<u><em>Answer:</em></u>
<u>The zeroes of the equation are:</u>
0, 3, 6 and 7
<u><em>Explanation:</em></u>
<u>Zeroes of an equation</u> are defined as values of x which make the equation equivalent to zero
<u>Remember that</u> in multiplication, if any of the terms is zero, then the product is equal to zero
<u>The given equation is:</u>
x(x-3)(x-6)(x-7) = 0
Now, we will take each term, equate it to zero and find the corresponding x value which makes this term a zero
<u>For the first term:</u>
x = 0 .................> 1st zero
<u>For the second term:</u>
x-3 = 0 .............> x = 3 ................> 2nd zero
<u>For the third term:</u>
x-6 = 0 ............> x = 6 .................> 3rd zero
<u>For the fourth term:</u>
x-7 = 0 ............> x = 7 ...................> 4th zero
Now, from the above, we can conclude that:
The zeroes of the equation are 0, 3, 6 and 7
<u>Another solution:</u>
Zeroes of an equation are represented graphically as the intersection between the function and the x-axis
Therefore, we can graph the function and get the intersection
The graph is attached below and the intersections are shown to be at:
(0,0) , (3,0) , (6,0) and (7,0)
This means that the zeroes are 0, 3, 6 and 7
Hope this helps :)
The horizontal asymptote of the function is the minimum number of deer in the area.
The equation is given as:
Expand the numerator
Cancel out the common factor
Hence, the equation of horizontal asymptote is:
The horizontal asymptote means that, the number of deer will never be less than 40
Read more about horizontal asymptotes at: