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Consider the two functions below. Which one of these functions is linear? What is its equation? Enter any answers to two decimal places.

Consider the two functions below Which one of these functions is linear What is its equation Enter any answers to two decimal places class=

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dustinmiller37082

Answer:

Function A and the equation would be y = 1.6666666666~x + 0

Step-by-step explanation:

A linear function is a function that is a straight line with no change so function B does not fit that description. So than it has to be A

To find the equation you first what to find the slope of the line

ΔY/ΔX = 5/3 = 1.666666666666

Take the slope and multiply it by x to get y

Ver imagen dustinmiller37082

Following are the solution to the given function:

Given:

Function A:

[tex]\bold{x} \ 3 \ 6 \ 9 \ 12 \ 15 \\\\\bold{y} \ 5 \ 10 \ 15 \ 20 \ 25[/tex]

To find:

Find the function=?

Solution:

  • Function A or equation would've been [tex]\bold{y = 1.6666666666 \sim x + 0}[/tex].
  • The linear equation is a straight line with really no modification, hence function B doesn't suit its description. As a result, it has to be A.
  • You must first calculate the slope of the line to solve this equation.
  • [tex]\bold{\to \frac{\Delta Y}{ \Delta X} = 5/3 = 1.666666666666}[/tex]
  • To get y, take the slope then multiply this by x.
Ver imagen codiepienagoya

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