Drag each tile to the correct box. Not all tiles will be used.
Arrange the steps to solve this system of linear equations in the correct sequence.

x + y = -2

2x – 3y = -9

Subtract 3x + 3y = -6 (obtained in step 1) from
2x – 3y = -9 (given) to solve for x.
Substitute the value of x in the first equation
(x + y = -2) to get y = 1.
The solution for the system of equations is (-3, 1).
x = -15
The solution for the system of equations is
(-15, 13).
Add 3x + 3y = -6 (obtained in step 1) to
2x – 3y = -9 (given), and solve for x.
x = -3
Substitute the value of x in the first equation
(x + y = -2) to get y = 13.
Multiply the first equation by 3:
3(x + y) = 3(-2)
3x + 3y = -6.

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Suppose we have a set of small wooden blocks showing the 26 letters of the english alphabet, one letter per block. (think of scrabble tiles.) our set includes 10 copies of each letter. we place them into a bag and draw out one block at a time. (a) if we line up the letters on a rack as we draw them, how different ways coukl we fill a rack of 5 letters? (b) now suppose we just toss our chosen blocks into a pile, and whenever we draw a letter we already have, we put it back in the bag and draw again. how many different piles of 5 blocks could result? possible? piles will contain at least one repeated letter? (c) if we draw out 5 blocks wit hout looking at them, how many different piles are (d) if we draw out 5 blocks without looking at them, how many of the possible 2. (4) consider the following formula. 12 give two different proofs, one using the factorial formulas and the other combina torial.