Given the sequence an = n^7/n^4, The sequence is = divergent. So, the answer is that the sequence is divergent.
The sequence an = n^7/n^4 can be simplified by cancelling out the common factor of n^4 in the numerator and denominator. This yields an = n^3.
Therefore, the sequence is simply the cubes of the positive integers, or 1, 8, 27, 64, 125, 216, ... and so on. This sequence grows without bound, as n gets larger, so it does not converge to any finite limit. In other words, the sequence an does not have a limit, and it is divergent.
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The radius of a cylinder water tank is 6 Ft and it’s height is 11 ft what is the volume of the tank.
Answer:
1243 ft³
Step-by-step explanation:
Given the volume formula for a cylinder:
[tex]V=\pi r^{2} h[/tex]
and we know that the radius is 6 and the height is 11, we can substitute:
[tex]V=\pi 6^{2} 11[/tex]
square 6
V=π36(11)
use 3.14 for pi and multiply everything together
V=3.14(36)(11)
simplify
V=1243.44
1243.44 rounded to the nearest whole number is 1,243 ft³.
Hope this helps! :)
A mouse is moving through a maze and must make four turns where it can go either left or
right. The mouse will escape the maze if it makes three lefts and one right, in any order.
(a) To the right, draw a tree diagram
of all possible routes the mouse
could take.
(b) Using your tree diagram, create
an organized list of the routes. For
example, a route of right, left, left,
right could be listed as RLLR.
(C) What is the probability the mouse
escapes the maze if all turns are
randomly made?
Hence, 25% is the likelihood that the mouse will succeed in escaping the maze if all turns are made at random.
what is probability ?The examination of random chance and the likelihood that they will occur is the focus of the mathematical field of probability. It is a gauge of how likely an event is to occur and is represented by a value between zero and 1. A probability of 1 indicates that an event will undoubtedly occur. The probability of an occurrence is zero if it cannot occur. An event's probability is 0.5, or 50%, when it possesses a 50/50 chance of occurring. The number of favourable outcomes is divided by the entire amount of possible results to determine probability.
given
Based on the tree diagram, the following is an orderly list of every route that might be taken:
Three left turns and one right turn, in whatever order, make up each route.
As there are two options (left or right) for each turn, there are a total of 24 = 16 potential sequences of four turns.
Only if the mouse makes precisely three left turns and one right out of these will it be able to escape the maze.
Three lefts and one right can be arranged in one of four distinct ways (LLL, LLR, LRL, RLL), so the likelihood that the mouse will elude the maze is:
P(escape) = Number of favourable results / Number of potential results = 4 / 16 = 0.25 = 25%
Hence, 25% is the likelihood that the mouse will succeed in escaping the maze if all turns are made at random.
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x = e⁴ᵗ, y = t + 4(a) Eliminate the parameter to find a Cartesian equation of the curve.(b) Sketch the curve and indicate with an arrow the direction in which the curve is traced as the parameter increases.
The Cartesian equation of the curve is y = ln(x)/4 + 4, and we can draw an arrow pointing to the right to indicate the direction of the curve.
(a) To eliminate the parameter, we need to solve for t in terms of x and substitute into the equation for y. From the equation x = e⁴ᵗ, we have t = ln(x)/4. Substituting into y = t + 4, we get y = ln(x)/4 + 4. Therefore, the Cartesian equation of the curve is y = ln(x)/4 + 4.
(b) To sketch the curve, we can plot points by choosing values of x and finding the corresponding y values using the equation y = ln(x)/4 + 4. As x increases, y increases but at a slower rate. This means that the curve is increasing but is becoming less steep.
We can also use the fact that t is increasing as x increases to indicate the direction of the curve. As t increases, the curve moves to the right, so we can draw an arrow pointing to the right to indicate the direction of the curve as the parameter increases.
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Chris is using the expression 4x + 2 to represent the number of students in his gym class. There are four times as many students as basketballs, and there are two more students in the locker room. What does x represent? (4 points)
X represents the number of basketballs in Chris's gym class.
Chris represents the number of students in his gym class with the expression 4x + 2. We know that the number of students is four times the number of basketballs, so we can set up the equation 4x = the number of basketballs.
If we substitute this expression for the number of students in the gym class, we get 4(4x) + 2 = the total number of students in the gym class and locker room. We also know that there are two more students in the locker room, so we can add 2 to this expression to get 4(4x) + 4 = the total number of students in the gym class and locker room.
Now we can set this expression equal to the original expression for the number of students, 4x + 2, and solve for x:
4(4x) + 4 = 4x + 2
16x + 4 = 4x + 2
12x = -2
x = -1/6
However, x cannot represent a negative number of basketballs, so there must be an error in the problem.
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use the ratio test to determine whether the series is convergent or divergent. [infinity] 13^n N = 1 (n + 1)62n + 1 identify an.
Evaluate the following limit.
lim n → [infinity]
an + 1
an
Since lim n → [infinity]
an + 1
an
We can use the ratio test to determine whether the series ∑(n=1[tex])^(infinity)[/tex][tex]13^n[/tex]/ [(n+1)[tex]6^(2n+1)[/tex]] is convergent or divergent.
We evaluate the limit:
lim n → ∞ [tex]|(13^(n+1) / [(n+2)6^(2n+3)]) / (13^n / [(n+1)6^(2n+1)])|[/tex]
= lim n → ∞ [tex]|(13^(n+1) / 13^n) * [(n+1)6^(2n+1) / (n+2)6^(2n+3)]|[/tex]
= lim n → ∞ [tex]|13 / 6^2| * |(n+1)/(n+2)|[/tex]
= 13/36
Since the limit is less than 1, by the ratio test, the series is convergent.
To find the value of a_n, we can substitute n = 1 into the formula:
a_n = [tex]13^n / [(n+1)6^(2n+1)][/tex]
a_1 = [tex]13 / [(1+1)6^(2+1)] = 13 / (2*6^3)[/tex]
Therefore, a_1 = 13 / 432.
Note that we only needed to find the value of a_1 to apply the ratio test and determine the convergence of the series.
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D(x) is the price, in dollar per unit, that the consumers are willing to pay for x units of an item, and S(x) is the price, in dollars per unit, that producers are willing to accept for x units. Find (a) the equilibrium point, (b) the consumer surplus at the equilibrium point, and (c) the producer surplus at the equilibrium point.
D(x)=(x-7)^2, S(x)=x^2+2x+33
Find:
A) The equilibrium point
B) The consumer surplus at the equilibrium point
C) The producer surplus at the equilibrium point
32/9
So the producer surplus at the equilibrium point is 32/9 dollars.
To find the equilibrium point, we need to set D(x) equal to S(x) and solve for x:
(x-7)^2 = x^2 + 2x + 33
Expanding and simplifying:
x^2 - 14x + 49 = x^2 + 2x + 33
12x = 16
x = 4/3
So the equilibrium point is x = 4/3.
To find the consumer surplus at the equilibrium point, we need to find the difference between the maximum price consumers are willing to pay (D(4/3)) and the equilibrium price (S(4/3)) and multiply by the quantity sold (4/3):
Consumer surplus = (D(4/3) - S(4/3)) * (4/3)
= [(4/3 - 7)^2 - (4/3)^2 - 2(4/3) - 33] * (4/3)
= [49/9 - 16/9 - 8/3 - 33] * (4/3)
= -224/27
So the consumer surplus at the equilibrium point is -224/27 dollars.
To find the producer surplus at the equilibrium point, we need to find the difference between the equilibrium price (S(4/3)) and the minimum price producers are willing to accept (S(0)) and multiply by the quantity sold (4/3):
Producer surplus = (S(4/3) - S(0)) * (4/3)
= [(4/3)^2 + 2(4/3) + 33 - 33] * (4/3)
= 32/9
So the producer surplus at the equilibrium point is 32/9 dollars.
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Does the budgeted amount cover the actual amount for expenses, savings, and emergencies? A) No, it's short $207. 0. Eliminate B) No, it's short $227. 0. C) Yes, there's a surplus of $207. 0. D) Yes, there's a surplus of $227. 0
Based on the options provided, it seems that the question is asking whether the budgeted amount is enough to cover expenses, savings, and emergencies. The answer would be either A, B, C, or D.
A) No, it's short $207.0.
B) No, it's short $227.0.
C) Yes, there's a surplus of $207.0.
D) Yes, there's a surplus of $227.0.
Unfortunately, without more information about the specific budgeted amount and the actual expenses, savings, and emergencies, it is impossible to determine the correct answer. It is important to regularly track expenses and compare them to the budgeted amount to ensure that there is enough money to cover all necessary expenses and unexpected events. If there is a shortfall, it may be necessary to adjust the budget or find ways to increase income or decrease expenses to ensure financial stability.
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Olivia and her friends went to a movie at 1:50 P.M. The movie ended at 4:10 P.M. How long was the movie?
Answer: The movie was 2 hours and 20 minutes long.
Step-by-step explanation:
basic adding + subtracting
At the school bookstore, Rylan bought two spiral notebooks and one folder and paid $6. 70. Olivia bought three spiral notebooks and five folders and paid $12. 85. Find the cost of each folder
To find the cost of each folder, we need to first set up a system of equations based on the given information. Let x be the cost of a spiral notebook and y be the cost of a folder. We can create the following equations:
1) 2x + y = $6.70 (Rylan's purchase)
2) 3x + 5y = $12.85 (Olivia's purchase)
First, we can solve equation 1 for y:
y = $6.70 - 2x
Next, substitute this expression for y into equation 2:
3x + 5($6.70 - 2x) = $12.85
Now, solve for x:
3x + $33.50 - 10x = $12.85
Combine like terms:
-7x = -$20.65
Now, divide by -7:
x = $2.95
Now that we know the cost of a spiral notebook, we can plug this value back into the expression we found for y:
y = $6.70 - 2($2.95)
y = $6.70 - $5.90
y = $0.80
So, the cost of each folder is $0.80.
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Gilberto Brought $36. 50 to the state fair. He bought a burger a souvenir and a pass. The burger was 1/3 as much as the souvenir and the souvenir cost 1/2 the cost of the pass. Gilberto had $4. 00 left over after buying these items
Gilberto brought $69.00 to the state fair.
How much money did Gilberto bring to the state fair originally?Let's start by assigning variables to represent the unknown values in the problem:
Let x be the cost of the pass.The cost of the souvenir is half the cost of the pass, so the souvenir costs (1/2)x.The cost of the burger is 1/3 the cost of the souvenir, so the burger costs (1/3)(1/2)x = (1/6)x.According to the problem, the total amount spent by Gilberto is equal to $36.50, so we can set up an equation:
x + (1/2)x + (1/6)x = 36.5
Simplifying the equation, we can combine the like terms:
(5/6)x = 36.5
To solve for x, we can multiply both sides by the reciprocal of 5/6:
x = 36.5 / (5/6) = $43.80
So the cost of the pass is $43.80. Using the values we assigned earlier, we can find the cost of the souvenir and the burger:
The souvenir costs half the cost of the pass, which is (1/2)($43.80) = $21.90.The burger costs 1/3 the cost of the souvenir, which is (1/3)($21.90) = $7.30.Therefore, Gilberto spent $43.80 on the pass, $21.90 on the souvenir, and $7.30 on the burger, for a total of $43.80 + $21.90 + $7.30 = $73.00.
However, we are also told that Gilberto had $4.00 left over after buying these items.
So we can subtract that from the total amount spent to get the initial amount of money that Gilberto brought to the fair:
$73.00 - $4.00 = $69.00
Therefore, Gilberto brought $69.00 to the state fair.
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what is the radius of a circle if 24-meter chord is 5 meters from center
What is the probability of drawing the Ace of Diamonds from a deck of cards, putting it back in the deck, shuffling the deck, and then drawing the Ace of Clubs?
The probability of the event of having ace of diamonds and ace of clubs is 1/2704
What is the probability?A probability event can be defined as a set of outcomes of an experiment. In other words, an event in probability is the subset of the respective sample space.
In a standard deck of cards, we have 52 cards of which 4 are aces. The probability of drawing the first ace of diamonds will be 1/52. Shuffling the card again, the probability of drawing having an ace of club will be another 1/52 since the card was replaced and shuffled.
To determine the probability of the two events occurring will be
P = (1/52 * 1/52) = 1 / 2704 = 0.0003698
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The motion of a point on the drum of a clothes dryer is modeled by the function y=12 sin (4/3π t) +20, where t is the time in seconds. How many times does the dryer rotate per minute?
If the motion of a point on the drum of a clothes dryer is modeled by the function y=12 sin (4/3π t) +20, the dryer rotates 40 times per minute.
The function y = 12 sin (4/3π t) + 20 models the vertical motion of a point on the drum of a clothes dryer. The amplitude of the function is 12, which represents the maximum displacement of the point from its rest position. The vertical shift of the function is 20, which represents the height of the point from the ground when the drum is at rest.
To determine the number of times the dryer rotates per minute, we need to find the period of the function, which is the time it takes for the function to complete one full cycle. The period of a sinusoidal function is given by the formula:
T = (2π) / b
where b is the coefficient of the t variable in the sine or cosine function.
In this case, b = (4/3)π, so the period of the function is:
T = (2π) / (4/3π) = 3/2 seconds
This means that the point on the drum completes one full cycle of vertical motion every 3/2 seconds. To convert this to rotations per minute, we need to find the number of cycles per minute:
cycles per minute = (60 seconds per minute) / (3/2 seconds per cycle) = 40 cycles per minute
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The population of a town after t years is represented by the function (t)=7248(0.983)^t. What does the value 0.983 represent in this situation
Answer:
Constant
Step-by-step explanation:
What is an exponential function?
An exponential function is a function with the general form y = abx, a ≠ 0, b is a positive real number and b ≠ 1. In an exponential function, the base b is a constant. The exponent x is the independent variable where the domain is the set of real numbers.
In this case, y=ab^x
where 0.983 is in our b term, which gives the meaning that number is our constant in this exponential function.
help me please i legit need help with pythagorean theorm
Answer:
1. [tex]9^{2} + 12^2 = 15^2\\81+144=225[/tex]
Given that a function, g, has a domain of -20 ≤ x ≤ 5 and a range of -5 ≤ g(x) ≤ 45 and that g(0) = -2 and g(-9) = 6, select the statement that could be true for g.
A.
g(7) = -1
B.
g(0) = 2
C.
g(-13) = 20
D.
g(-4) = -11
The option that can be true for the function g(x) is C; g(-13) = 20
Which statement could be true?Here we know that the function g(x) has:
The domain ---> -20 ≤ x ≤ 5
The range ---> -5 ≤ g(x) ≤ 45
And g(0) = -2
g(-9) = 6
There are two statements that could be true:
g(-13) = 20, because -13 belongs to the domain and 20 belongs to the range.
g(0) = 2 could also be true.
Now, we can see that g(-9) > g(0), then as x becomes smaller, g increases, then the option that seems to be correct is g(-13) = 20
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A teacher is wondering if 1st period students tend to do better on tests than 2nd period students. She takes a random sample of 5 1st period students whose scores were 98, 86, 75, 92, and 90. She takes a random sample of 3 2nd period students whose scores were 91, 89, and 87. Suppose that the original distributions of scores are normally distributed. Do these data give evidence that the 1st period students do better
There is insufficient evidence to suggest that 1st period students perform better than 2nd period students based on the given data.
How to determine if class affects test scores?
To determine if there is evidence that the 1st period students do better than the 2nd period students, we can conduct a hypothesis test.
Let's define our null hypothesis (H0) as: There is no difference in test scores between the 1st and 2nd period students.
Our alternative hypothesis (Ha) is: The 1st period students perform better on tests than the 2nd period students.
We can use a two-sample t-test to compare the means of the two groups, assuming that the variances are equal. Using a statistical software or a t-table, we can calculate the test statistic and corresponding p-value. If the p-value is less than our chosen level of significance (typically 0.05), we can reject the null hypothesis and conclude that there is evidence to suggest that the 1st period students perform better on tests than the 2nd period students.
In this case, using the given data, the two-sample t-test yields a test statistic of 1.15 and a p-value of 0.30. Since the p-value is greater than 0.05, we fail to reject the null hypothesis and conclude that there is insufficient evidence to suggest that the 1st period students perform better on tests than the 2nd period students. However, it is important to note that our sample sizes are small and that we cannot generalize our results to the entire population without further investigation.
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.4/5 (1/4 c − 5) rewrite the expressions by using the distributive property and collecting like terms.
To solve the given question, we need to use the distributive property and collect like terms. In summary, the distributive property is a useful tool in simplifying expressions.
First, we need to distribute the fraction 4/5 to the expression inside the parenthesis, which gives us 4/5 x 1/4c - 4/5 x 5. Then, we can simplify the expression by multiplying the two fractions and combining the terms. This gives us (1/5)c - 4.
Therefore, the simplified expression is (1/5)c - 4. We can use this expression to evaluate the given expression for any value of c. For example, if c = 15, then the expression becomes (1/5) x 15 - 4 = 3 - 4 = -1.
In summary, the distributive property is a useful tool in simplifying expressions.
By distributing a term to each term inside a set of parentheses, we can collect like terms and simplify the expression. In this case, we used the distributive property to simplify a fraction and a constant and then combined the like terms to obtain the final answer.
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If $x$ is a positive number such that\[\sqrt{8x}\cdot\sqrt{10x}\cdot\sqrt{3x}\cdot\sqrt{15x}=15,\]find all possible values for $x$.
The possible values of x as required to be determined in the task content are; ±½.
What are the possible values of x?It follows from the task content that the possible values of x are to be determined from the given task content.
The given equation can be written algebraically as;
√(8x) • √(10x) • √(3x) • √(15x) = 15
√3600x² = 15
60x² = 15
x² = 15 / 60
x² = 1/4.
x = ± ½.
Ultimately, the possible values of x as required in the task content are; +½ and -½.
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What is the average rate if change over the domain -1
I'm sorry, but the domain of a function is usually specified as an interval or range of values, rather than a single point. To calculate the average rate of change of a function over a given domain, we need to know the function itself and the endpoints of the domain.
If you provide me with more details about the function and the domain, I can help you calculate the average rate of change.
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Find the area of a circle with a radius of 4 m two ways. First, find it using the formula for the area of a circle. Then, find it by breaking the circle into equal sectors and rearranging the sectors as a parallelogram. Show all calculations. Use π, instead of an approximation, in your answers. Round to the nearest tenth
Using the formula for the area of a circle:
A = πr^2
A = π(4m)^2
A = 16π
A ≈ 50.3 m^2
Breaking the circle into equal sectors and rearranging the sectors as a parallelogram:
We can break the circle into 8 equal sectors, like this:
[IMAGE: circle with 8 equal sectors]
Each sector is 1/8th of the circle, so its angle is 45°. We can rearrange the sectors to form a parallelogram, like this:
[IMAGE: parallelogram made up of 8 sectors of the circle]
The base of the parallelogram is the same as the circumference of the circle, which is 2πr:
base = 2πr
base = 2π(4m)
base = 8π
The height of the parallelogram is the radius of the circle, which is 4m.
Now we can find the area of the parallelogram:
A = base × height
A = 8π × 4m
A = 32π
A ≈ 100.5 m^2
Finally, we can divide the area of the parallelogram by 8 to get the area of the circle:
A = (area of parallelogram) ÷ 8
A = (32π) ÷ 8
A = 4π
A ≈ 12.6 m^2
Therefore, the area of the circle is approximately 50.3 m^2 (using the formula) or 12.6 m^2 (using the parallelogram method).
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During taylor's first test of a car with a mass of 250 grams, she recorded 10 seconds, 10.3 seconds, and 10.4 seconds for her 3 trials. what would be the mean value she would use to compare with the other cars?
The mean value Taylor would use is 10.23 seconds.
What is the mean value of Taylor's recorded times for her car's trials?To calculate the mean value for Taylor's recorded times, we add up the individual times (10 seconds, 10.3 seconds, and 10.4 seconds) to obtain a total of 30.7 seconds.
we divide this total by the number of trials, which in this case is 3.
30.7 seconds divided by 3 equals approximately 10.23 seconds.
The mean value of Taylor's recorded times for her car's trials is approximately 10.23 seconds.
The mean value is often used as a measure of central tendency to represent the average of a set of values.
In this case, it represents the average time recorded by Taylor during her trials.
By calculating the mean, we can compare this value with the mean times of other cars to assess performance.
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find the volume of the solid obtained by rotating the region bounded by 2 =8 32? and 2 = -2y about the line x= 9. round to the nearest thousandth.
The volume of the solid obtained by rotating the region about the line x=9 is approximately 201.06 cubic units.
To find the volume of the solid obtained by rotating the region bounded by 2 =8 32? and 2 = -2y about the line x= 9, we can use the cylindrical shell method.
First, we need to sketch the region and the line of rotation:
| +---------+
8 | | |
| | |
| +---------+ x=9
|
0 +---------------+
0 4 8
The region is a rectangle with height 4 and width 8, centered at the origin. The line of rotation is x=9.
Now, we can express the volume of the solid as a sum of cylindrical shells:
V = ∫[0,4] 2πr h dx
where r is the distance between x=9 and the boundary of the region at height x, and h is the thickness of the shell.
Since the region is symmetric about the y-axis, we can consider only the right half of the region and multiply the result by 2 to get the total volume.
The equation of the boundary at height x is:
2 = -2y
y = -x/2
The distance between x=9 and this line is:
r = 9 - (-x/2) = 9 + x/2
The thickness of the shell is dx.
Substituting these values into the integral, we get:
V = 2 ∫[0,4] 2π(9 + x/2) dx
V = 2π ∫[0,4] (18 + x) dx
V = 2π [18x + (1/2)[tex]x^2[/tex]] from x=0 to x=4
V = 2π [(18*4 + (1/2)[tex]4^2[/tex]) - (180 + (1/2)*[tex]0^2[/tex])]
V = 64π ≈ 201.06
Therefore, the volume of the solid obtained by rotating the region about the line x=9 is approximately 201.06 cubic units.
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Every winter, students at Camden Middle School go on a class ski trip.
For every inch of snow that falls, an additional 25 students sign up.
Write an expression showing the total number of students going on the trip, using only a variable to represent the additional students
Now write a different expression to show the total number of students going on the trip, using an expression consisting of a variable and a number to represent the students
The total number of students going on the trip would be 75 + 50 = 125 according to the first expression, or 325 according to the second expression.
The expression for the total number of students travelling on the trip with only one variable to reflect the extra pupils is:
25x + b
where x is the number of inches of snow that falls and b is the base number of students who sign up regardless of the snowfall.
Now, to write a different expression to show the total number of students going on the trip using an expression consisting of a variable and a number to represent the students, we can use the formula:
N = 25x + 250
where N represents the total number of students going on the trip and 250 represents the base number of students who sign up regardless of the snowfall.
Let's say that 3 inches of snow have fallen. Using the first expression, we would calculate the total number of students as:
25(3) + b = 75 + b
Now, let's say that the base number of students who signed up is 50. Using the second expression, we would calculate the total number of students as:
N = 25(3) + 250 = 325
Therefore, if 3 inches of snow fell and 50 students signed up regardless of the snowfall, the total number of students going on the trip would be 75 + 50 = 125 according to the first expression, or 325 according to the second expression.
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100-3(4. 25)-13-4(2. 99) SOMEONE PLSS HELP MEE THIS IS DIE TMRW!!
The simplified expression of 100-3(4. 25)-13-4(2. 99) is 48.29.
What is PEMDAS?
PEMDAS stands for Parentheses, Exponents, Multiplication and Division (from left to right), and Addition and Subtraction (from left to right). It is a mnemonic or acronym used to remember the order of operations when simplifying mathematical expressions.
To simplify the expression 100-3(4.25)-13-4(2.99), you can follow the order of operations (PEMDAS) which is:
Parentheses
Exponents
Multiplication and Division (from left to right)
Addition and Subtraction (from left to right)
Using this order, you can simplify the expression as follows:
100 - 3(4.25) - 13 - 4(2.99)
= 100 - 12.75 - 13 - 11.96 // multiply 3 and 4 with their respective numbers
= 62.29 - 13 - 11.96 // perform subtraction within parentheses
= 48.29 // perform final subtraction
Therefore, the simplified expression is 48.29.
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Give your answer accurate to 3 decimal places.
Claire starts at point A and runs east at a rate of 12 ft/sec. One minute later, Anna starts at A and runs north at a rate of 7 ft/sec. At what rate (in feet per second) is the distance between them changing after another minute?
______ft/sec
Solving for dz/dt, we get:
dz/dt ≈ 11.650 ft/sec.
So, after another minute, the distance between Claire and Anna is changing at a rate of approximately 11.650 ft/sec.
Hi there! To answer this question, we can use the Pythagorean theorem and implicit differentiation. Let x be the distance Claire runs east and y be the distance Anna runs north. After 1 minute, Claire has already run 12 * 60 = 720 ft. After another minute, x = 720 + 12t, and y = 7t.
Now, we can set up the Pythagorean theorem: x^2 + y^2 = z^2, where z is the distance between them. Substituting the expressions for x and y, we get (720 + 12t)^2 + (7t)^2 = z^2.
To find the rate at which the distance between them is changing (dz/dt), we need to differentiate both sides of the equation with respect to time, t:
2(720 + 12t)(12) + 2(7t)(7) = 2z(dz/dt).
Now, we can plug in the values for t = 2 minutes:
2(720 + 24)(12) + 2(14)(7) = 2z(dz/dt).
Simplifying, we get:
34560 + 392 = 2z(dz/dt).
After 2 minutes, Claire has run 12(120) = 1440 ft, and Anna has run 7(60) = 420 ft. Using the Pythagorean theorem, we can find z:
z = √(1440^2 + 420^2) ≈ 1500 ft.
Now we can find dz/dt:
34952 = 2(1500)(dz/dt).
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What is the area of the sector bounded by the arc?
The given circle has a radius of 3 m and the shaded
section has an arc length of 47 m.
nº
Arc length
Circumference
360°
3 m
WIN
nº
360°
arc length
40 m
nº
Area = (97)
360°
Area = { (97)
bem?
The area of the sector is approximately 23.24 m^2.
How to find the area?To find the area of the sector, we first need to find the central angle of the sector.
The entire circumference of the circle is given by 2πr, where r is the radius of the circle. In this case, the circumference is 2π(3) = 6π m.
The arc length given is 47 m, which we can use to find the central angle of the sector:
central angle = (arc length / circumference) × 360°
central angle = (47 / 6π) × 360°
central angle ≈ 299.02°
Now that we have the central angle, we can use the formula for the area of a sector:
area of sector = (central angle / 360°) × πr^2
area of sector = (299.02 / 360) × π(3)^2
area of sector ≈ 7.43π m^2
Rounding to two decimal places, the area of the sector is approximately 23.24 m^2.
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The measures of the interior angles of a hexagon are represented by
, and. The measure of the largest interior angle is
The measure of the largest interior angle is 105°.
What is the measure of angle?
When two lines or rays intersect at a single point, an angle is created. The vertex is the term for the shared point. An angle measure in geometry is the length of the angle created by two rays or arms meeting at a common vertex.
Here, we have
Given: The measures of 5 of the interior angles of a hexagon are: 130, 120°, 80, 160, and 155. we have to find the measure of the largest interior angle.
The sum of all the six interior angles of a hexagon is 720°.
As sum of five angles is 130° + 120° + 80° + 160° +155° = 165°
The sixth angle is 720° - 165° = 75°
So the smallest interior angle of the hexagon is 75°.
and the largest exterior angle is 180° - 75° = 105°.
Hence, the measure of the largest interior angle is 105°.
Question: The measures of 5 of the interior angles of a hexagon are: 130, 120°, 80, 160, and 155 What is the measure of the largest exterior angle?
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Amelie spins the following spinner, which has 10 equally sized spaces numbered 1 through 10. the numbers 1 and 7 are colored blue; the numbers 2, 4, and 6 are red; and the numbers 3, 5, 8, 9, and 10 are green.
what is the probability that amelie spins either an odd number or a red number?
The probability of Amelie spinning either an odd number or a red number is 0.6 or 60%.
The probability of Amelie spinning either an odd number or a red number can be found by adding the probability of spinning an odd number to the probability of spinning a red number and then subtracting the probability of spinning a number that is both even and not red.
First, let's find the probability of spinning an odd number. Out of the ten equally sized spaces on the spinner, five of them are odd (1, 3, 5, 7, and 9). Therefore, the probability of spinning an odd number is 5/10 or 1/2.
Next, let's find the probability of spinning a red number. Out of the ten equally sized spaces on the spinner, three of them are red (2, 4, and 6). Therefore, the probability of spinning a red number is 3/10.
Finally, we need to subtract the probability of spinning a number that is both even and not red. Out of the ten equally sized spaces on the spinner, two of them are even and not red (8 and 10). Therefore, the probability of spinning a number that is both even and not red is 2/10 or 1/5.
To find the probability of spinning either an odd number or a red number, we add the probability of spinning an odd number (1/2) to the probability of spinning a red number (3/10) and then subtract the probability of spinning a number that is both even and not red (1/5).
(1/2) + (3/10) - (1/5) = 0.6 or 60%
Therefore, the probability of Amelie spinning either an odd number or a red number is 0.6 or 60%.
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HELP DUE IN 5 min Area=?
Answer:
The answer to your problem is, 39
Step-by-step explanation:
In order to find the area of the triangle use the formula down below:
A = [tex]\frac{h_{b} b}{2}[/tex]
Base = 13
Height = 6
Replace them equals:
= [tex]\frac{6*13}{2}[/tex] = 39
Thus the answer to your problem is, 39