The rate of change of the linear equation is 
Explanation:
The given two coordinates are 
and 
To determine the rate of change, let us use the formula,
Substituting the coordinates in the equation, we get,
Simplifying, we have,
Dividing, we get,
Thus, the rate of change of the linear equation is
In exact form it is 7/2
In decimal form it is 3.5
In mixed number form it is 3 1/2
Answer:
4355
Step-by-step explanation:
Answer:
If I were to guess I think C.product/sum
but don't take my word for it
Explanation:
It the beginning of the equation it is dividing for a product. Near the end it adds more numbers for a sum.
Good Luck.
Sorry if I am wrong ¯\_(ツ)_/¯
<span>I am assuming that this is a parametric curve.
We see that the curve intersects the x-axis when:
t - t^2 = 0 ==> t = 0 and t = 1.
Then, since x = 1 + e^t is an increasing function, the curve is being traced exactly once on the interval (0, 1).
Using the fact that the area under the curve given by the parametric equations x = f(t) and y = g(t) on (a, b) is:
A = ∫ f'(t)g(t) dt (from t=a to b),
and that f(t) = 1 + e^t ==> f'(t) = e^t, the area under the curve is:
A = ∫ e^t(t - t^2) dt (from t=0 to 1)
= e^t(-t^2 + 3t - 3) (evaluated from t=0 to 1), by integrating by parts
= e(-1 + 3 - 3) - (0 + 0 - 3)
= 3 - e. </span>
