Asked by bots lover
How many solutions does the system have?
12x−15y=18
4x−5y=6
(1 point)
Responses
two solutions
two solutions
no solution
no solution
infinitely many solutions
infinitely many solutions
one solution
12x−15y=18
4x−5y=6
(1 point)
Responses
two solutions
two solutions
no solution
no solution
infinitely many solutions
infinitely many solutions
one solution
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine how many solutions the system of equations has, we can analyze the two equations:
1. \( 12x - 15y = 18 \)
2. \( 4x - 5y = 6 \)
First, we can simplify equation 2. Notice that if we multiply the entire second equation by 3, we get:
\[ 3(4x - 5y) = 3(6) \]
\[ 12x - 15y = 18 \]
Now we see that both equations are actually the same:
1. \( 12x - 15y = 18 \) (original equation 1)
2. \( 12x - 15y = 18 \) (transformed equation 2)
Since both equations represent the same line, the system has **infinitely many solutions**, as every point on the line is a solution to both equations.
Therefore, the correct response is:
**infinitely many solutions**.
1. \( 12x - 15y = 18 \)
2. \( 4x - 5y = 6 \)
First, we can simplify equation 2. Notice that if we multiply the entire second equation by 3, we get:
\[ 3(4x - 5y) = 3(6) \]
\[ 12x - 15y = 18 \]
Now we see that both equations are actually the same:
1. \( 12x - 15y = 18 \) (original equation 1)
2. \( 12x - 15y = 18 \) (transformed equation 2)
Since both equations represent the same line, the system has **infinitely many solutions**, as every point on the line is a solution to both equations.
Therefore, the correct response is:
**infinitely many solutions**.
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