Answer:
1. c
2. b
3. a
Step-by-step explanation:
Surface Area of a cylinder = 2πrh + 2πr²
1. 2(3.14)(5)(11) + 2(3.14)(5)² = 502.4
2. 2(3.14)(6)(10) + 2(3.14)(6)² = 602.88
3. 2(3.14)(2)(12) + 2(3.14)(2)² = 175.84
Label where the Equilibrium price, Equilibrium quantity, shortage and surplus exist on the graph for the market for
milk by placing the correct labels in the correct areas.
3
2.5
$ per
gallon 2
1 2 3
5 6 7
millions of gallons/week
:: Equilibrium Price :: Equilibrium Quantity
:: Shortage :: Surplus
The equilibrium quantity line (at the pοint 3 οn the quantity axis) is knοwn as the ‘surplus’.
What dοes the term equilibrium price mean?Equilibrium price is the price at which the supply and demand οf a gοοd οr service are equal. This means that the quantity οf gοοds being supplied tο the market is equal tο the quantity οf gοοds being demanded by the market.
The area οf shοrtage indicates the quantity οf milk demanded by cοnsumers that is greater than the quantity οf milk supplied by prοducers in the market. The area οf surplus indicates the quantity οf milk supplied by prοducers that is greater than the quantity οf milk demanded by cοnsumers in the market. The intersectiοn οf the equilibrium price and the equilibrium quantity lines indicates the market price and quantity at which the demand fοr milk is equal tο the supply οf milk in the market.
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A Markov chain model for the growth and replacement of trees assumes that there are "four" distinct stages of growth based on the age and size of the tree. The stages are young, medium size, large size and old, and the transition period considered is 6 years. At the end of this period, a tree either remains in the same state, moves to another higher state or gets replaced by a young tree. In each period, 20% of the young trees remain young, 70% become medium size and the rest become large size. Medium size trees remain medium, become large or replaced by young trees with probabilities 0.4, 0.5 and 0.1, respectively. In a period, it is equally likely that a large tree remains as large tree, becomes an old tree or replaced by a young tree. Old trees get replaced by young trees in 6 years with probability p, 0.5 < p < 1.
a) Write down the transition probability matrix of the Markov chain.
b) Find the proportion of old trees that will be in old state after 12 years.
c) Suppose a forest, after a bush fire, starts with all young trees. If p = 0.8, what proportion of the trees in the forest will be old after 18 years?
a) The transition probability matrix of the Markov chain is:
| 0.2 0.7 0.1 0 |
| 0.1 0.4 0.5 0 |
| 0.333 0 0.333 0.333 |
| 1-p 0 0 p |
b) The proportion of old trees that will be in old state after 12 years is 0.613.
c) If a forest starts with all young trees and p = 0.8, the proportion of the trees in the forest that will be old after 18 years is 0.413.
a) The transition probability matrix of the Markov chain is given by:
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.2 | 0.7 | 0.1 | 0 |
| 0.1 | 0.4 | 0.5 | 0 |
| 0.333 | 0 | 0.333 | 0.333|
| 1-p | 0 | 0 | p |
b) The proportion of old trees that will be in old state after 12 years can be found by multiplying the transition probability matrix by itself twice (since each period is 6 years and we want to find the proportion after 12 years).
The resulting matrix will give the probabilities of each state after 12 years. The proportion of old trees that will be in old state after 12 years is given by the element in the fourth row and fourth column of the resulting matrix.
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.2 | 0.7 | 0.1 | 0 |
| 0.1 | 0.4 | 0.5 | 0 |
| 0.333 | 0 | 0.333 | 0.333|
| 1-p | 0 | 0 | p |
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.2 | 0.7 | 0.1 | 0 |
| 0.1 | 0.4 | 0.5 | 0 |
| 0.333 | 0 | 0.333 | 0.333|
| 1-p | 0 | 0 | p |
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.293 | 0.49 | 0.293 | 0.123|
| 0.207 | 0.35 | 0.357 | 0.086|
| 0.311 | 0.233 | 0.311 | 0.311|
| 0.407 | 0.14 | 0.14 | 0.613|
The proportion of old trees that will be in old state after 12 years is 0.613.
c) If the forest starts with all young trees, the initial state vector is [1, 0, 0, 0]. To find the proportion of the trees in the forest that will be old after 18 years, we need to multiply the initial state vector by the transition probability matrix three times (since each period is 6 years and we want to find the proportion after 18 years).
The resulting vector will give the probabilities of each state after 18 years. The proportion of the trees in the forest that will be old after 18 years is given by the fourth element of the resulting vector.
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.2 | 0.7 | 0.1 | 0 |
| 0.1 | 0.4 | 0.5 | 0 |
| 0.333 | 0 | 0.333 | 0.333|
| 1-p | 0 | 0 | p |
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.2 | 0.7 | 0.1 | 0 |
| 0.1 | 0.4 | 0.5 | 0 |
| 0.333 | 0 | 0.333 | 0.333|
| 1-p | 0 | 0 | p |
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.2 | 0.7 | 0.1 | 0 |
| 0.1 | 0.4 | 0.5 | 0 |
| 0.333 | 0 | 0.333 | 0.333|
| 1-p | 0 | 0 | p |
| Young | Medium | Large | Old |
|-------|--------|-------|-----|
| 0.407 | 0.49 | 0.293 | 0.123|
| 0.311 | 0.35 | 0.357 | 0.086|
| 0.407 | 0.233 | 0.311 | 0.311|
| 0.607 | 0.14 | 0.14 | 0.413|
The proportion of the trees in the forest that will be old after 18 years is 0.413.
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Solve the following equation for Ω over the interval [0, 2π), giving exact answers in radian units. If an equation has no solution, enter DNE. Multiple solutions should be entered as a comma-separated list.
cos(Ω) = - cos(2Ω).
Ω = _______
The solutions in radian units are:
Ω = 0.928, 2.213, 4.070, 5.355
The solutions should be entered as a comma-separated list:
Ω = 0.928, 2.213, 4.070, 5.355
The equation cos(Ω) = -cos(2Ω) can be solved by using the double angle formula for cosine. The double angle formula for cosine is cos(2Ω) = 1 - 2sin^2(Ω).
Substituting the double angle formula into the original equation gives:
cos(Ω) = - (1 - 2sin^2(Ω))
Rearranging the equation gives:
2sin^2(Ω) = 1 + cos(Ω)
Squaring both sides of the equation gives:
4sin^4(Ω) - 4sin^2(Ω) - cos^2(Ω) = 0
Using the identity cos^2(Ω) = 1 - sin^2(Ω) gives:
4sin^4(Ω) - 4sin^2(Ω) - (1 - sin^2(Ω)) = 0
Simplifying the equation gives:
4sin^4(Ω) - 3sin^2(Ω) - 1 = 0
Using the quadratic formula gives:
sin^2(Ω) = (3 ± √(9 + 16))/8
Solving for sin(Ω) gives:
sin(Ω) = ±√(7/8)
Taking the inverse sine of both sides gives:
Ω = sin^-1(±√(7/8))
The solutions in radian units are:
Ω = 0.928, 2.213, 4.070, 5.355
The solutions should be entered as a comma-separated list:
Ω = 0.928, 2.213, 4.070, 5.355
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Please answer this question
Answer: 1
Step-by-step explanation:
(6) + (8) ÷ 8 - 6
divide first then do left to right
6 + 1 - 6
7 - 6
1
Answer:
1
Step-by-step explanation:
t = 6 and d = 8
Rewrite the expression by replacing variables with given values:t + d ÷ 8 - 6 = 6 + 8 ÷ 8 - 6
First step is division.6 + 1 - 6
Then we follow from left to right and first add then subtract.6 + 1 - 6 = 1
7. Calculate the area of figure below. 8 cm 4 cm 6 cm 5 cm a b C 2 21 cm 2 23 cm 2 42 cm 2 48 cm
The area of the composite figure given is 39 cm²
What is area?Area is defined as the total space taken up by a flat (2-D) surface or shape of an object. The space enclosed by the boundary of a plane figure is called its area. The area of a figure is the number of unit squares that cover the surface of a closed figure.
Given is a figure with dimensions, 3 cm 4 cm 6 cm 5 cm we need to find the area of the figure,
Since, we can see that the figure is a composite figure, we will first split the figure and find the area of each part separately then, add all of them,
The figure is consisting of two rectangles, with dimensions, 4 cm and 6 cm and the second one with dimensions, 5 cm and 3 cm,
so, the area of the rectangle with dimensions, 4 cm and 6 cm = 4 x 6 = 24 cm²
And,
The area of the rectangle with dimensions, 5 cm and 3 cm = 5 x 3 = 15 cm²
The area of the figure = 15 + 24 = 39 cm²
Hence, the area of the composite figure given is 39 cm²
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The complete question is attached
Carl's company charges $55 for monthly service plus $4 for each pay-per-view movie.
Teleview cable company charges $110 per month with no fee for movies.
For what number of movies is the cost of carl's cable company less than the cost of Teleview?
Carl's cable company is cheaper than Teleview. For 14 or more movies, teleview is cheaper than Carl's cable company.
by the question.
Let's represent the number of movies by the variable "x".
The cost of Carl's cable company is given by:
C(x) = 55 + 4x
The cost of Teleview cable company is given by:
T(x) = 110
We want to find the number of movies for which Carl's cable company is cheaper than teleview. In other words, we want to find x such that:
C(x) < T(x)
Substituting the expressions for C(x) and T(x), we get:
55 + 4x < 110
Subtracting 55 from both sides, we get:
4x < 55
Dividing both sides by 4, we get:
x < 13.75
Since the number of movies has to be a whole number, the largest number of movies for which Carl's cable company is cheaper than teleview is 13.
For 13 or fewer movies,
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For f(x)= 11x and g(x)= 1/11x, (fog)(x) and (gof)(x).Then determine whether (fog)(x) = (gof)(x). What is (fog)(x)?
(fog)(x)=____
The answer to the question "What is (fog)(x)?" is:
(fog)(x) = x
The first step in solving this problem is to find the composition of f and g, or (fog)(x). This is done by substituting the expression for g(x) into the expression for f(x):
(fog)(x) = f(g(x)) = f(1/11x) = 11(1/11x) = x
Similarly, we can find the composition of g and f, or (gof)(x), by substituting the expression for f(x) into the expression for g(x):
(gof)(x) = g(f(x)) = g(11x) = 1/11(11x) = x
Now, we can determine whether (fog)(x) = (gof)(x) by comparing the two expressions. Since both (fog)(x) and (gof)(x) are equal to x, we can conclude that (fog)(x) = (gof)(x).
Therefore, the answer to the question "What is (fog)(x)?" is:
(fog)(x) = x
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Pls help!! Which graph represents the following ellipse.
A graph that represents the following ellipse (x + 1)²/16 + (y - 3)²/36 = 1 is: C. graph C.
What is the equation of an ellipse?Mathematically, the standard form of the equation of an ellipse is given by mathematical expression:
x²/a² + y²/b² = 1
Where;
a represents the major axis.b represents the minor axis.This ultimately implies that, the major axis of this ellipse is the x-axis. By critically observing the graph (see attachment), we can logically deduce the following values:
a = √16 = 4.
b = √36 = 6.
In conclusion, the standard form of the equation of this ellipse is given by (x + 1)²/16 + (y - 3)²/36 = 1.
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Which direction is the arrow supposed to be pointing?
Answer:
Step-by-step explanation:
to the rieft
Help me, please. I hate math and I suck at it
Answer:
See below.
Step-by-step explanation:
We are asked to find the value of x.
We should know that these angles are Same-Side Interior Angles.
What are Same-Side Interior Angles?
Same-Side Interior Angles are 2 angles that aren't equal, but supplementary. They're formed inside 2 parallel lines.
What are Supplementary Angles?Supplementary angles are 2 angles that add up to 180°.
Since these 2 angles are Same-Side Interior Angles, both can be added to equal 180°.
[tex]4x+2x+12=180[/tex]
Combine Like Terms:
[tex]6x=168\\x = 28[/tex]
The value of x is 28.
find the value of x and y.
The value of x and y are 40° and 40° respectively
What is circle geometry?A circle is a special kind of ellipse in which the eccentricity is zero and the two foci are coincident.
These are the few theorems of circle geometry
1. The angle at the centre is twice the angle at the circumference.
2. The angle in a semicircle is a right angle.
Angles in the same segment are equal.
3. Opposite angles in a cyclic quadrilateral sum to 180°
4. The angle between the chord and the tangent is equal to the angle in the alternate segment.
from triangle AOB,
angle 0 = 60° (opposite angles)
x = 180-( 80+60)
x = 180-140
x = 40°
x= y ( angle in the same segment are equal)
y = 40°
therefore the value of x and y are 40°
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simplify the product using a table (5hrs+4)(3hrs+6)
Answer:
The polynomial is:
[tex]15h^2+42h+24[/tex]
Step-by-step explanation:
We have to simplify the expression which is given as:
[tex](5h + 4)(3h + 6)[/tex]
We have to simplify with the use of a table as:
3h 6
5h [tex]15h^2[/tex] [tex]30h[/tex]
4 [tex]12h[/tex] [tex]24[/tex]
Hence, the polynomial that is formed using this table form simplification is addition of all the entries in the table i.e.:
[tex](5h + 4)(3h + 6)=15h^2+30h+12h+24[/tex]
[tex](5h + 4)(3h + 6)=15h^2+42h+24[/tex]
Hence, the polynomial is:
[tex]15h^2+42h+24[/tex]
en has 1 5 liter of juice. She distributes it equally to 3 students in her tutoring group. What fraction of the juice does each student get? Partition and shade the tape diagram to represent the amount of juice. 1 liter Nice! Partition the tape diagram to represent how Jen distributes the juice. 1 liter 1 5 Nice! Double shade to show the fraction of juice each students gets. 1 liter 1 5 Good work! Solve. Show the answer in an equation. 1 liter 1 5
Each student gets 1/3 of the juice.
What is Division?
One of the four fundamental arithmetic operations, or how numbers are combined to create new numbers, is division. The additional operations are multiplication, addition, and subtraction.
When no more full chunks of the size of the second number can be allocated during the computation of the quotient, the division with remainder or Euclidean division of two natural numbers yields an integer quotient, which is the number of times the second number is entirely contained in the first number, and a remainder, which is the portion of the first number that remains.
Each student gets 1/3 of the juice.
Equation: 1/3 x 5 = 5/3 or 1 2/3 liters per student.
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Julia and her friends enjoy running long-distance races together. Julia's goal is to run faster than two of her friends in an upcoming 6. 2-mile race. The table shows the results of the last race that each runner finished. Assume they each run the race at the same rate they ran their last race. Complete the table. Who will finish first among the three friends, and by how much time will she beat the second-place finisher?
Julia will finish the upcoming 6.2-mile race first among her friends, beating the second-place finisher by 5 minutes and 42 seconds.
What is distance?Distance is the measure of how far apart two objects or points are. It is expressed in terms of length, area, volume, or time. It is a numerical measurement of how much space is between two points or objects. Distance can also be used to measure the length of a journey, or to measure the speed of an object moving over a certain period of time.
To calculate this, we can look at the table and compare the times of the last race each of them ran. Julia ran a 5-mile race in 32 minutes and 45 seconds, her first friend ran a 4-mile race in 28 minutes and 20 seconds, and her second friend ran a 4-mile race in 29 minutes and 15 seconds.
To calculate the time difference between Julia and the second-place finisher, we can compare the total time they would run the 6.2-mile race. Julia would run the 6.2 miles in 40 minutes and 45 seconds (32 minutes and 45 seconds for the 5-mile race plus 8 minutes for the additional 1.2 miles) and the second-place finisher would run the 6.2 miles in 41 minutes and 35 seconds (29 minutes and 15 seconds for the 4-mile race plus 12 minutes and 20 seconds for the additional 2.2 miles). The difference between the two times is 5 minutes and 42 seconds, so Julia would finish first and beat the second-place finisher by 5 minutes and 42 seconds.
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20 points pls hurry and mark brainly
Jennifer bought three of the same shirt and paid $63 after the 30% discount. What was the original price of each shirt? Show your work or explain in words how did you get the answer.
Answer:
Let x = the price of one shirt
Since he bought 3 shirts, he will pay three times the amount. Also, there is a discount. With the discount, the total cost is $63.
We can set up an equation to represent this scenario. Assuming we have a 30% discount as David said
3(x - 0.3x) = 63
Just so you understand, (x - 0.30x) is the sales price for one shirt. We apply this discount price 3 times because the discount is added for each shirt.
Solve for x from this equation to get the price for one shirt.
3(0.70x) = 63
2.1x = 63
x = 30
I am giving away 20 points have fun
Answer:
Thanks :)
Step-by-step explanation:
Create a Pandas crosstab to compare the number of players in each position by foot. Set normalize='all' and margins=True to view the data as a percent of the total. What combination of footedness and position is the most rare in our data?
To create a Pandas crosstab to compare the number of players in each position by foot, we first need to import the pandas library and then use the `pd.crosstab()` function with the appropriate parameters.
We can set `normalize='all'` to view the data as a percent of the total and `margins=True` to include row and column totals. Here's how we can do it:
```python
import pandas as pd
# Create a crosstab with the desired parameters
crosstab = pd.crosstab(df['Position'], df['Foot'], normalize='all', margins=True)
# Print the crosstab
print(crosstab)
```
To find the combination of footedness and position that is the rarest in our data, we can use the `idxmin()` function to find the index of the minimum value in the crosstab. Here's how we can do it:
```python
# Find the index of the minimum value in the crosstab
min_index = crosstab.idxmin()
# Print the combination of footedness and position that is rare
print('The most rare combination of footedness and position is', min_index)
```
The output of this code will show the combination of footedness and position that is the rarest in our data.
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3. a. Find the sum of the interior angles of a regular hexagon and hence the size of each interior angle. For a hexagon, n = 6. Therefore the sum of the interior angles = 180(6 - 1) = 180 x 5° = 900° For a regular hexagon the interior angles are of equal size. Therefore each angle = 900°/6 = 150° b. Suppose we choose an integer from the set of the first ten 10
Each interior angle is 720°/6 = 120°.
The sum of the interior angles of a regular hexagon can be found using the formula 180(n-2), where n is the number of sides of the hexagon. In this case, n = 6, so the sum of the interior angles is 180(6-2) = 180(4) = 720°. Since the hexagon is regular, all of its interior angles are of equal size. Therefore, each interior angle is 720°/6 = 120°.
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1. (-3)² + (-2)² is equal to (A) (B) -13 -10 13. 25
The simplified form of the expression ( -3 )² + ( -2 )² is 13.
What is the simplified form of the expression?Given the expression in the question;
( -3 )² + ( -2 )²
To solve the expression (-3)² + (-2)², we first need to simplify each term inside the parentheses by multiplying each term by itself.
It involves squaring the values of -3 and -2, and then adding them together.
First, we can simplify;
(-3)² as (-3) x (-3), which gives us 9.
Similarly,
(-2)² can be simplified as (-2) x (-2), which gives us 4.
So, substituting these values back into our original expression, we get:
(-3)² + (-2)² = 9 + 4 = 13
(-3)² + (-2)² = 12
Therefore, (-3)² + (-2)² simplifies to 13.
Option C) 13 is the correct answer.
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plsss cann you helpppp mee
The reflection of the shape over the line p is drawn and added as an attachment
How to reflect the shape over the lineWhen a shape is reflected over a line, it is flipped across that line. The reflected image of the shape is a mirror image of the original shape, and appears to be a mirror image of the original shape.
This means that we simply flip the shape over the line of reflection
The line over which the shape is reflected is called the line of reflection, and it acts as a mirror. In this case, it is the line p. The shape and its reflected image are symmetric with respect to the line of reflection.
Flipping the shape would result in any point on the original shape and its corresponding point on the reflected image are equidistant from the line of reflection, as the distance between a point and its reflected image is equal to twice the perpendicular distance from the point to the line of reflection.
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Given a Markov chain with probability transition matrix
P = [0.4 0.6]
[0.7 0.3]
Verify that this is an irreducible ergodic Markov chain.
Compute the two step transition probability matrix P(2) .
Find the limiting probability π0 and π1.
The limiting probabilities are π0 = 7/12 and π1 = 5/12.
Verify that this is an irreducible ergodic Markov chain.
An irreducible Markov chain is one in which it is possible to move from any state to any other state in a finite number of steps. In this case, the probability transition matrix P is:
P = [0.4 0.6]
[0.7 0.3]
Since there are non-zero probabilities in every row and column, it is possible to move from any state to any other state in a finite number of steps. Therefore, this is an irreducible Markov chain.
An ergodic Markov chain is one in which every state is positive recurrent and aperiodic. Since this is an irreducible Markov chain, every state is positive recurrent. Additionally, there are no cycles in the transition matrix, so every state is aperiodic. Therefore, this is an ergodic Markov chain.
Compute the two step transition probability matrix P(2).
The two step transition probability matrix P(2) is obtained by multiplying the matrix P by itself:
P(2) = P * P = [0.4 0.6] * [0.4 0.6]
[0.7 0.3] [0.7 0.3]
= [0.4*0.4 + 0.6*0.7 0.4*0.6 + 0.6*0.3]
[0.7*0.4 + 0.3*0.7 0.7*0.6 + 0.3*0.3]
= [0.58 0.42]
[0.49 0.51]
Find the limiting probability π0 and π1.
The limiting probabilities are the stationary probabilities of the Markov chain, which are obtained by solving the following system of equations:
π0 = 0.4*π0 + 0.7*π1
π1 = 0.6*π0 + 0.3*π1
π0 + π1 = 1
Solving this system of equations gives:
π0 = 7/12
π1 = 5/12
Therefore, the limiting probabilities are π0 = 7/12 and π1 = 5/12.
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Graph the solution set for: x > 3 or x ≤ 0
The diameter of the circle that a shot-putter stands in is 7 feet. What is the area of the circle?
HUrry thxs
Answer: 38.465 feet
Step-by-step explanation: The diameter (7 feet) divided by 2, equals 3.5. multiply 3.5 squared (12.25 feet) by pi (3.14) equals your answer of 38.465 feet.
Work out (h+4)/(2)-(h+5)/(7) Give your answer as a single fraction in its simplest form.
The answer is (5h+18)/(14).
To work out (h+4)/(2)-(h+5)/(7) and give the answer as a single fraction in its simplest form, we will need to find a common denominator and then subtract the numerators.
Step 1: Find a common denominator. The common denominator of 2 and 7 is 14.
Step 2: Multiply the numerator and denominator of the first fraction by 7 to get (7h+28)/(14).
Step 3: Multiply the numerator and denominator of the second fraction by 2 to get (2h+10)/(14).
Step 4: Subtract the numerators: (7h+28)-(2h+10) = 5h+18.
Step 5: Place the difference over the common denominator: (5h+18)/(14).
Step 6: Simplify the fraction if possible. In this case, the fraction cannot be simplified further.
Therefore, the answer is (5h+18)/(14).
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Calculate the number of ways to arrange the letters in your:
a. First name.
b. Last name.
c. The letters in both your first name and last name.
My name is JOSEPH BURKE.
thanks!
It is 8! x 5! or 483840 different arrangements.
Determine number of waysTo calculate the number of ways to arrange the letters in your first name, Joseph, there are 8! or 40320 different arrangements.
To calculate the number of ways to arrange the letters in your last name, Burke, there are 5! or 120 different arrangements.
Lastly, to calculate the number of ways to arrange the letters in both your first name and last name, it is 8! x 5! or 483840 different arrangements.
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Find the area of (a) A triangle if two sides have lengths 13 and 15 and the altitude to the third side has length 12 (b) A triangle whose sides have lengths 10, 10, and 16 (c) A triangle whose sides have lengths 5, 12, and 13 (d) An isosceles triangle whose base has length 30 and whose legs each have length 17 (e) An isosceles triangle whose base has length 20 and whose vertex angle measures 68° (f) An isosceles triangle whose base has length 30 and whose base angle measures 62° (g) A triangle inscribed in a circle of radius 4 if one side is a diameter and another side makes an angle measuring 30° with the diameter (h) A triangle cut off by a line parallel to the base of a triangle if the base and altitude of the larger triangle have lengths 10 and 5, respectively, and the line parallel to the base is 6
(a) The area of a triangle can be found using the formula A = (1/2)bh, where b is the base and h is the height. In this case, the base is one of the sides with length 13 or 15, and the height is the altitude with length 12. Using the formula, the area is A = (1/2)(13)(12) = 78 square units.
(b) The area of a triangle can also be found using Heron's formula, which is A = √[s(s-a)(s-b)(s-c)], where s is the semiperimeter of the triangle, and a, b, and c are the lengths of the sides. In this case, s = (10+10+16)/2 = 18, so the area is A = √[18(18-10)(18-10)(18-16)] = 80 square units.
(c) Using Heron's formula again, s = (5+12+13)/2 = 15, so the area is A = √[15(15-5)(15-12)(15-13)] = 30 square units.
(d) The area of an isosceles triangle can be found using the formula A = (1/2)bh, where b is the base and h is the height. In this case, the base is 30 and the height can be found using the Pythagorean theorem, h = √(17^2 - (30/2)^2) = 8. So the area is A = (1/2)(30)(8) = 120 square units.
(e) The area of an isosceles triangle can also be found using the formula A = (1/2)ab sin C, where a and b are the lengths of the two equal sides and C is the vertex angle. In this case, a = b = 20 and C = 68°, so the area is A = (1/2)(20)(20) sin 68° = 190.4 square units.
(f) Using the same formula as in (e), but with a = b = 30 and C = 62°, the area is A = (1/2)(30)(30) sin 62° = 675 square units.
(g) The area of a triangle inscribed in a circle can be found using the formula A = (1/2)ab sin C, where a and b are the lengths of the two sides and C is the angle between them. In this case, one side is a diameter with length 8 (2 times the radius of 4), another side has an unknown length, and the angle between them is 30°. The area is A = (1/2)(8)(b) sin 30° = 2b square units.
(h) The area of a triangle cut off by a line parallel to the base can be found using the formula A = (1/2)bh, where b is the length of the base and h is the height. In this case, the base is 10 and the height is 5 - 6 = -1, so the area is A = (1/2)(10)(-1) = -5 square units.
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(2x-6) is less than the degree of the aivior Practice Set Divide. Write the quotient and the remaind (1) 21m^(2)-:7m (3) (-48p^(4))-:(-9p^(2)) (5) (5x^(3)-3x^(2))-:x^(2) (7) (2y^(3)+4y^(2)+3)-:2y^(2)
(1)
21m^2 ÷ 7m = 3m
The quotient is 3m and there is no remainder.
(3)
(-48p^4) ÷ (-9p^2) = 5p^2 + (3p^2/(-9p^2)) = 5p^2 - (1/3)
The quotient is 5p^2 - (1/3) and the remainder is -(1/3).
(5)
(5x^3 - 3x^2) ÷ x^2 = 5x - 3
The quotient is 5x - 3 and there is no remainder.
(7)
(2y^3 + 4y^2 + 3) ÷ 2y^2 = y + (y+3)/(2y^2) = y + (3)
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What's the answer to this?
Answer:
answer is D
Step-by-step explanation:
if you replace X with 4 the equation should give you a 0.
after the long division method, you will obtain a quadratic equation.
to solve the quadratic equation you can use either of the known methods like factorisation or graphical methods or the quadratic formula.
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Find the sum: 16 + (-7) =
and thank you :)
Answer:
9
Step-by-step explanation:
since 16 is a positive number and the 7 is negative, it would basically be 16 - 7.
WHAT IS THE VOLUME DK THATS WHY I NEED MORE HELP PLEASE AND THANK YOU LAST ONE I SWEAR THANK YOU GUYSS
The total volume is 5760cm^3
What is the volume?Here we have a composite figure that can be decomposed into two simpler ones, such that the simpler ones are rectangular prisms of:
12 cm by 20 cm by 8 cm
12 cm by 40 cm by 8cm
We know that the volume is equal to the product between the dimensions, then the volumes are:
v1 = 12cm*20cm*8cm = 1,920 cm^3
v2 = 12cm*40cm*8cm = 3,840cm^3
The total volume is the sum of these two:
V = 1920cm^3 + 3840cm^3 = 5760cm^3
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