2) A 0.3 kg ball is tied to a 1 m piece of string and spun so that it is moving in a horizontal circle as shown below. The angle measured between the vertical dashed line and the string is 20∘. Determine angular speed of the ball and tension in the string.
[ω=3.2rads−1 and T=3.1N]
10. Iodine is a non-polar diatomic molecule, yet its molecules have enough attraction for each other that the element exists as a solid at room temperature. Identify the attractive force and explain why it is strong enough to keep the molecules of I2 attached to each other even at room temperature.
The box plot represents the number of minutes customers spend on hold when calling a company.
Number of Minutes Spent on Hold What is the upper quartile of the data?
3
5
6
8
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The movement of the progress bar may be uneven because questions can be worth more or less (including zero) depending on your onswer.
How could you correctly rewrite the equation 4(5+3)=2(22−6) using the distributive property?
20+12=44−12
The data set below has a lower quartile of 13 and an upper quartile of 37 .
1,12,13,15,18,20,35,37,40,78 Which statement is true about any outliers of the data set?
The data set does not have any outliers.
The lowest value, 1 , is the only outlier.
The greatest value, 78 , is the only outlier.
Both 1 and 78 are outliers.
The triangle on the right is a scaled copy of the triangle on the left. Identify the scale factor. Express your answer as a fraction in simplest form. Answer Attempt 1 out of 20
78. If f(x)=ln(x) and g is a differentiable function with domain x>0 such that limx→∞g(x)=∞ and g′ has a horizontal asymptote at y=4 then limx→∞g(x)f(x) is
A. 0
B. -4
C. 4
D. nonexistent
2. How many ways can the letters of ALOHA be arranged if:
a) the A's must be together? (2 marks) AA -
4!=24
b) the A's cannot be together? (1 mark) A A 3!=□ 6
c) each arrangement must begin with a vowel and the consonants cannot be together? (2 marks)
A.A. 0
L. H
LH
Find the horizontal asymptote, if any, of the graph of the rational function.
h(x)=5x2+811x3 Select the correct choice below and, if necessary, fill in the answer box to complete your choi
A. The horizontal asymptote is □ . (Type an equation.)
B. There is no horizontal asymptote.
Find the horizontal asymptote, if any, of the graph of the rational function.
f(x)=5x+4−6x+7 Select the correct choice below and, if necessary, fill in the answer box to complete your choice.
A. The horizontal asymptote is □ .
(Type an equation. Simplify your answer. Use integers or fractions for any numbers in the equation.)
B. There is no horizontal asymptote.
Essay 10 points
Let f(x)=x+51−4
- Enter the equation of the vertical asymptote of f(x).
- Enter the equation of the horizontal asymptote of f(x).
- Enter the domain of f(x) in interval notation.
- Enter the range of f(x) in interval notation.
- State the vertical and/or horizontal transformation(s).
- Graph f(x), by hand.
- Include:
- Asymptotes as dotted lines
- x-intercepts as precise points
- Open dot where there is a hole in the graph (if applicable)
(1 point) each correct answer
(5 points) correct labeled graph
Remember, you can type in your answer and work or you can take a picture of it and upload the image.
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The mass of a colony of bacteria, in grams, is modeled by the function P given by P(t)=2+5tan−1(2t), where t is measured in days. What is the instantaneous rate of change of the mass of the colony, in grams per day, at the moment the colony reaches a mass of 6 grams?
(A) -0.606
(B) 0.250
(C) 1.214
(D) 1.942
Find the slope of the line that passes through each set of points: (4,4) and (6,6). Find the answer below and decorate the stocking with the features listed.
This model shows a unit square divided into smaller square tiles.
1 unit Find the area of the shaded rectangle by multiplying its length and width. Fill in the equation.
□□□
As a town gets smaller, the population of its high school decreases by 7% each year. The senior class has 320 students now. In how many years will it have about 100 students? Write an equation. Then solve the equation. Write an equation to represent this situation. Let t be the number of years before the class will have 100 students.
□
(Type an equation using t as the variable. Use integers or decimals for any numbers in the equation.)
Solve the equation.
lnt=□ years the senior class will have about 100 students.
(Type an integer or decimal rounded to the nearest hundredth as needed.)
6. Two masses are tied to a rope on a pulley, as shown below.
a. When the system is released from this position, what is the acceleration of the 2.0-kg mass?
b. How long does it take for the 2.0−kg mass to fall to the floor?
Problem 6
Sothy plans to walk 10000 steps. He starts his walk at 8:00 AM. At 8:23 AM, his phone tells him that he has taken 2000 steps. If he continues at this rate, when will he reach 10000 steps?
Submit
90. What is the absolute minimum value of y=34x3−8x2+15x on 1≤x≤3 ?
A. 0
f(x)1=4x2−16x+15
B. 325
C. 9
f(1)=3251(3)=94x2−10x−6x+152x(2x−5)−3(2x−5)
D. 352f(3)=9f∣5)=3252x(2x−5)−3(2x−5(2x−3)(2x−5)
A bug has fallen into a whirlpool, and it's distance from the center is given by: r=θ, where 0≤θ≤4π It is being sucked from the outside towards the center of the swirl in the whirlpool. What is the horizontal component of the bug's location, after it has spun through an angle of 611π radians?
x=−4.68x=5.89x=4.99x=9.56
```latex
\begin{tabular}{|l|c|c|c|c|}
\hline \multicolumn{1}{|c|}{ Artikelbez. } & Artikelnr. & Einzelpreis & Anzahl & Gesamtpreis \\
\hline Drucker IP 236 & 120478 & 235,70\,€ & 2 & 471,42\,€ \\
\hline Monitor 17 Zoll & 524712 & 365,80\,€ & 3 & 1097,90\,€ \\
\hline CD-Rohling & 258413 & 0,75\,€ & 200 & 150\,€ \\
\hline Infrarot-Maus & 569322 & 10,75\,€ & 5 & 53,75\,€ \\
\hline Toner-Kartusche IC 23 & 442523 & 99,85\,€ & 4 & 395,40\,€ \\
\hline
\end{tabular} Netto 19 \% MwSt. Brutto The user took a picture with their phone and the text was extracted above. The user then had a dialogue with an AI Assistant to help clarify the instructions. Dialogue Transcript: assistant:
Hallo! Es sieht so aus, als ob du eine Tabelle mit Artikeldetails und Preisen vor dir hast. Kannst du mir bitte genauer sagen, welche Berechnung oder Information du benötigst? Möchtest du vielleicht den Gesamtbetrag inklusive Mehrwertsteuer berechnen oder gibt es eine andere spezifische Aufgabe, bei der ich dir helfen kann? Lass es mich wissen! user:
Ja assistant:
Super! Um dir besser helfen zu können, brauche ich eine klarere Vorstellung davon, was genau du berechnen möchtest. Geht es darum, den Gesamtbetrag inklusive Mehrwertsteuer zu ermitteln, oder gibt es etwas anderes, das du bearbeitet haben möchtest? Bitte teile mir mit, worauf du hinaus willst. user:
I uploaded an image and extracted the following:
* Text: \begin{tabular}{|l|r|r|c|c|}
\hline \multicolumn{1}{|c|}{ Artikelbez. } & Artikelnr. & Einzelpreis & Anzahl & \multicolumn{1}{c|}{ Gesamtpreis } \\
\hline Drucker IP 236 & 120478 & 235,70\,€ & 2 & 471,42\,€ \\
\hline Monitor 17 Zoll & 524712 & 365,80\,€ & 3 & 1097,40\,€ \\
\hline CD-Rohling & 258413 & 0,75\,€ & 200 & 1,50\,€ \\
\hline Infrarot-Maus & 569322 & 10,75\,€ & 5 & 53,75\,€ \\
\hline Toner-Kartusche IC 23 & 442523 & 99,85\,€ & 4 & 395,40\,€ \\
\hline
\end{tabular} Netto
19 \% MwSt.
Brutto
□□□
```
For time 0≤t≤10, water is flowing into a small tub at a rate given by the function F defined by F(t)=arctan(2π−10t). For time 5≤t≤10, water is leaking from the tub at a rate given by the function L defined by L(t)=0.03(20t−t2−75). Both F(t) and L(t) are measured in cubic feet per minute, and t is measured in minutes. The volume of water in the tub, in cubic feet, at time t minutes is given by W(t).
(a) At time t=3, there are 2.5 cubic feet of water in the tub. Write an equation for the locally linear approximation of W at t=3, and use it to approximate the volume of water in the tub at time t=3.5. No response entered
(b) Find W′′(8). Using correct units, interpret the meaning of W′′(8) in the context of the problem. No response entered
(c) Is there a time t, for 5<t<10, at which the rate of change of the volume of water in the tub changes from positive to negative? Give a reason for your answer.
Does the equation below represent a relation, a function, both a relation and a function, or neither a relation nor a function?
y=9x2−9x+20
A. both a relation and a function
B. function only
C. relation only
D. neither a relation nor a function
The perimeter of a triangle is 107 m . The second side is three times as long as the first side. The third side is 5 m shorter than than the second side. How long is each side. Determine the length of each side of the triangle.
The first side is □ m The second side is □ m. The third side is □ m
Identifying an Error
Deepak plotted these points on the number line.
Point A: -0.3
Point B: −43
Point C: −141
Point D: -0.7
Which point did he plot incorrectly?
Point a
Intro
Done
Find an equation for a sinusoidal function that has period 2π, amplitude 2 , and contains the point ( 2π,0 ). Write your answer in the form f(x)=Asin(Bx+C)+D, where A,B,C, and D are real numbers.
f(x)=□
Let f be a twice-differentiable function such that f′(1)=0. The second derivative of f is given by f′′(x)=x2cos(x2+π) for −1≤x≤3.
(a) On what open intervals contained in −1<x<3 is the graph of f concave up? Give a reason for your answer. No response entered
(b) Does f have a relative minimum, a relative maximum, or neither at x=1 ? Justify your answer. No response entered
(c) Use the Mean Value Theorem on the closed interval [−1,1] to show that f′(−1) cannot equal 2.5. No response entered
(d) Does the graph of f have a point of inflection at x=0 ? Give a reason for your answer.
A particle moves along the x-axis so that its position at time t>0 is given by x(t)=3t2+8t2−9.
(a) Show that the velocity of the particle at time t is given by v(t)=(3t2+8)270t. No response entered
(b) Is the particle moving toward the origin or away from the origin at time t=2 ? Give a reason for your answer. No response entered
(c) The acceleration of the particle is given by a(t). Write an expression for a(t), and find the value of a(2). No response entered
(d) What position does the particle approach as t approaches infinity?
Unless otherwise specified, the domain of a function f is assumed to be the set of all real numbers x for which f(x) is a real number.
W(t)={217−23cos(6πt)10−51(t−6)2 for 0≤t≤6 for 6<t≤10 The depth of a river at a certain point is modeled by the function W defined above, where W(t) is measured in feet and time t is measured in hours.
(a) Find W′(8). Using correct units, explain the meaning of W′(8) in the context of the problem. No response entered
(b) The graph of W is concave down for 3≤t≤3.5. Use the line tangent to the graph of W at t=3 to show that W(3.5)≤9. No response entered
(c) Find limt→2t−2w(t)−t3+41.
\begin{tabular}{|c||c|c|c|c|}
\hlinex & -3 & -2 & -1 & 1 \\
\hlinef(x) & −25 & -3 & -2 & 32 \\
\hlinef′(x) & -1 & 31 & 56 & 34 \\
\hline
\end{tabular} The table above gives values of the differentiable function f and its derivative for selected values of x.
(a) Let g be the function defined by g(x)=exf(x2). Find g′(−1). No response entered
(b) Let h be the function defined by h(x)=f(f(−2x)). Find h′(1). No response entered
(c) Let k be the function defined by k(x)=f(x)⋅arcsin(2x). Find k′(−1).
Consider the curve given by the equation (2y+1)3−24x=−3.
(a) Show that dxdy=(2y+1)24. No response entered
(b) Write an equation for the line tangent to the curve at the point (−1,−2). No response entered
(c) Evaluate dx2d2y at the point (−1,−2). No response entered
(d) The point (61,0) is on the curve. Find the value of (y−1)′(0).
(3) 55∘F
Use logarithmic differentiation to differentiate each function with respect to x. You do not need to simplify or substitute for y.
y=(2x4−1)5⋅(4x9+5)6(x2+4)3
A) dxdy=y(x2+46x−2x4−1160x3−4x9+5864x8)
B) dxdy=y(x2+418x−2x4−180x3+4x9+5432x8)
C) dxdy=y(x2+46x−2x4−140x3+4x9+5864x8)
D) dxdy=y(x2+46x−2x4−140x3−4x9+5216x8)
Use the given conditions to write an equation for the line in point-slope form and general form.
Passing through (8,−1) and perpendicular to the line whose equation is x−7y−9=0
[4] If A−1=[3−121] and B−1=[1−3−14], and (AB)−1=[xyzh], then x+y+z+h
a) -10
b) 3
c) 8
d) 20
[5] If ∣∣aeimbfjncgkodhlp∣∣=−3, then det⎝⎛2⎣⎡aeimbfjncgkodhlp⎦⎤⎠⎞=
a) -6
b) -48
c) -12
d) -32
[6] The linear system given by AX=B where A is 2×2 square matrix, Ax=[26−11] and Ay=[3126], then X=
a) [24]
b) [−24]
c) [42]
d) [−4−2] Q2: Write (T) for the correct statement and (F) for the false one
[1] If ∣A∣=∣∣A−1∣∣ then ∣A∣ must equal to 1.
[2] If A=[−2] then A−1=[−22]
[3] 3ATA is a symmetric matrix.
[4] The matrix A=⎣⎡10005−200−30−100802⎦⎤ is singular.
7. The circular pool in a park is undergoing improvement work. Workers build a fence in the shape of a square outside the pool, as shown in Figure 1. Figure 1 Figure 2
3.14×183.140314+×138565.20
(a) The length of the fence is 180 m . What is the circumference of the circular pool? (Show your steps) (Take π=3.14 )
(b) The workers build a path of width 3 m around the fence, as shown in Figure 2. What is the of this path?
∫m2 Answer: The area of this path is 2196m2 . (Give the answer with a unit)
Page 11 of 11
The input voltage X(t) ), and output voltage Y(t) of an electrical system are sampled simultaneously at regular intervals with the following results.
n=0,1,2,3,4,5,6,7,8,9,…X(nT)=15,10,6,2,1,0,0,0,0,0,…Y(nT)=15,15,7.5,−2.75,−2.5,⋯,⋯,−,−… Calculate the missing values of the output voltage Y(nT) above.
Mint: Assume that X(t)=0 for t<0, and that only nonzero imputse response samples are h(n), for 0≤n≤4.
Let g be the function defined by g(x)=(x2−x+1)ex. What is the absolute maximum value of g on the interval [−4,1]?
(A) 1
(B) e
(C) e3
(D) e121
https://apclassroom.collegeboard.org/25/assessments/results/62905152/performance/591...
The graph of f′′, the second derivative of the continuous function f, is shown above on the interval [0,9]. On this interval f has only one critical point, which occurs at x=6. Which of the following statements is true about the function f on the interval [0,9] ?
(A) f has a relative minimum at x=6 but not an absolute minimum.
(B) The absolute minimum of f is at x=6. C f has a relative maximum at x=6 but not an absolute maximum.
(D) The absolute maximum of f is at x=6.
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TIME REMAINING
59:39 1
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(4)
A:
茔
6
\%
8
9
(1) The band leader is recording the number of students in the seventh and eighth grades who play flute and clarinet. Which describes the variables in the two-way table?
\begin{tabular}{|c|c|c|c|}
\hline \multicolumn{4}{|c|}{ Band Assignments } \\
\hline & Flute & Clarinet & Total \\
\hline 7th Grade & 19 & 24 & 43 \\
\hline 8th Grade & 22 & 18 & 40 \\
\hline Total & & & \\
\hline \hline
\end{tabular}
type of instrument and total number of seventh and eighth graders
type of instrument and total number of seventh graders
grade number and number of clarinet players
grade number and type of instrument
Mark this and retum
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Common Core Math 8 Q2
1
2
8
4
( 8
6
7
8
9
10
TIMEREMAINING
58:47 The lunch coordinator is recording the drink choices of the students in her school. She has partially completed the table. Which describes the variables in the two-way table?
\begin{tabular}{|c|c|c|c|}
\hline \multicolumn{4}{|c|}{ Lunch Drinks } \\
\hline & Milk & Water & Total \\
\hline Girls & & 52 & 85 \\
\hline Boys & 41 & & 93 \\
\hline Total & & & \\
\hline \hline
\end{tabular}
gender and number who chose milk
gender and drink choice
number who chose milk and number of boys
number who chose milk and total students
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Common Core Math 8 Q2
TIMEREMANING
58:19
1
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8
8
5
5
8
9
18
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WP
Home-William Pen Mr. Hanai recorded the outfit choices of the students for picture day from two periods. Which describes the variables in the two-way table?
\begin{tabular}{|c|c|c|c|}
\hline \multicolumn{4}{|c|}{ Outfits for School Pictures } \\
\hline & Pants & Skirt & Total \\
\hline 3rd Period & 31 & 23 & 54 \\
\hline 4th Period & 23 & 35 & 58 \\
\hline Total & 54 & 58 & 112 \\
\hline \hline
\end{tabular}
type of outfit and total students
type of outfit and total students in third period
period number and type of outfit
period number and total students who wore pants
Find the derivative.
y=e6x+7ln(6x+7) Select one:
A. ln[6x+7]e(6x+7)1−6[ln(6x+7)]2
B. (6x+7)e(6x+7)1
C. (6x+7)e(6x+7)6−(36x+42)ln(6x+7)
D. (6x+7)e(6x+7)1−(6x+7)ln(6x+7)
23-28 True-False Determine whether tr - statement is true or false. Explain your answer. 23. If f(x) is continuous at x=c, then so is ∣f(x)∣. 24. If ∣f(x)∣ is continuous at x=c, then so is f(x). 25. If f and g are discontinuous at x=c, then so is f+g. 26. If f and g are discontinuous at x=c, then so is fg.
Joanna has a total of 50 coins in her purse.
• The coins are either nickels or quarters.
■ The total value of the coins is $7.10.
Which system of equations can be used to determine the number of nickels, n, and quarters, q, that Joanna has in her purse?
O
n+q= 50
0.05n+ 0.25q = 7.10
n+q=7.10
50n+50q = 7.10
0.05n+ 0.25q = 50
n+q= 7.10
0.05n+ 0.25q = 7.10
50n+ 50q = 7.10
Rational Functions, Equations, and Inequalities NAME Williams 0. DATE :
181
1212024
K 1/16
T
15
c
14
A
112
1) For each function, identify the location of the hole (if applicable), the equation(s) of the vertical asymptote(s) and the equation of the horizontal asymptote.
(a) f(x)=x2+xx+1
(b) g(x)=x2−4x2+4x+4
[K-6]
Provious
Noxt
Sample Space and Venn Diagrams: Mastery
Submit Test
Tools
Into
3 Select the correct answer.
Two events, E1 and E2, are defined for a random experiment. What is the probability that at least one of the two events occurs in any trial of the experiment?
A. P(E1)−P(E2)−P(E1∩E2)
B. P(E1)+P(E2)−2P(E1∩E2)
C. P(E1)+P(E2)−P(E1∩E2)
D. P(E1)+P(E2)+P(E1∩E2)
The acceleration, in meters per second per second, of a race car is modeled by A(t)=t3−215t2+12t+10, where t is measured in seconds. What is the car's maximum acceleration on the time interval 0≤t≤6 ?
(A) The maximum acceleration of the race car is 2 meters per second per second and occurs at t=4 seconds. B The maximum acceleration of the race car is 6 meters per second per second and occurs at t=28 seconds.
C. The maximum acceleration of the race car is 15.5 meters per second per second and occurs at t=1 second.
(D) The maximum acceleration of the race car is 28 meters per second per second and occurs at t=6 seconds.
6) Explain how a quadratic function and its reciprocal function are related with regards to positive and negative intervals. Use an example with your explanation.
7) A biologist predicted that the population of tadpoles in a pond could be modelled by the function f(x)=x+740x, where x is given in days and 0≤x≤10. The function that actually models the tadpole population is g(x)=(x+7)(x+1)80 for 0≤x≤10. Determine when f(x)≥g(x).
Mitosis is a process of cell reproduction in which one cell divides into two identical cells. E, coli is a fast-growing bacterium that is often responsible for food poisoning in uncooked meat. It can reproduce itself in 15 minutes. If you begir with 100 E. coli bacteria, how many will there be in 1 hour?
a. 1200 bacteria
c. 1500 bacteriá
b. 1400 bacteria
d. 1600 bacteria Please select the best answer from the choices provided
A
B
C
D