Final answer:
Kareena is correct; the system of equations has one solution. By substituting the first equation into the second and solving for x and then y, we find the unique solution (x, y) = (-1, 3).
Step-by-step explanation:
Firstly, to determine the number of solutions the system of equations has, we can compare the equations or attempt to solve them. The given system of equations is:
We can substitute the first equation into the second to solve for x:
- 3x + 6(2x + 5) = 15
- 3x + 12x + 30 = 15
- 15x + 30 = 15
- 15x = -15
- x = -1
Now, substitute x back into the first equation:
- y = 2(-1) + 5
- y = -2 + 5
- y = 3
Both equations can be satisfied with x=-1 and y=3, which means there is one solution to this system. Therefore, I agree with Kareena's assertion that the system has one solution because we were able to find a unique pair (x, y) that satisfies both equations.