Solve completely using the system of linear equations with two variables. A chemist has one solution...

A chemist has three different acid solutions. The first acid solution contains `15%` acid, the second...

A chemist has three different acid solutions. The first acid solution contains `15%` acid, the second contains `30%` and the third contains `50%`. He wants to use all three solutions to obtain a mixture of `78` liters containing `35%` acid, using 3 times as much of the `50%` solution as the `30%` solution. How many liters of each solution should be used? The chemist should use __________________ liters of `15%` solution, __________________ liters of `30%` solution, and __________________ liters of...

Translate to a system of equations and solve. A 40% antifreeze solution is to be mixed...

Translate to a system of equations and solve. A 40% antifreeze solution is to be mixed with a 70% antifreeze solution to get 240 liters of a 64% solution. How many liters of the 40% and how many liters of the 70% solutions will be used? 1) 40% solution_______________ L 2) 70% solution________________ L

A chemist has one solution of 20% acid and another of 50% acid, how many milliliters...

A chemist has one solution of 20% acid and another of 50% acid, how many milliliters of each are ... A chemist has one solution of 20% acid and another of 50% acid, how many milliliters of each are needed to obtain 18 ml of 30% acid?

1)Solve the system of linear equations, using the Gauss-Jordan elimination method. (If there is no solution,...

1)Solve the system of linear equations, using the Gauss-Jordan elimination method. (If there is no solution, enter NO SOLUTION. If there are infinitely many solutions, express your answer in terms of the parameters t and/or s.) x1 + 2x2 + 8x3 = 6 x1 + x2 + 4x3 = 3 (x1, x2, x3) = 2)Solve the system of linear equations, using the Gauss-Jordan elimination method. (If there is no solution, enter NO SOLUTION. If there are infinitely many solutions, express...

A chemist has three different acid solutions. The first acid solution contains 25%25% acid, the second...

A chemist has three different acid solutions. The first acid solution contains 25%25% acid, the second contains 40%40% and the third contains 70%70%. He wants to use all three solutions to obtain a mixture of 3535 liters containing 55%55% acid, using 22 times as much of the 70%70% solution as the 40%40% solution. How many liters of each solution should be used? The chemist should use ______ liters of 25% solution, ______ liters of 40% solution, and ______ liters of...

A chemist has one solution of 20% acid and another of 50% acid, how many milliliters...

A chemist has one solution of 20% acid and another of 50% acid, how many milliliters of each are needed to obtain 18 ml of 30% acid?

PLEASE WORK THESE OUT!! A) Solve the system of linear equations using the Gauss-Jordan elimination method....

PLEASE WORK THESE OUT!! A) Solve the system of linear equations using the Gauss-Jordan elimination method. 2x + 10y = −1 −6x + 8y = 22 x,y=_________ B) If n(B) = 14, n(A ∪ B) = 30, and n(A ∩ B) = 6, find n(A). _________ C) Solve the following system of equations by graphing. (If there is no solution, enter NO SOLUTION. If there are infinitely many solutions, enter INFINITELY MANY.) 3x + 4y = 24 6x + 8y...

The augmented matrix represents a system of linear equations in the variables x and y. [1...

The augmented matrix represents a system of linear equations in the variables x and y. [1 0 5. ] [0 1 0 ] (a) How many solutions does the system have: one, none, or infinitely many? (b) If there is exactly one solution to the system, then give the solution. If there is no solution, explain why. If there are an infinite number of solutions, give two solutions to the system.

We are all too familiar with linear equations in two variables. These systems may have no...

We are all too familiar with linear equations in two variables. These systems may have no solution, one solution, or infinitely many. Of course, we can interpret these solutions geometrically as two parallel lines, two intersecting lines, or two identical lines in the plane. How does this extend into linear equations in three variables? If a linear equation in two variables describes a line, what does a linear equation in three variables describe? Give a geometric interpretation for the possible...

Write two linear equations with two variables that model something from your daily life. Solve the...

Write two linear equations with two variables that model something from your daily life. Solve the system of equations in two ways. Discuss which method you liked better and why. In your responses to peers, contrast your preferences for how to solve systems of equations.