**If X 12Y And X 6Y 90 Then X**. And elin date period then check your solution. If not, please leave a rating.

2xy/y^2 = (lambda*120)/(lambda*10) 2x/y = 12 2x = 12y x = 6y so we know that: How do you solve the system of equations x− 6y = −3 and 2x+ 3y = 9 ? ⇒ 9x −6y = 33 now you have.

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### And Elin Date Period Then Check Your Solution.

And elin date period then check your solution. Substitute y = 50 into any of the two equations, 2xy/y^2 = (lambda*120)/(lambda*10) 2x/y = 12 2x = 12y x = 6y so we know that:

### Y^2 = Lambda*10 2Xy = Lambda*120 Dividing The Second One By The First One, We Get:

If not, please leave a rating. ⇒ 9x −6y = 33 now you have. (example) vet each system by.

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I'm carter, i can help you. How do you solve the system of equations x− 6y = −3 and 2x+ 3y = 9 ? If x 12y and x 6y 90 then x.

### If X 12Y And X 6Y 90 Then X Des Idées 20X+30Y=4 = Should Be 40.

Multiply the second equation by 3 ⇒ 3× (3x− 2y = 11). X = 3,y = −1 explanation: Multiply the second equation by 3 ⇒ 3× (3x− 2y = 11).

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Select an item from each matrix (using.