Answer:
x=5
Step-by-step explanation:
Answer:
The correct option is;
C. The polynomial in standard form is 2·x⁵ + 6x³ + x² - 4
Step-by-step explanation:
The given polynomial is x² + 6x³ - 4 + 2·x⁵
Therefore, we have;
The highest power in the polynomial is 5, therefore, the degree of the polynomial is 5
The end behavior is f(x) → ∞ as x → ∞ and f(x) → - ∞ as x → -∞ which is not similar to f(x) = -x
The standard form is accomplished by arranging the polynomial in decreasing powers of x that is rom the biggest too lowest exponent as follows;
2·x⁵ + 6x³ + x² - 4
The polynomial decreases fox x < 0
Answer:
The ordered pairs (3 , 6) , (5 , 10) show a proportional relationship ⇒ last answer
Step-by-step explanation:
* Lets explain how to sole the problem
- Proportional relationship describes a simple relation between
two variables
- In direct proportion if one variable increases, then the other variable
increases and if one variable decreases, then the other variable
decreases
- In inverse proportion if one variable increases, then the other variable
decreases and if one variable decreases, then the other variable
increases
- The ratio between the two variables is always constant
- Ex: If x and y are in direct proportion, then x = ky, where k
is constant
If x and y in inverse proportion, then x = k/y, where k is constant
* Lets solve the problem
# Last table
∵ x = 3 and y = 6
∴ x/y = 3/6 = 1/2
∵ x = 5 and y = 10
∴ x/y = 5/10 = 1/2
∵ 1/2 is constant
∵ x/y = constant
∴ x and y are proportion
* The ordered pairs (3 , 6) , (5 , 10) show a proportional relationship
Answer:
The graph of is:
*Stretched vertically by a factor of 3
*Compressed horizontally by a factor
*Moves horizontally units to the rigth
The transformation is:
Step-by-step explanation:
If the function represents the transformations made to the graph of then, by definition:
If then the graph is compressed vertically by a factor c.
If then the graph is stretched vertically by a factor c
If then the graph is reflected on the x axis.
If The graph moves horizontally b units to the left
If The graph moves horizontally b units to the rigth
If the graph is stretched horizontally by a factor
If the graph is compressed horizontally by a factor
In this problem we have the function and our parent function is
The transformation is:
Then and and
Therefore the graph of is:
Stretched vertically by a factor of 3.
Also as the graph is compressed horizontally by a factor
.
Also, as The graph moves horizontally units to the rigth
Answer: -5/3 and -3/5
Step by step explanation: