Matrix Solutions, Determinants, and Cramers Rule Answer the following questions to set down this lab. attest all of your work for each question to limit dear credit. Matrix Solutions to Linear Systems: 1. Use back-substitution to solve the attached matrix. fetch by writing the corresponding bi analog equations, and and so work back-substitution to solve your variables. 1013018001 1591 = x-13z=15y-8z=9z=-1 = x-13(-1)=15y-8(-1)=9z=-1 = x=2y=1z=-1 x,y,z=(2 , 1 , -1) Determinants and Cramers Rule: 2. let out the determinant of the given matrix. 8212 = 8*2 - (-1)(-2) = 16 - 2 = 14 3. run the given linear system utilise Cramers retrieve. 5x 9y= 132x+3y=5 Complete the following move to solve the problem: a. have by take placeing the root determinant D: D= (5*3) - (-2*-9) = 15 - 18 = -3 b. Next, retrieve Dx the determinant in the numerator for x: Dx= (-13*3) - (5*-9) = -39 + 45 = 6 c.
Find Dy the determinant in the numerator for y: Dy = (5*5) - (-2*-13) = 25 - 26 = -1 d. Now you can find your answers: X = DxD = 6-3 = -2 Y = DyD = 1-3 = -13 So, x,y=( -2 , -13 ) Short Answer: 4. You have larn how to solve linear systems using the Gaussian elimination mode and the Cramers dominate mode. Most people prefer the Cramers rule method when solving linear systems in twain variables. Write at least three to four sentences wherefore it is easier to use the Gaussian elimination method than Cramers rule when solving linear systems in four or to a greater limit variables. Discuss the pros and cons of the t wo methods.If you want to get a spacious e! ssay, order it on our website:
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