Question

Consider the following set of equations:

Equation R: −3y = −3x – 9
Equation S: y = x + 3

Which of the following best describes the solution to the given set of equations?

No solution
One solution
Infinite solutions
Two solutions

Answer 1

@DullJackel09

Answer 2

@andretorres

Answer 3

i will medal and fan sombody help

Answer 4

-3y = -3x -9
y=x+3

in case of the first one equation do you can factorizing out on the both sides the -3 ?
so what will get like result ?

Answer 5

wolf do you agree this like a first step ?

Answer 6

jacob please collaborate

Answer 7

sorry

Answer 8

do you can factorizing out the -3 ?

Answer 9

i dont know i, so cumfused with this

Answer 10

Multiply equation S by -3

Answer 11

That will give you the answer

Answer 12

thank you so much

Answer 13

yes this is indifferent - multiplie on the both sides by -3

Answer 14

i have one more

Answer 15

Which description best describes the solution to the following system of equations?

y = −x + 4
y = 3x + 3

Line y = −x + 4 intersects the line y = 3x + 3.
Lines y = −x + 4 and y = 3x + 3 intersect the x-axis.
Lines y = −x + 4 and y = 3x + 3 intersect the y-axis.
Line y = −x + 4 intersects the origin.

Answer 16

If the equations do have a solution, then one line will intersect the other line.

Answer 17

So I'd say
Line y = −x + 4 intersects the line y = 3x + 3
would best describe the solution

Answer 18

thx

Answer 19

u r welcome
by the way the 2 equations do have a solution.