The best prediction for the fish population is 16,079.
Hello i hope you are having a good day :)
Question 1 : A cooking show currently has about 223,000 regular viewers. The number of regular viewers has been decreasing at a rate of 4.7% per year. Which is the best prediction for the number of regular viewers the show will have in 6 years? = y = 223000(1-0.047)⁶ = 223000(0.953)⁶ = 167,056.
Question 2 : A population of 30,000 fish is expected to shrink at a rate of 7.5% per year. Which is the best prediction for the fish population in 8 years? = 30,000(1−7.5/100)8≈ 16078.9
Question 3 : Bromine-82 has a half-life of about 35 hours. After 140 hours, how many millilitres of an 80 ml sample will remain? = Divide 80(1/2)^4 to get 5.
Question 4 : Polonium-218 has a half-life of about 3 minutes. After 15 minutes, how many milligrams of a 120 mg sample will remain? = 3.75 mg
Question 8 : Pippa is holding the end of her kite string 1.4 m above the ground. The kite string rises at a 63° angle of elevation. Pippa has let out all 75 m of string. To the nearest tenth of a meter, how high above the ground is the kite? = 68.2 m
Question 9 : Using his telescope, Tommy watches a bald eagle as it sits on the top of a cliff. The telescope is positioned so that the line of sight to the eagle forms a 38° angle of elevation. The telescope sits 1.3 m above the ground and the base of the telescope is 116 m from the base of the cliff. To the nearest tenth of a meter, how high above the ground is the eagle? = 91.9 m
Question 10 : A photographer's camera sits on a tripod that is 1.8 m above the ground. The base of the tripod is 44 m from the base of a tree. The photographer spots a woodpecker in the tree at a 39° angle of elevation. To the nearest tenth of a meter, how high above the ground is the woodpecker? = 37.4 m
What is the perimeter of a right triangle whose hypotenuse is the line segment A(-7, 5) B(1,0)
Answer:
it depends
Step-by-step explanation:
The endpoints of the hypotenuse are insufficient to specify a right triangle. The perimeter can range from twice the distance between these points, about 18.868 units, to 1+√2 times the distance between these points, about 22.776 units.
___
In the attached figure, the colored numbers are the total length of the two legs of that color. The hypotenuse and its length are in black.
_____
The distance between two points is given by the formula ...
d = √((x2-x1)^2 +(y2 -y1)^2)
The perimeter will be the sum of the distances between pairs of points that define the vertices of the triangle. We need to know the third vertex to answer the question precisely.
The red stripe on a barber pole makes two complete revolutions around the pole. The pole is 260 cm high, and 14 cm in diameter. How long is the stripe? What angle does it make with the horizon?
Answer:
[tex]\boxed{\text{274.5 cm; }71.3^{\circ}}[/tex]
Step-by-step explanation:
If we open the surface of the pole and lay it flat, we will get a rectangle with the red stripe as a diagonal.
l = 260 cm.
The width of the rectangle is enough for two revolutions (i.e., twice the circumference).
w = 2C = 2 × 2πr = 4π × 14/2 = 28π cm = 87.96 cm
Length of stripe
The stripe is the diagonal of the rectangle.
d² = 260² + (28π)² = 67 600 + 87.96² = 67 600 + 7738 = 75 338
d = √(75 338) = 274.5 cm
Angle with horizontal
tanθ = 260/(28π) = 260/87.96 =2.956
θ = arctan2.956
θ = 71.3°
The stripe is [tex]\boxed{ \text{274.5 cm}}[/tex] long and the angle with the horizontal is [tex]\boxed{71.3^{\circ}}[/tex].
Final answer:
The red stripe on the barber pole is approximately 520.8 cm long and makes an angle of about 71.1 degrees with the horizon.
Explanation:
The problem describes a cylinder (barber pole) with a helical stripe wrapping around it. To find the length of the stripe, we need to construct a right-angled triangle by unwrapping the helix. One side of the triangle is the height of the pole (260 cm), and the other side is the circumference of the pole multiplied by the number of revolutions (2).
First, calculate the circumference using the diameter given:
Circumference = π × diameter = 3.1416 × 14 cm ≈ 44 cmThe length of the stripe is then the hypotenuse of the right triangle, which can be found using the Pythagorean theorem:
Hypotenuse² = Height² + (Circumference × Revolutions)²Hypotenuse = √(2602 + (44 × 2)²)Hypotenuse ≈ 520.8 cmFor the angle with the horizon, θ, we use the tangent function:
tan(θ) = opposite/adjacent = Height / (Circumference × Revolutions)θ = arctan(Height / (Circumference × 2))θ = arctan(260 / 88) ≈ 71.1°The angle with the horizon is approximately 71.1 degrees. So, the length of the stripe is about 520.8 cm, and it makes an angle of roughly 71.1° with the horizon.
Hi please please help me
Answer:
141.12 cm^2
Step-by-step explanation:
Since the area of a trapezoid is the average of the bases multiplied by the height, we can just plug these numbers into the equation! Since the average of 10.2 and 12.2 is 11.2, and the height is 12.6, we multiply them to get the area to be 141.12 cm^2.
Answer:
141.12cm^2
Step-by-step explanation:
I do not know if this is the correct way to do it, but I split the trapezoid in half, then putting it on top of each other to create a rectangle, which is (10.2cm+12.2cm)(12.6cm/2)
Please help !!!!!!!!!!!
Answer:
x = 58.0
Step-by-step explanation:
We can use the inverse of cos to solve for x once you set up the equation
[tex]cosx = \frac{9}{17}[/tex]
This is as 9 is the adjacent side and 17 is the hypotenuse of the triangle.
We can then solve for x using the inverse of cos
[tex]x= cos^{-1} (\frac{9}{17} )[/tex]
When plugged into a calculator you get
x= 58.03 degrees
this rounds to 58.0 degrees
HELP PLEASE! In ΔABC, m∠A = 43°, m∠B = 62°, and BC = 22 in. What is AB to the nearest tenth of an inch?
28.5 in.
15.6 in.
14.1 in.
31.2 in.
The length AB of the triangle is 31.2 inches.
How to find the side of a triangle?The side AB of the triangle can be found using sine rule for triangles as follows:
Using sine law,
a / sin A = b / sin B = c / sin C
Hence,
22 / sin 43 = AB / sin 75
cross multiply
AB sin 43 = 22 sin 75
divide both sides by sin 43
AB = 22 sin 75 / sin 43
AB = 21.2503681784 / 0.68199836006
AB = 31.1629271154
AB = 31.2 inches
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Camilla has 3 1/4 pound of butter she used 2 5/8 pounds of butter to make some cookies how many pounds of butter does Camilla have left
Answer:
5/8 pounds of butter
Step-by-step explanation:
You have to subtract 3 1/4 and 2 5/8. Once you get them in common denominators, you get 3 2/8 - 2 5/8. Next you turn 3 2/8 into 2 10/8. Then when you subtract it, you get 5/8 pounds of butter.
NEED HELP PLS!!!!!!!!!!!! BRANLIEST+15 POINTS!
A rectangle has a width that is 3 less than twice the length. If the rectangle has an area of 170 square inches, what is the length of the rectangle?
Answer:
L = 10, w = 17
Step-by-step explanation:
Area of a rectangle is A = Lw. We are told that the width is 3 less than twice the length, so we will change the width into some expression in terms of the length.
w = 2L - 3 and
length = L.
Filling in the area formula now, knowing that the area is given as 170:
170 = (2L - 3)(L) so
[tex]170=2L^2-3L[/tex]
Get everything on one side of the equals sign and throw it into the quadratic formula to factor it and solve for the values of L. When we do this we get that L = 10 and L = -8.5
Since the 2 things in math that will NEVER EVER be negative are time and distance/length measures, it is safe to disregard the -8.5. Therefore,
if L = 10, then
w = 2(10) - 3 and
w = 17
What is the volume of the cone with radius 4 ft and height 10 ft? Round to the nearest cubic foot.
A) 126 ft3
B) 200 ft3
C) 251 ft3
D) 168 ft3
Answer:
D) 168 ft3
Step-by-step explanation:
The formula to find the volume of a cone is V=π[tex]r^{2}[/tex][tex]\frac{h}{3}[/tex].
We need to plug in the radius, 4, and the height, 10, into this equation.
V=π[tex](4)^{2}[/tex][tex]\frac{10}{3}[/tex]
V=π16[tex]\frac{10}{3}[/tex]
V=π53.33
V=167.55
If we round up to the nearest whole number, we get 168 [tex]ft^{3}[/tex]. Therefore, the correct answer is D) 168 ft3.
I hope I helped!
The volume of a cone is calculated using the formula V = (1/3)πr²h. For a cone with a radius of 4 ft and a height of 10 ft, the volume rounds to approximately 168 ft³. Hence, the correct answer is D) 168 ft³.
The question asks for the volume of a cone with a radius of 4 ft and a height of 10 ft. The formula for the volume of a cone is V = (1/3)πr²h, where π (π approximately equals 3.14) is Pi, r is the radius of the base, and h is the height of the cone. Plugging the given values into this formula, we calculate the volume as follows:
V = (1/3)π(4 ft)²(10 ft) = (1/3) ∗ 3.14 ∗ 16 ft² ∗ 10 ft ≈ 167.55 ft³, which rounds to roughly 168 ft³.
Therefore, the correct answer is D) 168 ft³, rounding to the nearest cubic foot as requested.
Vector u has a magnitude of 5 units, and vector v has a magnitude of 4 units. Which of these values are possible for the magnitude of u + v? Select all correct answers.
1 unit
9 units
11 units
13 units
Step-by-step answer:
The maximum and minimum values are the positive sum and difference of the two magnitudes. The magnitude of u+v can range between these two limits, namely 5+4=9, and 5-4=1.
Therefore among the given choices, the possible values of u+v are 1 unit and 9 units. 11 and 13 are greater than the maximum so do not apply.
Answer:
1 unit
9 units
Step-by-step explanation:
PLATO
Confirm that f and g are inverses by showing that f(g(x)) = x and g(f(x)) = x.
f(x) = quantity x minus nine divided by quantity x plus five. and g(x) = quantity negative five x minus nine divided by quantity x minus one.
Show work pls
ANSWER
See below
EXPLANATION
Given
[tex]f(x) = \frac{ {x}- 9 }{x + 5} [/tex]
and
[tex]g(x) = \frac{ - 5x - 9}{x - 1} [/tex]
[tex](f \circ \: g)(x)= \frac{ (\frac{ - 5x - 9}{x - 1})- 9 }{(\frac{ - 5x - 9}{x - 1} )+ 5} [/tex]
[tex](f \circ \: g)(x)= \frac{ \frac{ - 5x - 9 - 9(x - 1)}{x - 1}}{\frac{ - 5x - 9 + 5(x - 1)}{x - 1} } [/tex]
Expand:
[tex](f \circ \: g)(x)= \frac{ \frac{ - 5x - 9 - 9x + 9}{x - 1}}{\frac{ - 5x - 9 + 5x - 5}{x - 1} } [/tex]
[tex](f \circ \: g)(x)= \frac{ \frac{ - 5x - 9x + 9 - 9}{x - 1}}{\frac{ - 5x + 5x - 5 - 9}{x - 1} } [/tex]
[tex](f \circ \: g)(x)= \frac{ \frac{ - 14x }{x - 1}}{\frac{ -14}{x - 1} } [/tex]
Since the denominators are the same, they will cancel out,
[tex](f \circ \: g)(x)= \frac{ - 14x}{ - 14} = x[/tex]
The yellow dog is smaller than the brown dog but larger than the white dog. The black dog is smaller than the white dog and the yellow dog. Which dog is the smallest?
Answer:
Black
Step-by-step explanation:
Black-White-Yellow-Brown
Also can you please rate this as the most brainliest because I need it to level up?
Please help me out please
Find the missing side of the right triangle using Pythagorean Theorem:
10^2 =8.7^2 +x^2;
x^2=100-75.69=24.31
x= sqrt 24.31~ 4.93
Area of trapezoid is area of triangle+area of a rectangle.
A=(8.7x4.93/2)+(12x4.93)
A=80.6055 ~81 ft^2
Ok so you do height times width
A. The area of the sector is 360 - x/ 360 times the area of the whole circle.
B. The area of the sector is equal to . pi R^2/ x
C. The area of the sector is x/360 times the area of the whole circle.
D. The area of the sector is equal to. pi R^2/ 360 - X
Answer:
C
Step-by-step explanation:
The area of the sector and the whole circle are proportional to the central angles.
a / A = x / 360°
a = (x / 360°) A
So the answer is C.
A square rug covers 79 square feet of floor. What is the approximate length of one side of the rug? (Approximate to the nearest hundredth foot.) 8.86 feet. 8.87 feet. 8.88 feet. 8.89 feet.
Answer:
8.89 feet
Step-by-step explanation:
The square of the side length is 79 ft², so the side length is the square root of that:
√(79 ft²) ≈ 8.88819 ft ≈ 8.89 ft
Snow Crest is 11,990.21 feet higher than Mt. Wilson. Write and solve an equation to find the elevation of Mt. Wilson. Let x represent the elevation of Mt. Wilson.
Answer:
The elevation of Mt. Wilson is 16,160.10 ft
Step-by-step explanation:
Let
x-----> represent the elevation of Mt. Wilson
y ----> represent the elevation of Snow Crest
we know that
y=x+11,990.21 ----> linear equation that represent this situation
we have that
y=28,150.31 ft ----> see the attached figure
substitute in the linear equation and solve for x
28,150.31=x+11,990.21
x=28,150.31-11,990.21=16,160.10 ft
Valeria drives 500 meters up a hill that makes an angle of 15 degrees with the horizontal. To the nearest tenth of a meter, what horizontal distance has she covered?
Answer:
Approximately 485 meters
Step-by-step explanation:
We can first construct a right triangle, using the 500 m length of hill as our hypotenuse. Using the fact that the cosine of an angle is the ratio of the adjacent side to the hypotenuse, we see that
[tex]\cos{15^\circ}=\frac{x}{500}[/tex]
where x is the horizontal distance covered. Solving for x, we find this horizontal distance to be
[tex]x=500\cos{15^\circ}\approx500(0.97)=485[/tex]
so our answer is approximately 485 m.
The volume in cubic feet of a box can be expressed as (x) = x^3 - 6x^2 + 8x , or as the product of three linear factors with integer coefficients. The width of the box is x-2. Factor the polynomial to find linear expressions for the height and the length. Show your work.
Answer:
Either the height is [tex]x[/tex] and the length is [tex]x-4[/tex] or the other way round.
Step-by-step explanation:
The volume is given in terms of x as [tex]V(x)=x^3-6x^2+8x[/tex].
We factor the GCF to get;
[tex]V(x)=x(x^2-6x+8)[/tex].
We split the middle term of the trinomial in the parenthesis.
[tex]V(x)=x(x^2-4x-2x+8)[/tex].
We now factor the expression within the parenthesis by grouping;
[tex]V(x)=x[x(x-4)-2(x-4)][/tex].
[tex]V(x)=x(x-2)(x-4)[/tex].
Since the width of the box is [tex]x-2[/tex] units, the linear expression for the height and length is [tex]x(x-4)[/tex]
Either the height is [tex]x[/tex] and the length is [tex]x-4[/tex] or the other way round.
1) The graph shows a probability distribution.
What is P(X<5)?
A) 0.3
B) 0.375
C) 0.625
D) 0.7
2) The graph shows a probability distribution.
Which probabilities are equal to 0.2?
Select each correct answer.
1) P(X≤2)
2) P(X≥4)
3) P(2≤X≤4)
4) P(1≤X≤3)
1. [tex]P(X<5)[/tex] is the area under the curve to the left of [tex]x=5[/tex], which is a trapezoid with "bases" of length 2 and 5 and "height" 0.2, so
[tex]P(X<5)=\dfrac{5+2}2\cdot0.2=0.7[/tex]
2. Find the area under the curve for each of the specified intervals:
[tex]P(X\le2)=\dfrac{2\cdot0.2}2=0.2[/tex] (triangle with base 2 and height 0.2)
[tex]P(X\ge4)=\dfrac{1\cdot0.4}2=0.2[/tex] (triangle with base 1 and height 0.4)
[tex]P(2\le X\le4)=\dfrac{0.2+0.4}2\cdot2=0.6[/tex] (trapezoid with "bases" 0.2 and 0.4 and "height" 2)
[tex]P(1\le X\le3)=\dfrac{0.1+0.3}2\cdot2=0.4[/tex] (trapezoid with "bases" 0.1 and 0.3 and "height" 2)
The required probabilities are found using the given graphs of the
probability distributions.
Response:
1) P(X< 5) is D) 0.7
2) The probability equal to 0.2 are;
P(X ≤ 2)P(X ≥ 4)How can the probabilities be calculated from the graph of a probability distribution?The probabilities are given by the area under the curve of the graph of
the probability distribution, which are found as follows;
1) The given figure is a trapezium, which gives;
[tex]Area \ of \ a \ trapezium = \mathbf{\dfrac{a + b}{2} \cdot h}[/tex]
Where;
a, and b are the parallel sides of the trapezium
h = The height
Therefore;
[tex]P(X < 5) = \dfrac{5 + 2}{2} \times 0.2 = \mathbf{0.7}[/tex]
P(X< 5) = D) 0.72) The probabilities equal to 0.2 are found as follows;
1) At P(X ≤ 2), the area is a triangle, which gives;
[tex]Area \ of \ a \ triangle = \mathbf{\dfrac{1}{2} \times Base \ length \times Height\sqrt{x}}[/tex]
[tex]P(X \leq 2) = \dfrac{1}{2} \times 2 \times 0.2 = \mathbf{0.2}[/tex]
P(X ≤ 2) = 0.22) At P(X ≥ 4), has a triangular area, which gives;
[tex]P(X \geq 4) = \mathbf{\dfrac{1}{2} \times 1 \times 0.4}= 0.2[/tex]
P(X ≥ 4) = 0.23) P(2 ≤ X ≤4) has a trapezoidal area, which gives;
[tex]P( 2 \leq X \leq 5) = \mathbf{\dfrac{0.2 + 0.4}{2}} \times 0.2 = 0.6[/tex]
P(2 ≤ X ≤4) = 0.6 ≠ 0.2
4) P(1 ≤ X ≤ 3) has a trapezoidal area, which gives;
[tex]P( 1 \leq X \leq 3) = \dfrac{0.1 + 0.3}{2} \times 2 = 0.4[/tex]
P(1 ≤ X ≤ 3) = 0.4 ≠ 0.2
Therefore;
The probabilities that are equal to 0.2 are;
P(X ≤ 2) = 0.2P(X ≥ 4) = 0.2Learn more about probability distributions here:
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Bob ran 5 1/4 miles at a pace of 3 3/8 miles per hour.How long was he running in hours.
Answer:
1 5/9
hope it helped
Step-by-step
divide 5 1/4 by 3 3/8 to get 1 5/9
On Friday John has $100 over the weekend he bought pizza for $37 and uses his debit card for concert tickets that cost $89 how much money did John have on Monday
Final answer:
After spending $37 on pizza and $89 on concert tickets, John overdrawn his account by $26. This calculation subtracts the total expenses from his initial amount, resulting in a negative balance.
Explanation:
John initially has $100, and we need to calculate how much money he will have on Monday after his expenses over the weekend. He bought pizza for $37 and concert tickets for $89, totaling $126 in expenses. To find out how much money John has left, we subtract his total expenses from his initial amount:
Initial Amount: $100
Total Expenses (Pizza + Concert Tickets): $37 + $89 = $126
Now, subtract the total expenses from the initial amount:
$100 - $126 = -$26
This means John will have a deficit of $26. Since he spent more than what he initially had, it implies he has overdrawn his account by $26.
What is the solution to the system of equations?
2x−y+z=−8
x+y+z=−4
3x−y−z=−4
Answer:
The solution to this system is (-2, 1, -3).
Step-by-step explanation:
Let's eliminate variable x first. Combine the first two equations, obtaining:
3x - 0y + 2z = -12.
Now subtract the third equation from this result:
3x - 0y + 2z = -12
-(3x − y − z = −4)
----------------------------
y + 3z = -8
Similarly, combine the second and third original equations to eliminate x again. To do this, subtract 2(x + y + z = -4) from the first equation:
2x−y+z=−8
-2x - 2y - 2z = 8
-----------------------
-3y - z = 0
Now we have eliminated x completely, and find from -3y - z = 0 that z = -3y. Substitute this -3y for z in the equation y + 3z = -8 found above:
y + 3(-3y) = -8. Then y - 9y = -8, and so y must = 1. From -3y - z = 0, substituting 1 for y, we find that z = -3(1), or z = -3.
Finally, subst. 1 for y and -3 for z in the second equation:
x + 1 - 3 = -4
So, x - 2 = -4, and thus x must be -2.
The solution to this system is (-2, 1, -3).
Using radicals, write an equivalent expression for the expression y^1/5
Answer:
[tex]\large\boxed{y^\frac{1}{5}=\sqrt[5]{y}}[/tex]
Step-by-step explanation:
[tex]\text{Use}\ a^\frac{m}{n}=\sqrt[n]{a^m}\to a^\frac{1}{n}=\sqrt[n]{a}\\\\y^\frac{1}{5}=\sqrt[5]{y}[/tex]
The equivalent expression for y^1/5 using radicals is √(y) where y is the base and 5 is the index of the radical.
Explanation:The expression
y^1/5
is the fifth root of y. In mathematics, when we talk about roots, we're essentially talking about the inverse operation of exponentiation. If we represent the expression y^1/5 using radicals, it would be written as
√(y)
. Here, the number inside the radical sign (y) is the base, and the index of the radical (in this case 5) is the root. Thus, √(y) and y^1/5 are equivalent expressions.
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Can someone explain this to me.
Answer:
option D
[tex]3*(\sqrt{x}+\sqrt{x-3})[/tex]
Step-by-step explanation:
Given in the question an expression,
[tex]\frac{9}{\sqrt{x} -\sqrt{x-3}}[/tex]
Step 1
Divide and multiple by [tex]\sqrt{x}+\sqrt{x-3}[/tex] to remove radical sign from denominator.
[tex]\frac{9}{\sqrt{x} -\sqrt{x-3}}*\frac{\sqrt{x} +\sqrt{x-3}}{\sqrt{x} +\sqrt{x-3}}[/tex]
Step 2
Apply a² - b² = (a+b)(a-b)
[tex]\frac{9*\sqrt{x}+\sqrt{x-3}}{\sqrt{x^{2}}-\sqrt{(x-3)^{2}}}}[/tex]
Step 3
[tex]\frac{9*\sqrt{x}+\sqrt{x-3}}{x-x+3}[/tex]
Step 4
[tex]\frac{9*\sqrt{x}+\sqrt{x-3}}{3}[/tex]
Step 5
[tex]3*(\sqrt{x}+\sqrt{x-3})[/tex]
No specific question was provided. Therefore, a clear question related to a specific subject and grade needs to be put forward for a detailed, example-filled explanation.
Explanation:Since there is no specific question provided, it is not possible to provide an accurate and factual answer. Therefore, in order to give a comprehensive answer, a clear and specific question related to a given subject like Mathematics, History, English, Biology, Chemistry, Physics, etc., and grade (Middle School, High School, College) needs to be provided. Once the question is presented, I would be delighted to provide a detailed explanation, using relevant examples and details to help you understand the concept.
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Find the surface area of the composite solid.
A.
680 in.2
B.
800 in.2
C.
920 in.2
D.
1,040 in.2
Answer:
we know that
surface area=2*area of the base+perimeter of base*height
area of the base=b*h/2
b=8 ft
h=15 ft
so
area of triangle=8*15/2-------> 60 ft²
perimeter of base=a+b+c
a=15 ft
b=8 ft
c=?
applying the Pythagoras theorem
c²=a²+b²------> c²=15²+8²------> c²=225+64------> 289
c=√289------> c=17 ft
perimeter=15+8+17=40 ft
height of the prism=20 ft
surface area=2*60+40*20------> 920 ft²
the answer is the option
B. 920 ft 2
The extended warranty on a $960 dishwasher is 21% of the purchase price and lasts for eight years. What is the effective cost per year of the extended warranty?
Answer:
$25.20
Step-by-step explanation:
Find 21% of $960
.21*960=201.6
Since there are 8 years, the cost per year will be the total cost divided by 8.
201.6/8=25.2
The cost per year is $25.20 on the extended warranty.
Answer:
50
Step-by-step explanation:
Identify the surface area of the composite figure to the nearest tenth. PLEASE HELP!!
1666.1 cm^2
1553.0 cm^2
1923.0 cm^2
Answer:
1553 cm^2.
Step-by-step explanation:
Surface area of the top part = area of the lateral part of the cylinder + area of the top circle
= 2π*6*10 + π*6^2 = 490.09 cm^2
Surface area of the bottom part
= surface area of the cube - surface area of the bottom of the cylinder
= 6 * 14^2 - π*6^2 = 1062.90
Total surface area = 490.09 + 1062.90 = 1553 cm^2.
Which of the following is the surface area of the right cylinder below?
Answer: OPTION C
Step-by-step explanation:
You need to use this formula for calculate the surface area of the right cylinder:
[tex]SA=2\pi r^2+2\pi rh[/tex]
Where "r" is the radius and "h" is the height.
You can identify in the figure that:
[tex]r=6units\\h=14units[/tex]
Knowing this, you can substitute these values into the formula [tex]SA=2\pi r^2+2\pi rh[/tex], therefore you get that the surface area of this right cylinder is:
[tex]SA=2\pi (6units)^2+2\pi (6units)(14units)[/tex]
[tex]SA=240\pi\ units^2[/tex]
Answer is C
A=2πrh+2πr^2
A=2π*6*14+2π*(6)^2
A=π*(2*6*14+2*6^2)= 240 π
Find the surface area of the right square pyramid. Round your answer to the nearest hundredth.
Answer:
A. 176
Step-by-step explanation: First, to find the surface area to each triangle, you multiply the base times the height by 1/2. It is 28 for each triangle. Multiply that by 4, and you get 112. Then, the surface area of the square on bottom is 64. When added together, you get 176. No rounding needed. Hope it helped and is correct!
Answer:
A. 176.00 in2Step-by-step explanation:
First, to find the surface area to each triangle, you multiply the base times the height by 1/2. It is 28 for each triangle. Multiply that by 4, and you get 112. Then, the surface area of the square on bottom is 64. When added together, you get 176. No rounding needed. Hope it helped and is correct!
I am hoping someone could kindly show the step by step instruction to solve this equation. I have tried to solve it many times but it is still not clear, could someone please show the steps 2(8r^2+r)-4r Thanks
Answer: 30r
Step-by-step explanation:
2(8r2+r)-4r
2(17r)-4r
34r-4r
30r
Answer:
16r^2-2r
Step-by-step explanation:
2(8r^2+r)-4r
(16r^2 +2r)-4r Distribute the 2
16r^2+(2r-4r) Regroup like terms
16r^2-2r
Hope this helps!
the cone and the cylinder below have equal surface area. True or false.
Answer:
False
Step-by-step explanation:
The surface area of the cone is
[tex]V=\pi r^2 +\pi rl[/tex]
[tex]SA=\pi r^2 +\pi\times r\times 2r[/tex]
[tex]SA=\pi r^2 +2\pi\times r^2[/tex]
[tex]SA=3\pi r^2[/tex]
The surface area of the cylinder is:
[tex]SA=2\pi r^2 +2\pi rh[/tex]
[tex]SA=2\pi r^2 +2\pi\times r\times r[/tex]
[tex]SA=4\pi r^2 [/tex]