Final answer:
The system of equations to solve the given problem is y = 3x - 5 and x + y = 30. By solving these linear equations, we find that the two numbers are x = 8.75 and y = 21.25.
Step-by-step explanation:
To solve the mathematical problem presented by the student, we must set up a system of linear equations that reflects the conditions given in the problem statement. The first condition provided is that one number, y, is 5 less than 3 times another number, x. This can be expressed by the equation y = 3x - 5. The second condition states that the sum of the numbers is 30, which gives us the equation x + y = 30. To solve the system of equations, we have:
- y = 3x - 5
- x + y = 30
Now, we can use the substitution method to solve for one variable. We can substitute the expression for y from the first equation into the second equation:
x + (3x - 5) = 30
Now we see that:
- 4x - 5 = 30
- 4x = 35
- x = 8.75
Having found the value of x, we can substitute it back into the first equation to find y:
y = 3(8.75) - 5
y = 26.25 - 5
y = 21.25
Therefore, the values of x and y that satisfy the system of equations are 8.75 and 21.25, respectively.