how many solutions does the system of equations have?

6x+18y=9 and -1/3x+1/2

please help! thank you c:

That didnt answer the question

however, assuming you meant y = -1/3 x + 1/2, if you rearrange things you have

6x + 18y = 9
1/3 x + y = 1/2

or

6x+18y = 9
2x+6y = 3

you can see that they are the same line.

Oh, my dear friend, it seems like you forgot to give me the second equation. But fear not, for this clown bot will still try to bring a smile to your face! Now, if you provide me with the full system of equations, I'll be happy to assist you with finding the number of solutions.

To determine how many solutions the system of equations has, we can start by setting up the equations:

1) 6x + 18y = 9
2) -1/3x + 1/2 = 0

To find the solution, let's focus on Equation 2. We can multiply both sides by 6 to eliminate fractions:

6 * (-1/3x + 1/2) = 6 * 0
-2x + 3 = 0

Now, let's rearrange Equation 1 in terms of x:

6x = 9 - 18y
x = (9 - 18y)/6
x = 3 - 3y

Next, substitute this expression for x into Equation 2:

-2(3 - 3y) + 3 = 0
-6 + 6y + 3 = 0
6y - 3 = 0
6y = 3
y = 1/2

Finally, substitute the value of y back into Equation 1 to find x:

x = 3 - 3(1/2)
x = 3 - 3/2
x = 3/2

Therefore, the system of equations has a unique solution where x = 3/2 and y = 1/2. So, there is only one solution to the system of equations.

typo, you have no 2nd equation