, THEOREM, OR CONCEPT FOR AN EXPLANATION AND I CAN GO AHEAD AND STUDY IT ON MY OWN. i REALLY DO READ THESE VERY CAREFULLY AND USE THE COMMENTS OFTEN, SO JUST A LITTLE HEADS UP. I FIND IT DIFFICULT...
5. Consider the system of differential cquations regarding I = (1), y = y(1), and 2 = z = 2(1): r=0112 +212 y + 213 2 y' = 0211 + A22 y + 0232 z' = 231 2 + 432 y + 0.33 2 where 011, 012,.,233 are all real constants. Which of the following options could be a general solution of this system? (a) C 24 + C2 3 eft (b) C-1 e 2 + C2 5 cte ....
Consider worker income from four departments: C1, C2, C3, and C4 with 3,2, 4, and 3 employees respectively: C1 C2 C3 C4 50 90 18 32 60 105 23 10 70 22 60 25 (a) Find the mean E(y) and variance V (y) where y is a single individual's income sampled at random. [10 pt] (b) Fill in the following table: C1 E(X|C) V(X|C) P(C) C2 C3 C4 where E(X|C) is the mean income in each department, V(X|C) is the...
C1= 5 C2= 6 C3= 10 GCD --> Greater Common Divisor B1 a. Let x := 3C1 + 1 and let y := 5C2 + 1. Use the Euclidean algorithm to determine the GCD (x, y), and we denote this integer by g. b. Reverse the steps in this algorithm to find integers a and b with ax + by = g. c. Use this to find the inverse of x modulo y. If the inverse doesn't exist why not?...
find the general solution of the differential equation by using the system of linear equation. please need to be solve by differential equation expert. d^2x/dt^2+x+4dy/dt-4y=4e^t , dx/dt-x+dy/dt+9y=0 Its answer will look lile that: x(t)= c1 e^-2t (2sin(t)+cos(t))+ c2 e^-2t (4e^t-3sin(t)-4cos(t))+ 20 c3 e^-2t(e^t-sin(t)-cos(t))+2 e^t, y(t)= c1 e^-2t sin(t)+ c2 e^-2t(e^t-2sin(t)-cos(t))+ c3 e^-2t(5e^t-12sin(t)-4cos(t))
1 Vector Operations H4 C4 HS H3 C3 C2 H6 H2 C1 H1 The positions (r,y, z) of each of the atoms in a given benzene molecule are known at a given moment of time, t, from a molecular dynamics simulation. If we are explicitly given the position vectors of the C1, C2 and H1 atoms: rH1 3.348ex 13.706ey + 27.438e find the following quantitities: 1. Vector Addition a. Determine the vector pointing from C1 to C2 b. Determine the...
Question 2. Consider a surface S in the 0 plane with three smooth boundary curves C1, C2, and C3 as shown in the diagram. Each curve is parametrised so that it is traversed in the direction shown by the arrows For a smooth vector field A(x, y, z) you are given the following results: Ca Adr =-3 C2 0.5 2.0 1.5 -0.5 (a) What is the value of the surface integral ▽ × A. ds. if we assume by convention...
(1 point) Solving a system of linear ODEs with constant coefficients: Consider the system of equations x' = 3x – 2y y = 4x – 3y = -5x + 4y + 2z, with initial conditions x(0) = 1, y(0) = 2, 2(0) = 0. The matrix of the system is 13 -20 A= | 4 -3 0 1-5 4 2) and defining the column vector r(t) X(t) = y(t) z(t) we get that X' = AX, where X(0 = 2...