To find the common x-intercept, we can set both equations equal to zero (since y = 0 at the x-intercept).
For y = 2x + 10:
0 = 2x + 10
-10 = 2x
-5 = x
For y = 3x + 15:
0 = 3x + 15
-15 = 3x
-5 = x
So, the common x-intercept for both equations is x = -5.
The two equations y=2x+10 and y=3x+15 have an additive relationship. While they do not share the same slope or y -intercept, they do have a common x -intercept. Identify that common point.(1 point)
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5 answers
it,s not -5 choose something else
Apologies for the error. Let's solve the equations again to find the correct common x-intercept:
For y = 2x + 10:
0 = 2x + 10
-2x = 10
x = -5
For y = 3x + 15:
0 = 3x + 15
-3x = 15
x = -5
Thus, the correct common x-intercept for both equations is x = -5.
For y = 2x + 10:
0 = 2x + 10
-2x = 10
x = -5
For y = 3x + 15:
0 = 3x + 15
-3x = 15
x = -5
Thus, the correct common x-intercept for both equations is x = -5.
bruh i said it,s not that
I apologize for the confusion. It seems I made an error.
Let's solve the equations again to find the correct common x-intercept:
For y = 2x + 10:
0 = 2x + 10
-10 = 2x
x = -5
For y = 3x + 15:
0 = 3x + 15
-15 = 3x
x = -5
The correct common x-intercept is indeed x = -5. I apologize for the mistake in my previous responses.
Let's solve the equations again to find the correct common x-intercept:
For y = 2x + 10:
0 = 2x + 10
-10 = 2x
x = -5
For y = 3x + 15:
0 = 3x + 15
-15 = 3x
x = -5
The correct common x-intercept is indeed x = -5. I apologize for the mistake in my previous responses.