<u>Given</u>:
Given that the table that shows the input and the output values for a cubic function.
We need to determine an approximate zero of the function.
<u>Approximate zero of the function:</u>
The zeros of the function are the x - intercepts that can be determined by equating f(x) = 0.
In other words, the zeros of the function is the value of x determined by equating f(x) = 0 in the function.
Let us determine the approximate zero of the function.
The approximate zero of the function can be determined by finding the value of f(x) that has a value which is almost equal to zero.
Thus, from the table, it is obvious that the value of f(x) that is approximately equal to zero is -0.5
Hence, the corresponding x - value is -1.
Therefore, the approximate zero of the function is -1.
I think the answer is 525
Answer:
7-4x/y=5
7+5y/x=4
Step-by-step explanation:
hope it's helpful
Answer:
ODC is 90
Step-by-step explanation:
look at the attachment
the quadrilateral must have 360 degrees in total so:
360 - (28+90+152)=90
the answer is 120, i got this by finding 2/3 of 36 which is 24. i then multiplied 24 by 2, then multiplied 36 by 2, which gave me 48 and 72, and then i just added them together to get 120, hopefully this helps
