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Write the augmented matrix as a system of equations 3 1 -1 150 0 1 -3 200 1 -1 4 100 x + y + 2 = C + y + 2 = C + y + Z =Write the system of equations as an augmented matrix 10s 3y 3n = 100 y = 250 - 3s + 3y + n = 150 E\fWrite the system of equations as an augmented matrix. Then solve for x and y. 3:1: 23; = 12 6m + 43; = 24 Solution = Enter the solution as an ordered pair with parentheses (x,y), with no space between the x-value and y- value. Write the system of equations as an augmented matrix. Then solve for x and y. 3m + y = 10 3m2y= 2 Solution = Enter the solution as an ordered pair with parentheses (x,y), with no space between the x-value and y- value. Write the system of equations as an augmented matrix. Then solve for x and y. 4m 2y = 26 163: + 33; = 71 Solution = Enter the solution as an ordered pair with parentheses (x,y), with no space between the x-value and y- value. Write the system of equations as an augmented matrix. Then solve for x and y. :c + y = 1 3:c+2y= 5 Solution = Enter the solution as an ordered pair with parentheses (x,y), with no space between the x-value and y- value. Write the system of equations as an augmented matrix. Then solve for x and y. a: 43; = 13 3$+3y= 3 Solution = Enter the solution as an ordered pair with parentheses (x,y), with no space between the x-value and y- value. The admission fee at an amusement park is $1.50 for children and $4 for adults. On a certain day, 235 people entered the park, and the admission fees collected totaled 690.00 dollars. How many children and how many adults were admitted? Your answer is number of children equals number of adults equals 2 9 Given the matrix 11 49 (a) does the inverse of the matrix exist? Your answer is (input Yes or No) : (b) if your answer is yes, write the inverse here:Find the inverse of A = 0 11 -2 1 Given the matrix -1 1 -1 . 1 -1 0 (a) does the inverse of the matrix exist? Your answer is (input Yes or No): (b) if your answer is Yes, write the inverse asSolve the system of equations { 61: + 4y 2 230 5:1: 7y 2 109 by converting to a matrix equation and using the inverse of the coefficient matrix. Solve the system of equations { 2:1: + 53; = 427 4:13 1y 2 125 by converting to a matrix equation and using the inverse of the coefficient matrix. w = y: Write the system of equations -2x + 5y - 42 = 2 2x + 4y - 1z = 4 -3x - 3y + 5z = - 3 as a matrix equation, that is, rewrite it in the form A y = B, Z where A = and B =\fMaricopa's Success scholarship fund receives a gift of $ 100000. The money is invested in stocks, bonds, and CDs. CDs pay 6 % interest, bonds pay 3.3 % interest, and stocks pay 10.3 % interest. Maricopa Success invests $ 50000 more in bonds than in CDs. If the annual income from the investments is $ 5105 , how much was invested in each account? Maricopa Success invested $ in stocks. Maricopa Success invested $ in bonds. Maricopa Success invested $ in CDs