Answer:
N < -3
Step-by-step explanation:
first off, simply, then subtract the 9s from both sides.
5n < -6 -9
Simplify -6 -9 to -15 , Which gives you
5n < -15
then, divide both sides by 5.
n < 15/5
Simplify 15/5 to 3, Which give you
N < -3
here is your answer.
N < -3
Answer:
The height of the kite is approximately 278.6 feet
Step-by-step explanation:
The length of Jason's Kite string, l = 325 feet
The angle of elevation of the kite string, θ = 58°
The height of Jason's hand, h = 3 feet above the ground
Therefore, we have;
The height of the kite = The vertical component of the length of the kite string + The height of Jason's hand above the ground
The height of the kite = l × sin(θ) + h
Substituting the values, we get
The height of the kite = 325 × sin(58°) + 3 ≈ 278.6 (which is obtained by rounding the answer to the nearest tenth)
The height of the kite ≈ 278.6 feet.
Hello!
a) 6 pounds
$9 is three times the cost we are given. Therefore, we multiply our original two pounds by three, giving us 6.
b) You would not be able to
There are 16 ounces in a pound. If each one weighs 5 ounces, it would be 5/16 of a pound. This would be 5/16 of $1.5, which is about 0.47. If we multiply this by 24 oranges, we get a cost 11.28, which is more than $9.
I hope this helps!
Answer:
Part A: 48in^2
Part B: 4in by 12in, 8in by 6in, and 3in by 16in
Step-by-step explanation:
Volume/height is the area of the base:
480/10 = 48in^2
Any two numbers that multiply to 48 are possible dimensions of the block:
4*12, 8*6, 3*16
First, let's assume that the numbers given corresponds to the length and width of the area.
*area = l x w*
a1 (upper area) = 8 x 2
a2 (lower area) = 6 x 2
a3 (front row) = 4 x ?
It's logical to say the a3 should have 2 as it's width. By this, we can now calculate the total length and width. For these 3 given, we can say that the total length is 18 (8 + 6 + 4) and we can get the percentage per location and we can described later how many seats it represent from the total of 138.
a1 = 8 ÷ 18 X 100
a1 = 44.44%
a2 = 6 ÷ 18 X 100
a2 = 33.33%
a3 = 4 ÷ 18 X 100
a3 = 22.22%
We now know the percentages that each area represents, so we can used these to solve for the number of seats.
a1 = 138 x 0.44
a1 = 61 seats
a2 = 138 x 0.33
a2 = 46 seats
a3 = 138 x 0.22
a3 = 31 seats
To check, we can add 61 seats + 46 seats + 31 seats, and we will get a total of 138 seats.
