A shop sells 200 chocolate vanilla and strawberry ice creams 45% of the ice cream sold are vanilla and 30% are strawberry how many chocolate ice creams are sold

Answers

Answer 1
Ice creams:
(1) Chocolate
(2) Vanilla
(3) Strawberry

There are three types of flavors.

45% of the ice creams are vanilla
30% of the ice creams are strawberry
x percent of the ice creams are chocolate

The total amount of ice creams is 200 that corresponds to 100%. Therefore:

45% + 30% + x = 100%

Solving for x:
x = 25%

Then the number of chocolate ice creams are:

[tex]25\%(200) = 50 [/tex]

Finally:
50 chocolate ice creams are sold

Answer 2

Final answer:

The answer explains how to calculate the number of chocolate ice creams sold in a situation where vanilla and strawberry ice creams are already accounted for.

Explanation:

The total number of ice creams sold is 200.

45% are vanilla ice creams. 45% of 200 is 90.

30% are strawberry ice creams. 30% of 200 is 60.

To find the number of chocolate ice creams sold:

Chocolate ice creams = Total ice creams - (Vanilla ice creams + Strawberry ice creams)

Chocolate ice creams = 200 - (90 + 60)

Chocolate ice creams = 200 - 150 = 50

Therefore, 50 chocolate ice creams are sold.


Related Questions

derivative, by first principle
[tex] \tan( \sqrt{x } ) [/tex]

Answers

[tex]\displaystyle\lim_{h\to0}\frac{\tan\sqrt{x+h}-\tan x}h[/tex]

Employ a standard trick used in proving the chain rule:

[tex]\dfrac{\tan\sqrt{x+h}-\tan x}{\sqrt{x+h}-\sqrt x}\cdot\dfrac{\sqrt{x+h}-\sqrt x}h[/tex]

The limit of a product is the product of limits, i.e. we can write

[tex]\displaystyle\left(\lim_{h\to0}\frac{\tan\sqrt{x+h}-\tan x}{\sqrt{x+h}-\sqrt x}\right)\cdot\left(\lim_{h\to0}\frac{\sqrt{x+h}-\sqrt x}h\right)[/tex]

The rightmost limit is an exercise in differentiating [tex]\sqrt x[/tex] using the definition, which you probably already know is [tex]\dfrac1{2\sqrt x}[/tex].

For the leftmost limit, we make a substitution [tex]y=\sqrt x[/tex]. Now, if we make a slight change to [tex]x[/tex] by adding a small number [tex]h[/tex], this propagates a similar small change in [tex]y[/tex] that we'll call [tex]h'[/tex], so that we can set [tex]y+h'=\sqrt{x+h}[/tex]. Then as [tex]h\to0[/tex], we see that it's also the case that [tex]h'\to0[/tex] (since we fix [tex]y=\sqrt x[/tex]). So we can write the remaining limit as

[tex]\displaystyle\lim_{h\to0}\frac{\tan\sqrt{x+h}-\tan\sqrt x}{\sqrt{x+h}-\sqrt x}=\lim_{h'\to0}\frac{\tan(y+h')-\tan y}{y+h'-y}=\lim_{h'\to0}\frac{\tan(y+h')-\tan y}{h'}[/tex]

which in turn is the derivative of [tex]\tan y[/tex], another limit you probably already know how to compute. We'd end up with [tex]\sec^2y[/tex], or [tex]\sec^2\sqrt x[/tex].

So we find that

[tex]\dfrac{\mathrm d\tan\sqrt x}{\mathrm dx}=\dfrac{\sec^2\sqrt x}{2\sqrt x}[/tex]

What does point A represent in this box plot?
A. first quartile
B. third quartile
C. the smallest value
D. the largest value
*Don't troll on these answers.

Answers

point A means the smallest value (and = 4)

answer
C. the smallest value

Answer:

point A that is the first point represents the smallest value

Step-by-step explanation:

find point A represent in this box plot

first point is the smallest value of all the data

last point is the largest value of all the data

second point is the first quartile

Middle point is the second quartile

fourth point is the third quartile

So point A that is the first point represents the smallest value

average of 1.99 3.29 2.45

Answers


[tex]1.99 + 3.29 + 2.45 = 7.73 \\ 7.73 \div 3 = 2.58[/tex]
The answer is 2.5766. Because if you add up all the numbers than you would get 7.73, and if you divide 7.73 by the amount of numbers there are, which is three, than you would get 2.5766. 
Hope this helps! :)

Suppose a city has 810 high-rise buildings, and 29 of these buildings have rooftop gardens. Find the percentage of high-rise buildings with rooftop gardens in this city. Round your answer to the nearest tenth of a percent.

Answers

For this case we can make the following rule of three:
 810 ---------> 100%
 29 -----------> x
 From here, we clear the value of x.
 We have then:
 x = (29/810) * (100)
 x = 3.580246914%
 Round to the nearest tenth of a percent:
 x = 3.6%
 Answer:
 
The percentage of high-rise buildings with rooftop gardens in this city is:
 
x = 3.6%

To find the percentage of high-rise buildings with rooftop gardens, divide the number of buildings with gardens (29) by the total number of buildings (810), and then multiply by 100. Round the final result to the nearest tenth, which is approximately 3.6%.

To calculate the percentage of high-rise buildings with rooftop gardens, we use the formula:

Percentage = (Part / Whole)  imes 100

Where the Part is the number of buildings with rooftop gardens, and the Whole is the total number of high-rise buildings.

Substituting the given values:

Percentage = (29 / 810) times 100

Carrying out the division first gives us:

Percentage ≈ 0.035802469 times 100

Finally, multiplying by 100 to find the percentage, we get:

Percentage ≈ 3.58

After rounding to the nearest tenth of a percent, we obtain:

Percentage ≈ 3.6%

3.6% of the high-rise buildings in the city have rooftop gardens.

Then find the area bounded by the two graphs of y=2x^2−24x+42 and y=7x−2x^2

Answers

To find the area under a curve, we integrate the function. To find the area bound between two curves, we integrate the difference of the functions. That is, we find:

[tex] \int\limits^a_b {(f(x)-g(x))} \, dx [/tex]

If you think about it, we are really doing this with all integration, only the second function is just y=0.

First, we need to figure out which function is on top. In this case we know that [tex]2x^2-24x+42[/tex] is a positive parabola while [tex]7x-2x^2[/tex] is negative, so the negative parabola will be on top. It is always a good idea to draw a rough sketch of the graphs because the curves could intercept multiple times, flipping which graph is on top at different intervals.

Next, we need to determine the bounds. These will be where the two graphs intercept, so we can just set them equal to each other and solve for x:

[tex]2x^2-24x+42=7x-2x^2[/tex]

Combine like terms:

[tex]4x^2-31x+42[/tex]

Now factor and find the zeros. We can use the quadratic formula:

[tex] \frac{31+ \sqrt{31^2-4(4)(42)} }{8} [/tex]

and

[tex] \frac{31- \sqrt{31^2-4(4)(42)} }{8} [/tex]

x = 1.75 and 6

[tex] \int\limits^6_{1.75} {((7x-2x^2)-(2x^2-24x+42))} \, dx [/tex]

[tex] \int\limits^6_{1.75} {(-4x^2+31x-42)} \, dx [/tex]

Solve:

[tex] \frac{-4x^3}{3} + \frac{31x^2}{2} - 42x [/tex]

Plug in bounds:

[tex]\frac{-4(6)^3}{3} + \frac{31(6)^2}{2} - 42(6)-(\frac{-4(1.75)^3}{3} + \frac{31(1.75)^2}{2} - 42(1.75))[/tex] = 51.17708





Which calculation will always give a result greater than 1

Answers

1+1 will always be 2, which is greater than 1. Unless you had options, in which case please attach your options

Answer:

the answer is 1 3/4  - less than 3/4

Step-by-step explanation:

ik bc i used ttm and got this answer and it was correct

Joe and jill set sail from the same point, with joe sailing in the direction s4 degrees e and jill sailing in the direction s9 degrees w. after 4 hr, jill was 2 miles due west of joe. how far had jill sailed?

Answers

The angle between Joe and Jill's initial directions is 4° +9° = 13°. The angle Joe measures after 4 hours between Jill's position and their starting point is 90° -4° = 86°. The law of sines can be used to find Jill's travel distance.

Jill's distance = (distance to Joe)*(sin(86°)/sin(13°))
Jill's distance = (2 mi)*0.99756/0.22495
Jill's distance = 8.869 mi

Jill had sailed 8.9 miles in 4 hours.

Annette is stacking boxes in her closet. There are 15 boxes in all. If each box weighs 7.5 pounds, his much do the boxes weigh together

Answers

If 1 box weighs 7.5 pounds, then we find the weight for 15 boxes with this equation:
15*7.5
Multiply:
112.5
15 boxes weight 112.5 pounds

hey can you please help me posted picture of question

Answers

The solutions to the given quadratic equation can be determined using quadratic formula.

[tex]x= \frac{-b+- \sqrt{ b^{2} -4ac} }{2a} [/tex]

b =coefficient of x term = -2
a = coefficient of squared term = 1
c = constant term = 10

Using the values in the above formula we get:

[tex]x= \frac{2+- \sqrt{4-4(1)(10)} }{2(1)} \\ \\ x= \frac{2+- \sqrt{-36} }{2} \\ \\ x= \frac{2+-6i}{2} \\ \\ x=1+3i, x=1-3i [/tex]

So the correct answer to this question is option A

How would you solve:

|*| 2x + 7 = 3 |*|
????

Answers

2x + 7 = 3
2x = 3 - 7
2x = -5
x = -5/2
hey user

the answer to this is going to be 
we do this math 

2x + 7 = 3
and then
2x = 3 - 7
then 
2x = -5
and we get

x = -5/2

hope l helped 

have a good day 

Find the derivative of f(x) = (1 + 5x2)(x − x2) in two ways. use the product rule. f '(x) = perform the multiplication first. f '(x) = do your answers agree? yes no

Answers

Answer:

The answers agree.

[tex]f^{\prime}(x) = - 20x^{3} + 15x^{2} - 2x + 1[/tex]

Step-by-step explanation:

The product rule is:

[tex]f(x) = g(x)h(x)[/tex]

[tex]f^{\prime}(x) = g^{\prime}(x)h(x) + g(x)h^{\prime}(x)[/tex]

In this problem, we have that:

[tex]f(x) = (1 + 5x^{2})(x - x^{2})[/tex]

So

[tex]g(x) = 1 + 5x^{2}[/tex]

[tex]g^{\prime}(x) = 10x[/tex]

[tex]h(x) = x - x^{2}[/tex]

[tex]h^{\prime}(x) = 1 - 2x[/tex].

[tex]f^{\prime}(x) = g^{\prime}(x)h(x) + g(x)h^{\prime}(x)[/tex]

[tex]f^{\prime}(x) = (10x)*(x - x^{2}) + (1 + 5x^{2})(1-2x)[/tex]

[tex]f^{\prime}(x) = 10x^{2} - 10x^{3} + 1 - 2x + 5x^{2} - 10x^{3}[/tex]

[tex]f^{\prime}(x) = - 20x^{3} + 15x^{2} - 2x + 1[/tex]

Multiplication first:

[tex]f(x) = (1 + 5x^{2})(x - x^{2})[/tex]

[tex]f(x) = x - x^{2} + 5x^{3} - 5x^{4}[/tex]

[tex]f(x) = -5x^{4} + 5x^{3} - x^{2} + x[/tex]

[tex]f^{\prime}(x) = -20x^{3} + 15x^{2} - 2x + 1[/tex]

Comparing the results, we can see that the derivatives obtained using the two methods are indeed the same. The answer is yes.

What's the function about?

The derivative of f(x) = (1 + 5x2)(x − x2) can be found using the product rule and by performing the multiplication first.

Using the product rule:

The product rule states that the derivative of f(x)g(x) is f′(x)g(x)+f(x)g′(x).

In this case, f(x) = 1 + 5x2 and g(x) = x − x2. So the derivative of f(x)g(x) is:

f′(x)g(x)+f(x)g′(x)

=(10x+10x3)(x−x2)+(1+5x2)(2x−2x3)

=10x2−10x3+10x3−10x4+2x−2x3+1+10x2−10x3

=−10x4+12x2+2x

Performing the multiplication first:

We can first multiply out the expression (1 + 5x2)(x − x2) to get:

x2−5x4+x3−5x3+x−x2

=−5x4+12x2+x

Then, we can take the derivative of this expression to get the same derivative as we found using the product rule:

f′(x)=−10x4+12x2+2x

Therefore, the derivative of f(x) = (1 + 5x2)(x − x2) is -10x4+12x2+2x, regardless of whether we use the product rule or perform the multiplication first.

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Determine whether quantities vary directly or inversely and find the constant of variation.
It takes four identical water pumps 6 hours to fill a pool. How long would it take three of these same pumps to fill the pool, assuming they all pump at the same rate?

Answers

Time taken by 4 water pumps to fill the pool is 6 hours
Time taken by 1 pump will be:
4×6=24 hours
fraction of pool filled by a single pump in 1 hour will be:
1/24
To calculate how long it would take 3 pumps to fill the pool we proceed as follows:
Fraction of pool filled with water in 1 hour is:
3×1/24
=1/8
thus the time taken to fill the pool by 3 pumps is:
8/1=8 hours

hey can you please help me posted picture of question

Answers

Answer:
y² = 4 - [tex] \frac{4x^2}{25} [/tex]

Explanation:
The given expression is:
4x² + 25y² = 100

We need to isolate the y².
This can be done as follows:
4x² + 25y² - 4x² = 100 - 4x²
25y² = 100 - 4x²
[tex] \frac{25y^2}{25} = \frac{100-4x^2}{25} [/tex]

y² = [tex] \frac{x100-4x^2}{25} [/tex]

y² = [tex] \frac{100}{25} - \frac{4x^2}{25} [/tex]

y² = 4 - [tex] \frac{4x^2}{25} [/tex]

Hope this helps :)

Evaluate 10m + n2/4 when m = 5 and n = 4

Answers

Answer:

[tex]54[/tex]

Step-by-step explanation:

we have

[tex]10m+\frac{n^{2}}{4}[/tex]

For [tex]m=5.n=4[/tex]

substitute the values of m and the value of n in the equation

so

[tex]10(5)+\frac{4^{2}}{4}[/tex]

[tex]50+4[/tex]

[tex]54[/tex]

Answer:54

Step-by-step explanation:

find the volume of the cylinder in terms of pi h=11 r=3.4

Answers

Volume of a cylinder= pi*r2*h
                                =3.142 * (3.4*3.4) * 11
                                =3.142 * 11.56 * 11
                                =36.32152 * 11
                                =399.53672

                                V=399.54
Hope this helps
3.4 *3.4 = 11.56
11.56 * 11 = 127.16

The answer is 127.6(Pi)m^3

Hope this helps

Resting heart rate was measured for a group of subjects; the subjects then drank 6 ounces of coffee. ten minutes later their heart rates were measured again. the change in heart rate followed a normal distribution, with mean increase of 7.3 beats per minute and a standard deviation of 11.1 beats per minute. let latex: y y denote the change in heart rate for a randomly selected person. find latex: \text{p}(y<10)

Answers

 i cant understand because every thing is coplicated 2 thats it !!!!!!!!!!

Calculate the probability that the change in heart rate is less than 10 beats per minute using z-scores and the standard normal distribution table.

The probability (P) that the change in heart rate (y) is less than 10 beats per minute is calculated by finding the z-score for 10, then using the z-table or a calculator to find the corresponding probability.

First, calculate the z-score: z = (10 - 7.3) / 11.1 = 0.2432. Next, find the probability by looking up this z-score in the standard normal distribution table, which corresponds to approximately 59.93%.

Therefore, the probability that the change in heart rate is less than 10 beats per minute is approximately 59.93%.

Identify the type of conic section whose equation is given. x2 = y + 3

Answers

One term is a square and the other is degree 1. This is the equation of a PARABOLA.

A rectangular storage area is to be constructed along the side of a tall building. a security fence is required along the remaining 3 sides of the area. what is the maximum area that can be enclosed with 800 m of fencing? (a = lw)

Answers

Let l represent the length of fence parallel to the side of the building. Then the width will be that of half the remaining fence, (800 -l)/2. The total area will be
  A = lw = l(800 -l)/2

This is the equation of a downward-opening parabola with zeros at l=0 and l=800. The zeros are symmetrical about the axis of symmetry of the parabola, which axis goes through the vertex. That is, the vertex is located at
  l = (0 +800)/2 = 400

The maximum aea that can be enclosed is 400 m long by 200 m wide, so is
  (400 m)×(200 m) = 80,000 m²
Final answer:

To find the maximum area enclosed with 800 m of fencing, the dimensions of the rectangular storage area need to be determined. The perimeter equation is derived to eliminate a variable, allowing the area to be expressed in terms of the remaining variable. Using this approach, the dimensions that maximize the area can be found.

Explanation:

To find the maximum area that can be enclosed with 800 m of fencing, we need to determine the dimensions that will result in the largest possible area. Let's assume the length of the rectangular storage area is L and the width is W.

Since there are 3 sides already covered by the security fence, the perimeter of the rectangular storage area will be: 2L + W = 800 m.

To find the maximum area, we need to eliminate one variable from the equation above. We can do this by expressing W in terms of L and substituting it back into the area formula A = LW.

By applying this approach, we can find the dimensions of the rectangular storage area that will enclose the maximum area with 800 m of fencing.

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A half cylinder lies on its side. What is the exact volume of the half cylinder?

150 π in3
300 π in3
450 π in3
600 π in3

Answers


pi*r²*h
pi*r²*h/2
r=10/2-----> r=5 in
h=12 in
=pi*5²*12/2----> 150*pi in³

so finally the correct answer would be the first option 
150*pi in3

The required exact volume of the half cylinder is 150 π in³. Option A is correct.

To calculate the volume of a half cylinder, we need to find the volume of a full cylinder and then divide it by 2.

The formula for the volume of a cylinder is given by:

Volume = π * r² * h

where π is a constant approximately equal to 3.14159, r is the radius of the cylinder, and h is the height or length of the cylinder.

Given that the diameter of the cylinder is 10 inches, we can find the radius by dividing the diameter by 2:

Radius (r) = 10 in / 2 = 5 in

The height or length of the cylinder is given as 12 inches.

Now we can calculate the volume of the full cylinder:

Volume = π * (5 in)² * 12 in = 300 π in^3

Finally, to find the volume of the half cylinder, we divide the volume of the full cylinder by 2:

Volume of Half Cylinder = (300 π in³) / 2 = 150 π in³

Therefore, the exact volume of the half cylinder is 150 π in³.

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hey can you please help me posted picture of question

Answers

The solutions to the given quadratic equation can be determined using quadratic formula.

[tex]x= \frac{-b+- \sqrt{ b^{2} -4ac} }{2a} [/tex]

b =coefficient of x term = -1
a = coefficient of squared term = 4
c = constant term = 9

Using the values in the above formula we get:

[tex]x= \frac{1+- \sqrt{1-4(4)(9)} }{2(4)} \\ \\ x= \frac{1+- \sqrt{-143} }{8} \\ \\ x= \frac{1+-i \sqrt{143} }{8} [/tex]

So, option D gives the correct answers


How many lines of symmetry does a regular polygon with 32 sides have

Answers

32. 16 through opposite vertices and 16 through the centres of opposite sides 

A regular polygon with 32 sides has 16 lines of symmetry.

What is Polygon?

A polygon is a plane figure made up of line segments connected to form a closed polygonal chain.

We need to find the number of  lines of symmetry does a regular polygon with 32 sides have.

The imaginary line or axis along which you can fold a figure to obtain the symmetrical halves is called the line of symmetry

A regular polygon with 32 sides has 16 lines of symmetry.

This is because each side is equal in length and angles, creating a mirrored effect when each side is divided in half.

Hence, a regular polygon with 32 sides has 16 lines of symmetry.

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What fuction respersents a slope of -4 and yintrersection -2?

Answers

The slope-intercept form of the equation for a line with a slope of -4 and a y-intercept of -2 is ...
  y = -4x -2

the angle of elevation of an object from a point 200 meters above a lake is 30 degrees and the angle of depression of it's image in the lake is 45 degrees. Find the height of the object above the lake.

Answers

Let h and d represent the height of the object above the lake and its horizontal distance from the observer, respectively.

Looking at the reflection of the object in the lake's surface is equivalent to observing the object at distance h below the lake's surface, or observing it from 200 m below the lake's surface. Considering the latter case, we have
  (h+200)/d = tan(45°)
  (h -200)/d = tan(30°)
Solving these for d and equating the results gives
  (h+200)/tan(45°) = (h -200)/tan(30°)
Solving for h, we get
  h(1/tan(30°) -1/tan(45°)) = 200(1/tan(45°) +1/tan(30°))
  h = 200(tan(45°) +tan(30°))/(tan(45°) -tan(30°))
  h ≈ 746.41

The object is about 746.4 meters above the lake.

(3) (-4) + (3) (4) -1

Answers

(3)(-4) +(3)(4)-1 = -1
(3)(-4) + (3)(4) - 1
(-12) + (12) - 1
0 - 1
-1

Hope this helps.

Oil-rich countries in the middle east cover about 4% of earth’s total land area but possess about 48% of the world’s known oil reserves. what is the main reason for the high concentration of reserves in this part of the world?

Answers

I'd say this high concentration is due to geological processes
Geological processes are things such as erosion, tectonic plate shifts, e.t.c.

You have a 45-gallon jug and a 124-gallon jug. neither of the jugs has any markings (although you do know their capacities). describe a way to measure exactly one gallon of water.

Answers

Pour 4  times of 124-gallon into a big jug.
Amount of water = 124 x 4 = 496 gallons

Then use the 45-gallon jug to scoop out the water 11 times.
Amount of water scooped out = 11 x 45 = 455 gallons

Water remaining = 496 - 450 = 1 gallon.

4*124 = 496
11*45 = 495

Fill the 124-gallon jug 4 times, emptying it each time into the 45-gallon jug. After the 45-gallon jug has been filled 11 times, there will be 1 gallon remaining in the 124-gallon jug.

_____
Mathematically, this works fine. In practice, you're looking for a 1-gallon difference after handling 495 gallons of water. That's about 0.2% of the total amount of water transferred. Any error along the way will substantially affect the outcome.

Find the area of the figure

Answers

You can solve each figure individually; the parallelogram, and the trapezoid.

The parallelogram, you can just do base * height. The base is 11 yards, and the height is 4 yards. 11 * 4 = 44 square yards.

Now for the trapezoid. If you split it up into a rectangle and a triangle, it becomes much more easier to solve. The rectangle and triangles can be made by splitting the figure down the center. This makes a rectangle with a length of 7 yards and a height of 8, and a triangle with a base of 7 yards and a height of 8 as well.

Solve for the area of both shapes.

The rectangle: Multiply length * height: 7 * 8 = 56 square yards

The triangle: Multiply base * height, and then divide by 2: 7 * 8 = 56
56 / 2 = 28 square yards

Now add the areas together.

28 + 56 + 44 = 128 square yards

Hope this helped!
These are the steps:
1. Find area of the trapezium.
2. Find area of the parallelogram.
3. Add the 2 areas together.


Step 1: Find the area of the trapezium:

Formula : area = 1/2 (a + b) h

Area = 1/2(7 + 14) (8) = 84 yd²


Step 2: Find the area of the parallelogram:

Formula : area = base x height

Area = 11 x 4 = 44 yd²


Step 3: Find the total area:

Total Area = 84 + 44 = 128 yd²

Answer: 128 yd²

a proton moves in an electric field such that its acceleration a is a=-20(1+2t)^-2, where t is the time in seconds. Find the velocity as a function of time if v sub zero =30 when t=0

Answers

a = dv/dt, therefore, to get an expression for v(t), we would integrate the expression for a:
a = -20/(1+2t)^2
v = (1/2)*20/(1+2t) + k = 10/(1+2t) + k
At t = 0:
v0 = 10/1 + k = 30
Therefore, k = 20, and the expression for v(t) is
v(t) = 10/(1+2t) + 20

Noa was paid a 25 percent commission for selling a used car.

Percents

Total

100%



If she was paid $1,631.24, what was the selling price of the car?

Answers

25 percent of x is equal to $1631.24
.25*4 is equal to 100 percent
Substitute 
1631.24*4=x
x=6524.96

Answer:

$6,524.96 Is Your Answer :3

Jordana is putting a fence around a garden that is shaped like a half circle and a rectangle.How much fencing will Jordana need? Use 22/7 for pi
64 ft
86 ft
92 ft
114 ft

Answers

To find how much fencing Jordana will need you will find the perimeter of the given shape.  This includes 3 straight sides and a rounded side.

28 ft + 14 ft + 28 ft = 70 feet for the straight sides.

To find the distance around the circular side, you will need to find half of the circumference of the circle.

1/2 x pi x d
 1/2 x 22/7 x 14 = 22 feet

70 feet + 22 feet = 92 feet

Jordana will need 92 feet of fencing to enclose this space.

Answer:

awnser c on edge 2020

Step-by-step explanation:

92

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