A pan with 4 eggs weights 18 ounces a pan with 8 egss weighs 24 ounces what is the weight of the pan?

The weight of the eggs in the first pan is 18 ounces, and the weight of the eggs in the second pan is 24 ounces.

Subtracting the weight of the eggs in the first pan from the weight of the eggs in the second pan gives us the weight of 4 eggs, which is 24 - 18 = 6 ounces.

Therefore, the weight of the pan is the weight of 4 eggs, which is 6 ounces.

DAn got a new job and was given a hiring bonus along hsi monthly salary his earning after x months are model by the function f(x)=1,500x+300 how much did he receive as a hiring bonus?

In the function f(x) = 1,500x + 300, the term "1,500x" represents his earnings from his monthly salary after x months, and the constant term 300 represents the hiring bonus he received.

Therefore, Dan received a hiring bonus of $300.

the equation y=mx+b defines what type of function?

The equation y = mx + b represents a linear function. In this equation, y is the dependent variable, x is the independent variable, m is the slope of the line, and b is the y-intercept (the value of y when x = 0). The graph of a linear function is a straight line.

write the equation of the linear function that models the rlationship shwon in the table enter ur answer in y=mx+b form
TABLE:
(x:6,15)
(y:16,43)

To write the equation of the linear function that models the relationship shown in the table, we need to find the slope (m) and the y-intercept (b).

First, we find the slope:
m = (43 - 15) / (16 - 6)
m = 28 / 10
m = 2.8

Next, to find the y-intercept (b), we can substitute the slope (m) and any of the given points into the equation y = mx + b. Let's use point (6, 15):
15 = 2.8(6) + b
15 = 16.8 + b
b = 15 - 16.8
b = -1.8

Therefore, the equation of the linear function in y = mx + b form is:
y = 2.8x - 1.8

last year Bob ordered 4 cubic yards of soil and spent $220 this year she order 7 cubic yards of soil and spends $340 write the equation of the linear function that models the relationship between the number of cubic yards of soil order and the total cost enter the answer in y=mx+b form

To write the equation of the linear function that models the relationship between the number of cubic yards of soil ordered and the total cost, we need to find the slope (m) and the y-intercept (b).

Let the number of cubic yards of soil ordered be x and the total cost be y.

From the given information, we have two points (4, 220) and (7, 340).

First, find the slope (m):
m = (340 - 220) / (7 - 4)
m = 120 / 3
m = 40

Now, we can find the y-intercept by substituting one of the points into the equation y = mx + b. Let's use the point (4, 220):
220 = 40(4) + b
220 = 160 + b
b = 60

Therefore, the equation of the linear function in y = mx + b form is:
y = 40x + 60

compare linear function 1 with linear function 2 which one has a greater rate of change choose 1 for linear function 1; choose 2 for linear function 2

graph:
(4,10)
(2,6)

To determine which linear function has a greater rate of change, let's first find the slopes of the two functions given the two data points provided.

For Linear Function 1:
Point 1: (4, 10)
Point 2: (2, 6)

Calculate the slope of Linear Function 1:
m1 = (10 - 6) / (4 - 2)
m1 = 4 / 2
m1 = 2

For Linear Function 2:
Point 1: (4, 10)
Point 2: (2, 6)

Calculate the slope of Linear Function 2:
m2 = (10 - 6) / (4 - 2)
m2 = 4 / 2
m2 = 2

Both Linear Function 1 and Linear Function 2 have the same rate of change, as they both have a slope of 2. Therefore, the rate of change for both functions is the same.