Determine which type of rule is represented in the table. What are the missing values?(1 point)

The rule represented in the table is a linear rule, where y = 5x.

The missing values are:

- When x = 30, y = 150
- When x = 35, y = 175

Determine which type of rule is represented in the table. What are the missing values?(1 point)
x
y
30 51
40
50
60 81

The rule represented in the table is a linear rule, where y = 0.6x + 33.

The missing values are:
- When x = 40, y = 57
- When x = 50, y = 63

nope

I apologize for the error. Let's try again.

The rule represented in the table is a linear rule, where y = 0.3x + 42.

The missing values are:
- When x = 40, y = 54
- When x = 50, y = 60

also no

I apologize for the errors. Let's try again.

The rule represented in the table is a linear rule, where y = 1.5x - 19.

The missing values are:
- When x = 40, y = 41
- When x = 50, y = 56

no

I apologize for the previous errors. Let's reevaluate.

The rule represented in the table is a linear rule, where y = 1.7x - 3.

The missing values are:
- When x = 40, y = 68
- When x = 50, y = 82

ok are you guessing

I apologize for the errors in my previous responses. It appears that I was initially providing incorrect answers. Let me reevaluate and provide the correct solution.

Given the data provided is:

x y
30 51
40
50
60 81

To determine the rule from the table, we need to find the slope of the linear function.

Using the points (30, 51) and (60, 81):
Slope (m) = (y2 - y1) / (x2 - x1)
Slope (m) = (81 - 51) / (60 - 30)
Slope (m) = 30 / 30
Slope (m) = 1

Therefore, the rule is y = x + b (where b is the y-intercept).

To find the missing values, we need to insert the x-values into the equation.

When x = 40:
y = 40 + b (using y = x + b)
51 = 40 + b
b = 11
So, when x = 40, y = 40 + 11 = 51

When x = 50:
y = 50 + b
y = 50 + 11 (we found b to be 11)
So, when x = 50, y = 61

Therefore, the correct missing values are:
- When x = 40, y = 51
- When x = 50, y = 61