The system is:

i) 2x – 3y – 2z = 4
ii) x + 3y + 2z = –7
iii) –4x – 4y – 2z = 10

the last equation can be simplified, by dividing by -2,

thus we have:

i) 2x – 3y – 2z = 4
ii) x + 3y + 2z = –7
iii) 2x +2y +z = -5

The procedure to solve the system is as follows:

first use any pairs of 2 equations (for example i and ii, i and iii) and equalize them by using one of the variables:

i) 2x – 3y – 2z = 4
iii) 2x +2y +z = -5

2x can be written as 3y+2z+4 from the first equation, and -2y-z-5 from the third equation.

Equalize:

3y+2z+4=-2y-z-5, group common terms:
5y+3z=-9

similarly, using i and ii, eliminate x:

i) 2x – 3y – 2z = 4
ii) x + 3y + 2z = –7

multiply the second equation by 2:

i) 2x – 3y – 2z = 4
ii) 2x + 6y + 4z = –14

thus 2x=3y+2z+4 from i and 2x=-6y-4z-14 from ii:

3y+2z+4=-6y-4z-14
9y+6z=-18

So we get 2 equations with variables y and z:

a) 5y+3z=-9
b) 9y+6z=-18

now the aim of the method is clear: We eliminate one of the variables, creating a system of 2 linear equations with 2 variables, which we can solve by any of the standard methods.

Let's use elimination method, multiply the equation a by -2:

a) -10y-6z=18
b) 9y+6z=-18
------------------------ add the equations:

-10y+9y-6z+6z=18-18
-y=0
y=0,

thus :
9y+6z=-18
0+6z=-18
z=-3

Finally to find x, use any of the equations i, ii or iii:

2x – 3y – 2z = 4

2x – 3*0 – 2(-3) = 4

2x+6=4

2x=-2

x=-1

Solution: (x, y, z) = (-1, 0, -3 )

Remark: it is always a good attitude to check the answer, because often calculations mistakes can be made:

check by substituting x=-1, y=0, z=-3 in each of the 3 equations and see that for these numbers the equalities hold.

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2 years ago

Read 2 more answers

Nathan is building a toolshed with a rectangular floor. The area of a rectangle is given by the formula l⋅w, where l represents

morpeh [17]

Answer:

L=7 and W=7 will have a larger floor

Step-by-step explanation:

8*6=48

7*7=49

49>48

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