Answer:
the product of the two integers is -80
A players kinetic energy will be most affected by his
2 answers:
Answer : A players kinetic energy will be most affected by his, speed.
Step-by-step explanation :
Kinetic energy : It is defined as the an object has energy due to its motion.
Kinetic energy of an object is determined by the velocity and the mass of the object.
The formula used for kinetic energy is,
where,
K.E = kinetic energy
m = mass of an object
v = velocity pf speed of an object
We can say that, kinetic energy is directly proportional to the mass of an object and also directly proportional to the square of the speed of an object.
That means, a players kinetic energy will be most affected by his speed as compared to mass because of the squaring factor of speed.
Thus, a players kinetic energy will be most affected by his speed.
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Answer:
Recursive: f(1) = 1; f(n) = f(n-1)/3
Equation: f(x) = 5/3·(1/3)^(x-1)
Step-by-step explanation:
You know this is an exponential function because sequential lines in the table have a common ratio of f(x) values:
f(2)/f(1) = (5/9)/(5/3) = 3/9 = 1/3
f(3)/f(2) = (5/27)/(5/9) = 9/27 = 1/3
and it continues like that.
Besides telling you the function is exponential, it also tells you that each term is 1/3 of the previous term.
<h3>Recursive formula</h3>The value of f(1) is read from the table. For x = 1, that value is ...
f(1) = 5/3
As we noticed above, each term is 1/3 the previous term, so the recursive relation is ...
f(n) = (1/3)·f(n-1)
<h3>Equation</h3>The general form of the equation for a geometric (exponential) relation is ...
f(x) = f(1)·r^(x-1) . . . . . . where f(1) is the first term, and r is the common ratio
For this function, we have f(1) = 5/3 and r = 1/3, so the equation is ...
f(x) = 5/3·(1/3)^(x-1)
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<em>Additional comment</em>
When given values of x that count from 1, we often express the equation in terms of (x-1). That equation can be simplified so the exponent is x.
f(x) = 5·(1/3)^x
Regardless of the sign of
On the other hand,
which can never be negative for real