Answer:
0-7-1-9-1-9-0-4-4-3
Step-by-step explanation:
your problem can be solved when you use the above mentioned formula. use it wisely
<h2>
Answer:</h2><h2>
g = 2 and h = -5</h2>
Step-by-step explanation:
To find the product with unknown values of variables, multiply the terms and equate the value to the given product.
= ![21d^{4} + 7hd^{3} - 56d^{2} - 9d^{3} - 3hd^{2} + 24d + 3gd^{2} + ghd - 8g](https://tex.z-dn.net/?f=21d%5E%7B4%7D%20%20%2B%207hd%5E%7B3%7D%20-%2056d%5E%7B2%7D%20-%209d%5E%7B3%7D%20-%203hd%5E%7B2%7D%20%2B%2024d%20%2B%203gd%5E%7B2%7D%20%2B%20ghd%20-%208g)
=
... (1)
Comparing eq(1) to the product given in question,
-8g = -1
g = 2
24 + gh = 14, sub g =2,
24 + 2h = 14
h = -5
A gardener measures every plant in her garden and notes that 28% are under 6 inches, 54% are between six and 8 inches and the rest are above 8 inches. if she wants to make a bar graph to depict her data, where should the vertical axis begin to ensure it’s not misleading?
Answer: Option C) 0 in is correct
Vertical axis should begin with 0 inches in order to ensure the bar graph is not misleading because 28% of the plants in the garden are measuring less than 6 inches.
If the vertical line begins with 6 inches, the 28% of the plants which are less than 6 inches would not be shown, thus leading it to be misleading.
If the vertical line begins with -6 inches, the negative numbers will be misleading as there will not be any plant with negative height
If the vertical line begins with 28 inches, we will be missing most our data as most of the plant's have height less than 8 inches
To graph equations like y = -x -12
Since this is in slope intercept form we are automatically given the y-intercept which in this case is -12 so (0,-12)
the coefficient in front of the x is the slope, in this case it is -x so that means -1/1 or -1
To graph this you would plot a point at the y-intercept, then down one over one (negative slope means down instead of up) then to the right, however long to create a line
Hope this helps :)<span />
You've certainly tried hard to describe it in enough detail so that
it can be answered without seeing the diagram. Sadly, it's not
enough.
We still don't know what's tangent to what, where point 'C' is, or
how any of this relates to a circle. You'll have to figure out some
way or us to see the diagram.