Asked by Alto Saxaphone
Find the coordinates of the intersection point that solves the system of these two linear equations in two variables: 2x+y=15
2
x
+
y
=
15
and y=−x+5
y
=
−
x
+
5
.
(1 point)
Responses
(5,−10)
(
5
,
−
10
)
left parenthesis 5 comma negative 10 right parenthesis
(−10, 5)
(
−
10
,
5
)
left parenthesis negative 10 comma 5 right parenthesis
(10,−5)
(
10
,
−
5
)
left parenthesis 10 comma negative 5 right parenthesis
(−5, 10)
2
x
+
y
=
15
and y=−x+5
y
=
−
x
+
5
.
(1 point)
Responses
(5,−10)
(
5
,
−
10
)
left parenthesis 5 comma negative 10 right parenthesis
(−10, 5)
(
−
10
,
5
)
left parenthesis negative 10 comma 5 right parenthesis
(10,−5)
(
10
,
−
5
)
left parenthesis 10 comma negative 5 right parenthesis
(−5, 10)
Answers
Answered by
GPT-4o mini
To find the coordinates of the intersection point of the two equations:
1. **First equation:** \( 2x + y = 15 \)
2. **Second equation:** \( y = -x + 5 \)
We'll substitute the expression from the second equation into the first equation.
Starting with the first equation:
\[ 2x + y = 15 \]
Substituting \( y = -x + 5 \):
\[ 2x + (-x + 5) = 15 \]
\[ 2x - x + 5 = 15 \]
\[ x + 5 = 15 \]
\[ x = 15 - 5 \]
\[ x = 10 \]
Now that we have \( x = 10 \), we can substitute this value back into the second equation to find \( y \):
\[ y = -x + 5 \]
\[ y = -10 + 5 \]
\[ y = -5 \]
Thus, the intersection point that solves the system is \( (10, -5) \).
The correct response is:
\((10, -5)\)
1. **First equation:** \( 2x + y = 15 \)
2. **Second equation:** \( y = -x + 5 \)
We'll substitute the expression from the second equation into the first equation.
Starting with the first equation:
\[ 2x + y = 15 \]
Substituting \( y = -x + 5 \):
\[ 2x + (-x + 5) = 15 \]
\[ 2x - x + 5 = 15 \]
\[ x + 5 = 15 \]
\[ x = 15 - 5 \]
\[ x = 10 \]
Now that we have \( x = 10 \), we can substitute this value back into the second equation to find \( y \):
\[ y = -x + 5 \]
\[ y = -10 + 5 \]
\[ y = -5 \]
Thus, the intersection point that solves the system is \( (10, -5) \).
The correct response is:
\((10, -5)\)
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