Remember that to determine the average rate of change over an interval, you can use the formula f(b) - f(a) / b - a. Remember that we have to find the average rate of change over the interval [0, 3].
(1) Given our table, we know that g(3) = 5, and and g(0) = - 13. Respectively b = 3, and a = 0. Let's substitute,
The average rate of change of the table is hence 6.
(2) Here we are given that our function has an x-intercept of (3,0), and a y-intercept of (0,6). Therefore p(3) = 0, and p(0) = 6. And of course b = 3, and a = 0,
The average rate of change of 'function p' is - 2.
(3) If you take a look at the graph, f(3) = 5, and f(0) = - 4. Let's substitute,
Hence the average rate of change of the graph is 3.
(4) Knowing the equation we can solve for r(3) and r(0) by plugging in 3 and 0 for x. Let's do it,
r(3) = (3)² + 2(3) - 5 = 9 + 6 - 5 = 10,
r(0) = (0)² + 2(0) - 5 = - 5
Now let's substitute into the formula f(b) - f(a) / b - a,
The average rate of change of the equation is 5.
Answer:
For the average to be above 90, the marks in the fourth paper should be MORE THAN 92.
Step-by-step explanation:
The score of students in last 3 exams = 89 , 87 and 92
Let us assume the marks scored by the student in last exam = k
The average of marks should be above 90.
Now,
Sum of all 4 paper's marks = 89 + 87 + 92 + k = 268 + k
Also, 90 < Average
Hence,for the average to be above 90, the marks in the fourth paper should be MORE THAN 92.
Answer:
4.5 sq. units.
Step-by-step explanation:
The given curve is
⇒ ...... (1)
This curve passes through (0,0) point.
Now, the straight line is y = 3x - 6 ....... (2)
Now, solving (1) and (2) we get,
⇒ (y - 3)(y + 2) = 0
⇒ y = 3 or y = -2
We will consider y = 3.
Now, y = 3x - 6 has zero at x = 2.
Therefor, the required are =
=
=
= 6 - 1.5
= 4.5 sq. units. (Answer)