The median annual salary would be more useful to Jaime in making the decision between pursuing graduate studies or applying for a job.
The median annual salary represents the middle value in a salary distribution, which indicates the typical or central salary of college graduates in that profession. It is less affected by extreme values or outliers in the data. Therefore, the median provides a more reliable measure of the average salary that Jaime can expect as a college graduate. On the other hand, the mean annual salary can be influenced by a few individuals with exceptionally high or low salaries, which may not accurately reflect the typical salary range. Hence, the median salary would be a better indicator for Jaime to make an informed decision.
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What is the answer to this question??
The missing length indicated has the value given as follows:
x = 25.
What is the geometric mean theorem?The geometric mean theorem states that the length of the altitude drawn from the right angle of a triangle to its hypotenuse is equal to the geometric mean of the lengths of the segments formed on the hypotenuse.
The bases in this problem are given as follows:
x and 144.
The length of the altitude segment is given as follows:
60.
60 is the geometric mean of x and 144, hence the value of x is obtained as follows:
144x = 60²
x = 3600/144
x = 25.
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PROBLEM SOLVING: Write the answer corresponds to the problem. REMINDERS
If the answer requires decimals, express your answer in 2 decimal places. If your answer is more than 3 digits, DO NOT INCLUDE THE COMMA. Compute for the mean expenses of the XYZ Corporation given the following:
Name Total Sales Total Expenses
Quezon City 14,950. 00 4,933. 50
Caloocan City 18,290. 00 6,035. 70
Marikina City 37,200. 00 12,276. 00
Cebu City 18,900. 00 6,237. 00
Davao City 45,000. 00 14,850. 00
Mandaluyong City 23,000. 00 7,590. 00
Cavite 22,000. 00 7,260. 00
Laguna 21,000. 00 6,930. 00
Manila 66,000. 00 21,780. 00
Iloilo 34,000. 00 11,220. 0
The mean expenses of the XYZ Corporation is 9,811.22.
To compute for the mean expenses of the XYZ Corporation, we need to add up all the total expenses of each city and divide it by the total number of cities.
Total Expenses = 4,933.50 + 6,035.70 + 12,276.00 + 6,237.00 + 14,850.00 + 7,590.00 + 7,260.00 + 6,930.00 + 21,780.00 + 11,220.00
Total Expenses = 98,112.20
Number of Cities = 10
Mean Expenses = Total Expenses / Number of Cities
Mean Expenses = 98,112.20 / 10
Mean Expenses = 9,811.22
The mean expenses of the XYZ Corporation is 9,811.22. Since the answer does not require decimals, we do not need to express it in two decimal places. However, we need to follow the reminder that if the answer is more than three digits, we should not include the comma.
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Using the results of the survey, out of 9,000 customers how many should the manager expect to visit late on weekends?
According to the survey, 40% of customers visit late on weekdays and 60% visit late on weekends. Therefore, out of 9,000 customers, we can expect 60% of them to visit late on weekends.
To find out the exact number, we can use the following calculation:
60% of 9,000 = (60/100) x 9,000 = 5,400
Therefore, the manager can expect around 5,400 customers to visit late on weekends out of a total of 9,000 customers.
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Need help with first four
Answer:
For 1 is it 1 hour and 15 mins?
Step-by-step explanation:
6 by 32 = 30 mins
12 by 32 = 1 hr
13 by 32 = 15
1hr + 15 mins = 1hr 15 mins
Sorry if incorrect
Use the formula to find the surface area of the figure. Show your work.
who can determine the perimeter of the following regular nonagon??
The perimeter of the regular nonagon is approximately 29.7 feet.
The apothem of a regular nonagon divides each of its interior angles into two congruent angles.
Therefore, each of the interior angles of the nonagon measures:
(180 - 360/9)/2 = 140 degrees
The sum of the interior angles of a nonagon is (9-2) * 180 = 1260 degrees. Therefore, the measure of each exterior angle of the nonagon is:
360/9 = 40 degrees
In a regular nonagon, all the sides and angles are congruent, so we can divide it into 9 congruent isosceles triangles. Each of these triangles has base s and height a, and its legs are given by:
l =√s² - (a/2)²
The perimeter P of the nonagon is given by:
P = 9s
Substituting the values of s and a, we get:
l = √3.3²- (1.65/2)²
= 3.018 ft (rounded to 3 decimal places)
P = 9(3.3) = 29.7 ft
Therefore, the perimeter of the regular nonagon is approximately 29.7 feet.
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Simplify, (Write each expression without using the absolute value symbol)
x-(-12) if x<-12
Answer:
If x < -12, then (-x) > 12, and we have:
x - (-12) = x + 12
So, the simplified expression without using the absolute value symbol is:
x + 12
Step-by-step explanation:
Answer:
Since x is less than -12, then x-(-12) = x+12.
Here is a table of values for x and x-(-12):
x | x-(-12)
-13 | -1
-14 | -2
-15 | -3
...
Step-by-step explanation:
given f(x)=3x+2 and g(x)= √x-1, determine the following: g(f(8))=
The function operation g(f(8) in the given functions f(x) = 3x+2 and g(x) = √(x-1) is 5.
What is the function operation g(f(8) in the given functions?A function is simply a relationship that maps one input to one output.
Given that:
f(x) = 3x + 2g(x) = √( x - 1 )g(f(x)) = ?First, set up the composite result function:
Evaluate g( 3x + 2 ) by substituting in the value of f into g.
g( 3x + 2 ) = √( ( 3x + 2 ) - 1 )
Simplify
g( 3x + 2 ) = √( 3x + 2 - 1 )
g( 3x + 2 ) = √( 3x + 1 )
Evaluate the result function by replacing the x with 8.
g( f(x) ) = √( 3(8) + 1 )
g( f(x) ) = √( 24 + 1 )
g( f(x) ) = √( 25 )
g( f(x) ) = 5
Therefore, the composite result function g( f(x) ) is 5.
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Help will give BRAINLYST If a certain soil sample contains 200 grams of water on July 1st,which equat describes the relationship between y amount of water in grams,and t time in weeks after July 1st
The required equation is y = 200 - (0.025)t
Hence option C is correct.
According to the given information:
The soil's water content is dropping by 2.5% weekly.
And here, Begin with the 200 gram of water that were initially present in the soil sample on July 1.
Then deduct the weekly water loss,
Which is determined by multiplying the original water amount by 25% and the number of weeks (t).
Now forming the equation,
⇒ y = 200 - (2.5/100)t
⇒ y = 200 - (0.025)t
Hence, the expression be,
y = 200 - (0.025)t
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x^4-5x^3+7x^2-5x+6=0
Answer:Therefore, the solutions to the equation x^4 - 5x^3 + 7x^2 - 5x + 6 = 0 are x = 0, x = 1, x = 5.
Step-by-step explanation:
To solve the equation x^4 - 5x^3 + 7x^2 - 5x + 6 = 0, we can use factoring by grouping.
First, we can group the first two and last two terms:
x^4 - 5x^3 + 7x^2 - 5x + 6 = (x^4 - 5x^3) + (7x^2 - 5x + 6)
Next, we can factor out x^3 from the first group and factor out 1 from the second group:
(x^3(x - 5)) + (7x^2 - 5x + 6)
Now, we can group the last two terms of the second group:
x^3(x - 5) + (7x^2 - 3x - 2x + 6)
Then, we can factor out 1 from the terms inside the parentheses and group them:
x^3(x - 5) + (7x^2 - 3x) + (-2x + 6)
Now, we can factor out x from the second and third groups:
x^3(x - 5) + x(7x - 3) - 2( x - 3)
We can simplify the third group by distributing the negative sign:
x^3(x - 5) + x(7x - 3) - 2x + 6
Finally, we can combine the second and third groups:
x^3(x - 5) + x(7x - 5) + 6
So, the factored form of the equation x^4 - 5x^3 + 7x^2 - 5x + 6 = 0 is:
(x^3(x - 5) + x(7x - 5) + 6) = 0
This equation can be solved by setting each factor equal to zero and solving for x:
x^3(x - 5) + x(7x - 5) + 6 = 0
(x^3 - 7x^2 + 5x) + (6 - 5x) = 0
x(x^2 - 7x + 5) - (5x - 6) = 0
x(x - 5)(x - 1) - (5x - 6) = 0
x(x - 5)(x - 1) = 5x - 6
x^3 - 6x^2 + 10x - 6 = 5x - 6
x^3 - 6x^2 + 5x = 0
x(x^2 - 6x + 5) = 0
x(x - 1)(x - 5) = 0
Therefore, the solutions to the equation x^4 - 5x^3 + 7x^2 - 5x + 6 = 0 are x = 0, x = 1, x = 5.
A cylinder has a height of 18 inches and a diameter of 40 inches. What is its volume? Use ≈ 3.14 and round your answer to the nearest hundredth.
Answer:
≈226.1947
Step-by-step explanation:
have a great day and thx for your inquiry :)
On monday 5/8 inches of rain fell in 2/3 hour. What is the value of the excretion?
The value of the excretion is equal to 15 / 16 inches of precipitation per hour.
How to find the value of the excretion
In this question we find that a precipitation of 5 / 8 inches of rain is registered in a time of 2 / 3 hour and we are asked to find how many precipitation is registered in a time of an hour, that is, the value of the excretion. The excretion can be found by cross multiplication:
r = (5 / 8 in) / (2 / 3 h)
r = 15 / 16 in / h
A precipitation of 15 / 16 inches in a time of an hour is the value of the excretion.
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two people leave their shared apartment at the same time. during a 500 second interval, one jogs 10 blocks south at a constant rate, whereas the second walks 5 blocks west, again, at a constant rate. what is their speed relative to each other during this interval? assume each block corresponds to 100 meters.
The relative speed between the jogger and the walker during the 500 second interval is 2.24 m/s.
To solve this problem, we need to first find the distances traveled by each person.
The jogger travels 10 blocks x 100 meters/block = 1000 meters south.
The walker travels 5 blocks x 100 meters/block = 500 meters west.
Using the Pythagorean theorem, we can find the distance between them: √((1000m)² + (500m)²) = 1118.03 meters.
To find their relative speed, we divide this distance by the time interval: 1118.03 meters / 500 seconds = 2.24 m/s.
Therefore, their speed relative to each other during this interval is 2.24 m/s.
The jogger traveled 1000 meters south, while the walker traveled 500 meters west. Using the Pythagorean theorem, the distance between them is 1118.03 meters. Dividing this distance by the time interval of 500 seconds, we get their relative speed, which is 2.24 m/s.
: The relative speed between the jogger and the walker during the 500 second interval is 2.24 m/s.
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A person who owns a 2/3 of a land sells 1/4 of it express the land sold as a fraction of the whole land
If a person owns 2/3 of a land and sells 1/4 of it, the fraction of the whole land sold can be expressed as 1/4 divided by 2/3.
To divide fractions, we invert the second fraction and multiply. Therefore, we have:
1/4 ÷ 2/3 = 1/4 × 3/2 = 3/8
So, the fraction of the whole land sold is 3/8. This means that the person has 2/3 - 3/8 = 5/24 of the original land remaining after selling 1/4 of it.
To see why this is the case, we can visualize the original land as a pie chart. If the person owns 2/3 of the land, then 1/3 of the land belongs to someone else. If the person sells 1/4 of their share, they are effectively selling 1/4 of 2/3 of the land, or 2/12 of the land. This represents a portion of the pie chart that is 2/12 of the total pie, or 1/6. Therefore, the person now owns 5/6 of the pie chart, or 5/24 of the original land.
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A radio station runs a promotion at an auto show with a money box with 13 $50 tickets, 11$25 tickets, and 11$5 tickets. The box contains an additional 20 "dummy" tickets with no value. Three tickets are randomly drawn. Find the probability that exactly two $50 prizes and no other money winners are chosen
The probability of choosing exactly two $50 tickets and no other money winners is:
34,320 / 21,455 ≈ 0.
we can use the hypergeometric probability distribution to solve this problem, since we are drawing without replacement from a finite population of tickets with different values.
the total number of tickets in the box is:
13 + 11 + 11 + 20 = 55
the number of ways to choose exactly two $50 tickets from the 13 available is:
${13 \choose 2} = 78$
the number of ways to choose one dummy ticket from the 20 available is:
${20 \choose 1} = 20$
the number of ways to choose one ticket from the remaining non-$50 tickets is:
11 + 11 = 22
, the total number of ways to choose exactly two $50 tickets and no other money winners is:
78 x 20 x 22 = 34,320
the number of ways to choose any three tickets from the 55 available is:
${55 \choose 3} = 21,455$ 60 or about 60%
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Explain step by step
Answer:
buying price = $11764.70
Step-by-step explanation:
selling price = $10000
loss = 15%
85% = 10000
100% = 10000/85 × 100
= $ 11764.70
The radius of a basketball is 9 inches. What is the volume of the basketball? Round to the nearest tenth.
By definition of volume of sphere, The volume of the basketball is,
V = 3052.08 inches³
We have to given that;
The radius of a basketball is 9 inches.
Since, We know that;
To multiply means to add a number to itself a particular number of times. Multiplication can be viewed as a process of repeated addition.
And, We know that;
Volume of sphere = 4/3πr³
Where, r is radius of sphere.
And, pi is stand for 3.14.
Hence, We get;
The volume of the basketball is,
⇒ V = = 4/3πr³
Substitute radius (r) = 9 inches, pi = 3.14 in above equation, we get;
⇒ V = 4/3 × 3.14 × 9³ inches³
⇒ V = 4/3 × 3.14 × 243 inches³
⇒ V = 3052.08 inches³
Therefore, The volume of the basketball is,
⇒ V = 3052.08 inches³
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plot points H I and J on the coordinate plane
In order to plot points H I and J on the coordinate planeIdentify the x-coordinate and y-coordinate of each point (H, I, and J). For example, let's say the coordinates are as follows:
Point H: (xH, yH)
Point I: (xI, yI)
Point J: (xJ, yJ)
How to explain the informationLocate the origin (0, 0) on the coordinate plane. This is the starting point for plotting any point.
Move along the x-axis according to the x-coordinate of each point. If the x-coordinate is positive, move to the right; if it's negative, move to the left. Mark a point on the x-axis at the appropriate location.
Move along the y-axis according to the y-coordinate of each point. If the y-coordinate is positive, move upward; if it's negative, move downward. Mark a point on the y-axis at the appropriate location.
The point where the x and y axes intersect is the location of the point. Mark that point on the coordinate plane.
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How to Plot points H I and J on the coordinate plane
Use the drop-down menus to choose steps in order to correctly solve
4k−6=−2k−16−2
for k
.
Answer:
-6
Step-by-step explanation:
4k-6=2k-16-2
-16-2= -18
4k-6=2k-18
+6= +6 from both sides
4k=2k-12
-2k = -2k from both sides
2k = -12
/2 /2
k= -6
The figure shows △GHJ and △PQR on a coordinate plane.
a. Explain why the triangles are congruent using the ASA Triangle Congruence Theorem.
b. Explain why the triangles are congruent using rigid motions
Using the ASA Triangle Congruence Theorem, we can prove that triangles GHJ and PQR are congruent because they have Angle G and angle P are congruent, both being right angles.
The two triangles are congruent by rigid motions.
Using the ASA Triangle Congruence Theorem, we can prove that triangles GHJ and PQR are congruent because they have:
Angle G and angle P are congruent, both being right angles.
Side GH and side PQ are congruent, both having a length of 5 units.
Angle H and angle Q are congruent, both having a measure of 63.43 degrees (rounded to two decimal places).
Since the two triangles have two congruent angles and a congruent side between them, they are congruent by the ASA Triangle Congruence Theorem.
b. We can also prove that triangles GHJ and PQR are congruent using rigid motions.
Specifically, we can use a translation followed by a reflection to map triangle GHJ onto triangle PQR.
Translation: We can translate triangle GHJ 2 units to the left and 3 units down to get triangle G'H'J', where G'(-2, 1), H'(-2, -2), and J'(2, -2).
Reflection: We can reflect triangle G'H'J' across the x-axis to get triangle PQR, where P(-2, -4), Q(-2, -1), and R(2, -1).
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I need to know everything
The values of x, y and z in the parallelogram 1 are x = 80, y = 100 and z = 80
Parallelogram 2: x = 130, y = 130 and z = 130 Parallelogram 3: x = 90, y = 60 and z = 60 Parallelogram 4: x = 100, y = 80 and z = 80Parallelogram 5: x = 28 , y = 112 and z = 28 Finding the values of x, y and z in the parallelogramsParallelogram 1
Adjacent angles of a parallelogram add up to 180
So, we have
x = 180 - 100
x = 80
Opposite angles are equal
So, we have
y = 100
z = 80
Using the above theorem, we have the values of x, y and z in the other parallelograms to be
Parallelogram 2
x = 180 - 50
x = 130
y = 130
z = 130 --- by corresponding angle theorem
Parallelogram 3
x = 90 --- by vertical angle theorem
Then, we have
y = 60 --- sum of angles in a triangle
z = 60 --- by corresponding angle theorem
Parallelogram 4
x = 100
y = 80
z = 80 --- by corresponding angle theorem
Parallelogram 5
y = 112
x = 180 - 112 - 40 --- sum of angles in a triangle
x = 28
z = 28 --- by corresponding angle theorem
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pls help me im begging
The surface area of the triangular prism in square meters is:
549.15 m²
How to find the surface area of triangular prism?The total surface area of the given prism would be the sum of the areas of the individual faces that make up the prism.
The formula for area of a triangle is:
Area = ¹/₂ * base * height
The formula for area of a rectangle is:
Area = Length * width
Thus:
Total surface area of prism is:
TSA = (15 * 13) + (15.81 * 15) + 2(¹/₂ * 9 * 13)
TSA = 549.15 m²
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smith is in jail and has 3 dollars; he can get out on bail if he has 8 dollars. a guard agrees to make a series of bets with him. if smith bets a dollars, he wins a dollars with probability .4 and loses a dollars with probability .6. find the probability that he wins 8 dollars before losing all of his money if
Therefore, the probability that Smith wins 8 dollars before losing all of his money is approximately 0.0479.
To solve this problem, we can use a probability tree diagram to visualize the different possible outcomes.
At each stage, Smith either wins a dollars or loses a dollars, until he either reaches 8 dollars (and wins) or 0 dollars (and loses). We can calculate the probability of each outcome by multiplying the probabilities of the branches leading to that outcome.
Starting with 3 dollars, there are two possible outcomes:
Smith wins a dollar with probability 0.4, leaving him with 4 dollars.
Smith loses a dollar with probability 0.6, leaving him with 2 dollars.
From 4 dollars, there are three possible outcomes:
Smith wins a dollar with probability 0.4, leaving him with 5 dollars.
Smith loses a dollar with probability 0.6, leaving him with 3 dollars.
Smith wins 4 dollars with probability 0.4 * 0.4 = 0.16, leaving him with 7 dollars.
From 5 dollars, there are two possible outcomes:
Smith wins a dollar with probability 0.4, leaving him with 6 dollars.
Smith wins 3 dollars with probability 0.4 * 0.4 = 0.16, leaving him with 8 dollars.
From 6 dollars, there are two possible outcomes:
Smith wins 2 dollars with probability 0.4 * 0.4 = 0.16, leaving him with 8 dollars.
Smith loses a dollar with probability 0.6, leaving him with 5 dollars.
From 7 dollars, there is one possible outcome:
Smith wins 1 dollar with probability 0.4, leaving him with 8 dollars.
Therefore, the probability that Smith wins 8 dollars before losing all of his money is the sum of the probabilities of the outcomes that lead to winning 8 dollars, which is:
0.4 * 0.6 * 0.4 * 0.4 + 0.4 * 0.6 * 0.4 * 0.6 * 0.4 + 0.4 * 0.6 * 0.4 * 0.4 * 0.6 * 0.16 + 0.4 * 0.6 * 0.4 * 0.4 * 0.4 * 0.4 * 0.16 = 0.047872
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After heating up in a teapot, a cup of hot water is poured at a temperature of
20
3
∘
203
∘
F. The cup sits to cool in a room at a temperature of
6
9
∘
69
∘
F. Newton's Law of Cooling explains that the temperature of the cup of water will decrease proportionally to the difference between the temperature of the water and the temperature of the room, as given by the formula below:
�
=
�
�
+
(
�
0
−
�
�
)
�
−
�
�
T=T
a
+(T
0
−T
a
)e
−kt
�
�
=
T
a
= the temperature surrounding the object
�
0
=
T
0
= the initial temperature of the object
�
=
t= the time in minutes
�
=
T= the temperature of the object after
�
t minutes
�
=
k= decay constant
The cup of water reaches the temperature of
18
5
∘
185
∘
F after 1.5 minutes. Using this information, find the value of
�
k, to the nearest thousandth. Use the resulting equation to determine the Fahrenheit temperature of the cup of water, to the nearest degree, after 4.5 minutes.
Enter only the final temperature into the input box.
The temperature of the water after 4.5 minutes is approximately 153°F.
How to find the Fahrenheit temperature of the cup of water, to the nearest degree, after 4.5 minutes.Using Newton's Law of Cooling to find the value of the decay constant k: T = [tex]Ta + (T0 - Ta) * e^-k*t[/tex]
Substituting the given values, we get:
185 = [tex]69 + (203 - 69) * e^-k*1.5[/tex]
Simplifying, we get:
[tex]116 = 134 * e^ \\^{-1.5k}[/tex]
Dividing both sides by 134, we get:
[tex]0.8657 = e^{-1.5k}[/tex]
Taking the natural logarithm of both sides, we get:
ln(0.8657) = -1.5k
Solving for k, we get:
k ≈ 0.232
Therefore, the value of the decay constant is approximately 0.232.
To find the temperature of the water after 4.5 minutes, we can use Newton's Law of Cooling again, with t = 4.5:
[tex]T = Ta + (T0 - Ta) * e^-k*t[/tex]
[tex]T = 69 + (203 - 69) * e^-0.232*4.5[/tex]
T ≈ 153°F
Therefore, the temperature of the water after 4.5 minutes is approximately 153°F.
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425 divided by 6 so i get the answer of 7.833333333 and so on but that answer is wrong i don’t understand how
The solution of expression after divide is, 70.83333...
We have to give that,
Divide 425 by 6.
Now, Divide the numbers as,
425 ÷ 6
6 ) 425 ( 70.833
- 42
--------
050
- 48
-----------
20
- 18
--------
20
- 18
----------
2
Hence, The solution of expression after divide is, 70.83333...
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TANK A large tank is currently holding 12,000 gallons of water. The water will drain at a constant rate of 100 gallons per minute until the volume of water in the tank is 4,000 gallons. Write an equation to find the number of minutes m it will take for the specified amount of water to drain.
The equation to find the number of minutes m is 12000 - 100m = 4000
Writing an equation to find the number of minutes mFrom the question, we have the following parameters that can be used in our computation:
Initial volume = 12000 gallons
Rate of draining = 100 gallons per minute
Final volume of water = 4000 gallons
The equation to find the number of minutes m is represented as
f(m) = Initial volume - Rate of draining * m
So, we have
f(m) = 12000 - 100m
When the volume is at 4000 gallons, we have
12000 - 100m = 4000
Hence, the equation to find the number of minutes m is 12000 - 100m = 4000
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Calculate the length of AC to 1 decimal place
The length of AC by the given data is about 11.0 cm.
We are given that;
ABCD is a trapezium AB=16cm, AD=11cm, BC=4cm
Now,
We can use these values to find DC. Since ABCD is a trapezium, we know that AB and DC are parallel. Therefore, the distance between them is constant. We can write:
AB−BC=AD−DC
Plugging in the given values, we get:
16−4=11−DC
Solving for DC, we get:
DC=11−12=−1
We can ignore the negative sign since we are only interested in the length of DC. So, DC = 1 cm.
Now we can plug in AD = 11 cm and DC = 1 cm into the Pythagorean theorem and get:
AC2=112+12
AC2=122
Taking the square root of both sides, we get:
AC=122≈11.045
Rounding to one decimal place, we get:
AC≈11.0 cm
Therefore, by algebra the answer will be 11.0 cm.
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which construction is being demonstrated? your answer: constructing a perpendicular bisector. constructing a line perpendicular to a line through a point not on the line. constructing a line parallel to a line through a point not on the line. constructing a line perpendicular to a line through a point on the line.
The construction being demonstrated is constructing a perpendicular bisector.
In this construction, a line is drawn to bisect a given line segment and is perpendicular to that line segment. The perpendicular bisector divides the line segment into two equal parts and creates a right angle at the point of intersection. It is useful in various geometric constructions and applications, such as finding the midpoint of a line segment or constructing equilateral triangles. By constructing a perpendicular bisector, we ensure that the distances from any point on the line to the endpoints of the line segment are equal.
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Isabell run 7 miles in 80 minutes at the same rate how many miles would she run in 64 minutes
Determine which of the following statements is true for the function g(z) = 4x³ - 3r + 2r³ - 1.
A
(В
D
As x→ ∞o, f(x) → ∞o and as x→→∞, f(x)→-00.
As x → ∞o, f(x) → ∞o and as x→-∞, f(x)→ 00.
As x→ ∞o, f(x)--∞o and as x→-∞, f(x) →∞0.
As x→ ∞, f(x)-- and as x→-∞, f(x)→-00.
The correct statement is:
As x → ∞, f(x) → ∞ and as x → -∞, f(x) → -∞.
I understand that you are asking about the behavior of the function g(z) as x approaches positive and negative infinity. Let's analyze the given function:
g(z) = 4x³ - 3r + 2r³ - 1
First, I believe "r" should be "x" to keep the variables consistent. So, the corrected function is:
g(x) = 4x³ - 3x + 2x³ - 1
Now, let's find the end behavior of this function as x approaches positive and negative infinity.
As x → ∞:
The highest degree term, x³, will dominate the function's behavior. The coefficients for x³ are 4 and 2, so the function will behave like 6x³. Since this term is positive and has an odd exponent, as x → ∞, f(x) → ∞.
As x → -∞:
Again, the x³ term will dominate the function's behavior. Since the exponent is odd, as x → -∞, f(x) → -∞.
So, the correct statement is:
As x → ∞, f(x) → ∞ and as x → -∞, f(x) → -∞.
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