A Y-intercept and the slope. The y-intercept is where the line crosses the Y axis.
For each of the following relationships, graph the proportional relationship between the two quantities, write the equation representing the relationship, and describe how the unit rate, or slope is represented on the graph.
f(x) = mx +b. m and b are arbitrary constants.
You can write this as: D = kt where "k" is some constant. You can also write it as: D ∝ t, which you can read as "D is proportional to t".
x=y
A Y-intercept and the slope. The y-intercept is where the line crosses the Y axis.
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For each of the following relationships, graph the proportional relationship between the two quantities, write the equation representing the relationship, and describe how the unit rate, or slope is represented on the graph.
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Please dont mind the βwhatβ
You just write, "No Solution."
you add 1+1= 25 simple ;)
you have to take the bottom denominator and multiply it by the numerator then go bang a bum
It does not. The generalised linear form: ax + by + c = 0 is simpler since that is easily extended to 3 (or more) dimensional space.
f(x) = mx +b. m and b are arbitrary constants.
The equation x=c where c is a constant is the equation of a vertical line. It can't be a function but it is linear so the answer is no. For example, the vertical line produced by the linear equation x = 3 does not represent a function. We cannot write this equation so that y is a function of x because the only x-value is 3 and this "maps" to every real-number y.
it depends, what form is the equation written in? write it with variables though, instead of constants, and I'll try to get back to ya