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The line y=-0.5x+b passes through the points​ (1,5.5), (3,p),​ (4,4), and​ (7,n). Find​ b, n, and p.

Sagot :

rspill6

Answer:y = -0.5x + 6

n = 4.5

p = 2.5

Step-by-step explanation:

Tough one. It is easy to get discouraged, but let's take a look.

We'll assume this is a straight line, with the form y=mx+b, where m is the slope and b is the y-intercept (the value of y when x=0). We're given the following points:

(1, 5.5)

(3, p)

(4, 4). and

(7, n)

We have two points that are honest-to-good numbers, no pesky letters:

(1, 5.5) and (4, 4)

We can use these two points to find the slope AND b, the y-intercept.

Slope is Rise/Run:

Going from (1, 5.5) to (4, 4).

The Rise is (4 - 5.5) or -1.5.

The Run is (4-1) or 3

The Rise/Run, m, is -1.5/3, or -0.5.

That gives us: y = -0.5x+b

Use one of the two points to find b. I'll use (4,4):

y = -0.5x+b

4 = -0.5*(4)+b

4 = -2 + b

b = 6

The equation is y = -0.5x + 6

Now let's take the two other points: (3,p) and​ (7,n), Since we have the equation, we can use the one value to generate the second:

(3,p)

If x=3:

y = -0.5x + 6

y = -0.5*(3) + 6

y = 4.5

The point is (3,4.5) and n = 4.5

The other point: (7,n)

y = -0.5x + 6

y = -0.5*(7) + 6

y = -3.5+6

y = 2.5

The point is (7, 2.5) p = 2.5

View image rspill6
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