The length of the segment HI in the figure is 32.9
<h3>How to determine the length HI?</h3>
To do this, we make use of the following secant-tangent equation:
HI² = KI * JI
From the figure, we have:
KI = 21 + 24 = 45
JI = 24
So, we have:
HI² = 45 * 24
Evaluate the product
HI² = 1080
Take the square root of both sides
HI = 32.9
Hence, the length of the segment HI is 32.9
Read more about secant and tangent lines at:
brainly.com/question/14962681
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Step-by-step explanation:
log2(x) = 5.6
so,
x = 2^5.6 ≈ 48.50293013... ≈ 48.50
Step-by-step explanation:
First, plug the values of the volume, pi, and radius into the formula for volume of a cylinder. Next, square the radius and multiply the values together. Last, divide each side by 28.26 for the answer, remembering to include the appropriate unit of measurement. The answer is the height of the cylinder is 9 meters.
Answer:
First blank = 236
Second blank = 60
Third blank = 656
Step-by-step explanation:
For first blank; n = 20
f(n) = 7(20) + 96
= 236
For second blank; f(n) = 516
⇒ 516 = 7n + 96
⇒ n = 60
For third blank; n = 80
f(n) = 7(80) + 96
= 656
Answer:
7 ft
Step-by-step explanation:
The area of a circle is given by
A = pi r^2
153.86 = 3.14 r^2
Divide each side by 3.14
153.86 / 3.14 = r^2
49 = r^2
Take the square root of each side
sqrt(49) = sqrt(r^2)
7 = r