We will see that as x tends to ± ∞, the function tends to -∞.
- for x ⇒ ∞, f(x) ⇒ -∞
- for x ⇒ -∞, f(x) ⇒ -∞.
<h3><u>
What is the end behavior?</u></h3>
We define the end behavior as how the function behaves as x tends to very large, in absolute value, values.
In this case we have a quadratic equation:
f(x) = -0.5*x^2 - 3*x - 4
Here you can see that the leading coefficient is negative, thus, the arms of the graph will go downwards.
This means that in the limits of x ⇒ ∞ and x ⇒ -∞, the function will tend to negative infinity.
Then the end behavior can be written as:
- for x ⇒ ∞, f(x) ⇒ -∞
- for x ⇒ -∞, f(x) ⇒ -∞.
If you want to learn more about end behavior, you can read:
brainly.com/question/11275875
If there is an addition sign between the terms -10n^4 and 6n^2, then:
a = -10
b = 6
c = -3
In fact, this quadratic equation has no solution.
Answer: 9,000,000
Explanation: Using Pemdas, the first thing you do is solve the exponent, so 10^6 is 10 x 10 x 10 x 10 x 10 x 10 which is 1,000,00 and then you do the multiplication which makes the problem equal 9,000,000. Hope this helped!!
Let k = the constant amount added to the sequence since this
is an arithmetic sequence
x = missing
number
You have to formulate an equation based on the sequence:
6 + k = x or k = x – 6
x + k = 30
Substitute the value of k to the second formula:
x + x – 6 = 30
2x = 36
x = 18
Therefore, the missing number is 18.
A signed number is a number preceded by either a + sign (indicate a positive number) or a - sign (indicates a negative number)