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20: Solve the system of equations using substitution method. 2x+5y=26 X+ y= 10 21: Solve the following equation. x-x1/2-6= 0 22: Solve the following system of equations, using elimination method. 2x+3y = 5 5x- y = 4 23: Solve the system of nonlinear equations. Any Method. Y?=x2-9 2y= x-3 24: Convert the log into exponent form. Ln (3x-5)2= 16 25: f(x)= 1/x in words explain the transformation of the following functions. a. g(x) = 1/ (x-3) +5 b. h(x)= -1/(x+2)...
3. Solve the system of equations 5x + 3y + z 23 3x + 4y-z 21 4x + 5y 2z 26 4. Solve the system of equations. 4x-2y + 3z 27 5x 7y + 4z 39
Solve the system of equations using matrices. Use Gauss-Jordan elimination. 5) 5) -2x-y-5z =-38 4x + 2y-2z= 28 4x-5y + z=-16 A) ((-5, 8, 10) D) ((10, 8,-5) B) (5, 8,4)) C) (5, 4,8) Solve the system of equations using matrices. Use Gauss-Jordan elimination. 5) 5) -2x-y-5z =-38 4x + 2y-2z= 28 4x-5y + z=-16 A) ((-5, 8, 10) D) ((10, 8,-5) B) (5, 8,4)) C) (5, 4,8)
D | Question 3 4 pts Solve the following system of equations using Gauss-Jordan elimination: 82-5y-5z =-11 The solution of this system of equations has the form z :-az + b, y # cz + d where z can be any real number in the spaces below, put the value of a in the first blank, the value of b in the second blank, the value of c in the third blank, and the value of d in the fourth...
Solve the given system of equations X - y (1) 5x - 72 = 30 (2) 5y + z = 10 (3) Select the correct choice below and fill in any answer boxes within your choice. OA. The solution is x= y= and z=(Type integers or simplified fractions) OB. There are infinitely many solutions. Using ordered triplets, they can be expressed as {(x,y,z)|x== z any real number) (Simplify your answers. Type expressions using z as the variable as needed) OC....
Numbers 6,7, and 8 please A) (24,-2) 6)[y=5x + 7 y=8x + 6 A) infinitely many solutions C) no solution (1 26) 3' 3 26 1 Solve the system of equations. 7) y=4x+1 3y-9x = 15 A) (17, 4) C) l(x, y)ly B) (4, 17) D) ø 4x +1) 8) 3x +8y -2 2x+5y =-7 A) (-46, 17) B)(-46-17 C) (17,-46) D) (-17,46)
Solve the following system of linear equations by using the inverse matrix method X+Y+Z=4 -2X-Y+3Z=1 Y+5Z=9
solve this system of equations using Cramers rule 1)find D,Dx,Dy,and Dr 2)find x,y and z problem: x-2y+2z=9 3x+2y-4z=7 3y+5z=-1
(1 pt) Solve the system using Cramer's Rule. 1 53 + 5y -5 5x + 5y + 42 202 5 z IL || || 4 3 det = T = y = 2= Note: You can earn partial credit on this problem.
Use the Gauss Jordan method to solve the system of equations if the system has infinitely many solutions, give the solution with z arbitrary. 2x - y + 5z = -3 x + 2y - 5z = 16 10y + 4z = 36