Number Of Solutions To A System Of Linear Equations Question Preview (ID: 50063)
Identify The Number Of Solutions (Infinitely Many, No Solution, Or One Solution) Based On The Setup Of A Linear System.
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If two equations have the same slope and the same y-intercept, how many solutions do they have?
a) Infinitely Many Solutions
b) No Solution
c) One Solution
d) Two Solutions
If two equations have the same slope and different y-intercept, how many solutions do they have?
a) No Solution
b) Infinitely Many Solutions
c) One Solution
d) Two Solutions
If two equations have different slope and the same y-intercept, how many solutions do they have?
a) One Solution
b) Two Solutions
c) Infinitely Many Solutions
d) No Solution
If two equations have different slope and different y-intercept, how many solutions do they have?
a) One Solution
b) No Solution
c) Infinitely Many Solutions
d) Two Solutions
How many solutions would these two equations have: y=4x+7 AND y=4x-7
a) No Solution
b) One Solution
c) Infinitely Many Solutions
d) Two Solutions
How many solutions would these two equations have: y=-3x+7 AND y=3x+7
a) One Solutions
b) Two Solutions
c) Infinitely Many Solutions
d) No Solutions
How many solutions would these two equations have: y=-2x+9 AND y=9-2x
a) Infinitely Many Solutions
b) No Solution
c) One Solution
d) Two Solutions
How many solutions would these two equations have: 2y=6x+10 AND y=3x+5
a) Infinitely Many Solutions
b) No Solution
c) One Solution
d) Two Solutions
How many solutions would these two equations have: y-9x=15 AND 9x+y=21
a) One Solution
b) Two Solutions
c) Infinitely Many Solutions
d) No Solution
How many solutions would these two equations have: 2x-3y=24 AND y=2/3x-8
a) Infinitely Many Solutions
b) One Solution
c) Two Solutions
d) No Solution
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