Answer:
The number of rosebushes the owner of the a greenhouse and nursery plans to grow every year is 1,600.
Step-by-step explanation:
It is provided that the owner of the a greenhouse and nursery has land available to grow 3000 and 2000 rosebushes every year.
She claims to be 80% efficient in the use of the land available.
She is considering to spend $6000 to acquire the licensing rights to grow a new variety of rosebush.
The variable cost will be $3 and she will sell the rosebushes for $6 each.
The formula to compute the number of rosebushes she plans to grow every year is,
Number of rosebushes = Effective Capacity × Efficiency
Thus, the number of rosebushes the owner of the a greenhouse and nursery plans to grow every year is 1,600.
Well to start off, the cone. It says switch ‘’ to 3 and for r (radius), we know the diameter is 6, and the radius is half of it. So the radius is 3 in.
so far it’s 3•3..to the power of two times ‘H’ (height) the height is 10, as you can see in the picture. So the equation we have so far is:
3•3^2•10 / 3 the answer to that is 90in
For the rectangle, the volume for rectangular prisms is length • width • height
so it’s 8 • 8• 1 which equals, 64 inches.
Now all you got to do is Add both answers.
90+64 = 154 in. That’s the answer
It is false am pretty sure
There are 20 possible combinations I believe.
Answer:
PQ = 5 units
QR = 8 units
Step-by-step explanation:
Given
P(-3, 3)
Q(2, 3)
R(2, -5)
To determine
The length of the segment PQ
The length of the segment QR
Determining the length of the segment PQ
From the figure, it is clear that P(-3, 3) and Q(2, 3) lies on a horizontal line. So, all we need is to count the horizontal units between them to determine the length of the segments P and Q.
so
P(-3, 3), Q(2, 3)
PQ = 2 - (-3)
PQ = 2+3
PQ = 5 units
Therefore, the length of the segment PQ = 5 units
Determining the length of the segment QR
Q(2, 3), R(2, -5)
(x₁, y₁) = (2, 3)
(x₂, y₂) = (2, -5)
The length between the segment QR is:
Apply radical rule: ![\sqrt[n]{a^n}=a,\:\quad \mathrm{\:assuming\:}a\ge 0](https://tex.z-dn.net/?f=%5Csqrt%5Bn%5D%7Ba%5En%7D%3Da%2C%5C%3A%5Cquad%20%5Cmathrm%7B%5C%3Aassuming%5C%3A%7Da%5Cge%200)
Therefore, the length between the segment QR is: 8 units
Summary:
PQ = 5 units
QR = 8 units
