Math Questions

The system shown has___solution(s). y = x + 1 2y - x = 6 infinite no one

Dan made a scale drawing of a summer camp. The scale of the drawing was 5 centimeters: 3 meters. The sand volleyball court is 9 meters wide in real life. How wide is the volleyball court in the drawing? centimeters

Let U = {1, 2, 3,...), A = {4, 8, 12,...}. Use the roster method to write the set A'. Select the correct choice below. A. A' = {1, 2, 3, 7, 10, 11,...) B. A' = {1, 2, 3, 5, 6, 7, 9, 10, 11,...) C. A' =Ø D. A' = {1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12,...}

Solve for L. P= 2L+ 2W L= 2/(P-W) L=2(W - 2P) L(P-2W)/2

Let D= (x) x is the height above the ground) be the domain, and let f(x)= "time spent on a Ferris wheel" be the possible function. Determine if the relation is an example of a function. No, f is not a function. Yes, f is a function.

Find the seventh term of a sequence whose first three terms are 1, 4, 9.

Jasper is taking an SAT prep class at the community center in Lakeside. The community center is 9 centimeters away from Jasper's house on a city map. If the map uses a scale of 3 centimeters: 1 kilometer, how far apart are Jasper's house and the community center in real life? ___kilometers

Laura measured a picnic area near the river and made a scale drawing. The scale she used was 3 inches : 2 yards. If the picnic area is 90 inches wide in the drawing, how wide is the actual picnic area? ___yards

Convert the equation f(t) = 186(1.12)^t to the form f(t)=ae^kt a= k= Give values accurate to three decimal places

Find the distance in kilometers between the following pair of cities, assuming they lie on the same north-south line. The radius of the Earth is approximately 6400 km. City A, 12° N, and City B, 12° S The cities are approximately km apart. (Round to the nearest integer as needed.)

A grid shows the positions of a subway stop and your house. The subway stop is located at (7, -7) and your house is located at (-3, 3). What is the distance, to the nearest unit, between your house and the subway stop? 11 14 19 24

A 180-ft redwood tree casts a shadow. Express the length x of the shadow as a function of the angle of elevation of the sun θ. Then find x when θ=40° and θ=75° Express x as a function of θ x= (Simplify your answer.)

Complete parts (a) and (b) below. The number of dogs per household in a small town Dogs 0 1 2 3 4 5 Probability 0.649 0.084 1 0.226 3 0.022 0.013 0.006 Find the variance of the probability distribution. σ2 = (Round to one decimal place as needed.) Find the standard deviation of the probability distribution. σ= (Round to one decimal place as needed.) (b) Interpret the results in the context of the real-life situation. A. A household on average has 0.5 dog with a standard deviation of 0.9 dog. B. A household on average has 0.8 dog with a standard deviation of 0.9 dog. C. A household on average has 0.9 dog with a standard deviation of 0.5 dog. D. A household on average has 0.5 dog with a standard deviation of 11 dogs.

Using the data given below, determine whether it would unusual for a household to have no HD televisions. The number of televisions (HD) per household in a small town Televisions 0 1 2 3 Households 52 460 668 1420 P(x) 0.020 0.177 0.257 0.546 Choose the correct answer below. A. It would not be unusual because the probability of having no HD televisions is more than 0.05. B. It would not be unusual because 52 people have no HD televisions in the town. C. It would be unusual because 52 people have no HD televisions in the town. D. It would be unusual because the probability of having no HD televisions is less than 0.05.

Solve the equation. √15x+18 = 5x 6/5 ,-3/5 6/5 -3/5 -6/5

Use the given zero to find the remaining zeros of each polynomial function. P(x) = x³ + 14x² + x + 14; Step 1 Recall the Conjugate Pair Theorem. If a + bi (b ≠ 0) is a complex zero of a polynomial function with real coefficients, then the conjugate is also a complex zero of the polynomial function. We now consider the given P(x). Because the coefficients are real numbers and - is a given zero, the Conjugate Pair Theorem implies that ___also must be a zero.

Final marks in Maria's Data Management course are based on 70% for term work, 15% for the exam, and 15% for the final course project. What term mark did Maria receive if her final mark was 87% and she received 84% on the exam and 95% on her final project? a) 87% b) 83% c) 85% d) 86%

The time t required to drive a certain distance varies inversely with the speed r. If it takes 2 hours to drive the distance at 30 miles per hour, how long will it take to drive the same distance at 35 miles per hour? about 2.33 hours about 1.71 hours 60 hours 525 hours

2. Which of the following could be represented by a periodic function? Explain your answer. a. the average monthly temperature in your community, recorded every month for three years b. the population in your community, recorded every year for the last 50 years c. the number of cars per hour that pass through an intersection near where you live, recorded for two consecutive school days

Which equation represents y = -x² + 4x - 1 in vertex form? y = -(x + 2)² - 3 y = -(x - 2)² +3 y = -(x - 2)² + 5 y = -(x + 2)² - 1

Three letters are to be selected at random from the English alphabet of 26 letters. Determine the probability that 3 consonants are selected. Assume there are 21 consonants in the alphabet and that selection is to be done without replacement. Set up the problem as if it were to be solved, but do not solve. P(3 consonants selected) =

The cost to remove a toxin from a lake is modeled by the function C(p) = 75p/85-p where C is the cost (in thousands of dollars) and p is the amount of toxin in a small lake (measured in parts per billion [ppb]). This model is valid only when the amount of toxin is less than 85 ppb. a. Find the cost in dollars to remove 45 ppb of the toxin from the lake. (round to the nearest whole dollar) C=S b. Find the formula for the inverse function. p=f¹(C)= c. Use part b. to determine how much toxin is removed for $60,000. ppb (round to 2 decimal places)

The position (in feet) of a buoy in the water can be modeled by the function s(t) = 9 cos(t) where t is the elapsed time in seconds. (a) If we start viewing the buoy when it is at its high point, how many seconds does it take until the buoy is back at the high point again (i.e. What is the period of the function?)

Which of the following describes the parabola with the equation y = 4x² - 12x + 9? The axis of symmetry is x = -1.5 and the vertex is (-1.5, 36). The axis of symmetry is x = 4 and the vertex is (4, -12). The axis of symmetry is x = 0 and the vertex is (0, 9). The axis of symmetry is x = 1.5 and the vertex is (1.5, 0).

Why was Carnegie Steel considered a vertical monopoly? The company controlled every step of steel production, from raw materials to distribution. The company controlled all the steel plants in the country. The company became the only source of steel after competitors went out of business. The company was able to produce more steel than any other steel company in the world.

Use the quadratic model d= -3p2 + 168p 315 to predict d if p equals 15. 1845 2160 2880 1530

The following numbers show the temperature, in degrees Celsius, of coffee in 30 recently tested coffee makers: 76 68 72 73 70 69 68 73 81 72 66 85 72 72 69 72 67 74 73 69 75 65 70 71 71 71 68 74 79 73 Calculate the mean, median and mode.

Use the probability distribution to complete parts (a) through (d) below. The probability distribution of number of televisions per household in a small town The probability is (Type an integer or a decimal. Do not round.) (b) Find the probability of randomly selecting a household that has two or more televisions. The probability is (Type an integer or a decimal. Do not round.) (c) Find the probability of randomly selecting a household that has between one and three televisions, inclusive. The probability is (Type an integer or a decimal. Do not round.)

Which of the following is a geometric sequence? Enter a, b, c, d, or e. a. 4, 12, 36, 108, 324, b. 2, 4, 16, 256, 65536, ... c. 4, 17, 30, 43, 56, ... d. 3, 7, 11, 15, 19, .. e. 1, 2, 4, 10, 12, ...

The following data shows the weight loss (in pounds) of a sample of five members in a health club at the end of two months of membership. 10 5 19 8 3 Find the median.

Choose all that are properties of one-to-one functions. x-values are repeated. Functions are always one-to-one. The graph passes the vertical line test. y-values are repeated. y-values are not repeated. x-values are not repeated. The graph passes the horizontal line test.

Find the slope, x-intercept, and y-intercept for the line 5x - 4y - 6=0. The slope is The x-intercept value is The y-intercept value is Note: Your answers must be decimals.

Assume that the probability of any newborn baby being a boy is1/2 and that all births are independent. If a family has three children (no twins), what is the probability of the event that none of them are boys? The probability is (Simplify your answer.)

Ten red balls and three blue balls are in a bag. If two balls from the bag are to be selected at random, determine the probability of selecting two red balls. Assume that selection is to be done without replacement. Set up the problem as if it were to be solved, but do not solve. P(2 red balls selected) =

Directions Substitute Equation 1 into Equation 2. Find the value for x, then find the value for y and input your answers in the boxes below. Equation 1: y = 2x Equation 2: x+y=6

A ball is kicked into the air. It follows a path given by h(t) = -4.9t² +8t+ 0.4, where t is the time, in seconds, and h(t) is the height, in meters. a) Determine the maximum height of the ball to the nearest tenth of a meter. b) When does the ball reach its maximum height?

Solve the following equation. 3/x+1/x-3=18/ x²-2 Select the correct choice below and, if necessary, fill in the answer box to complete your choice. A. The solution(s) is/are (Type an integer or a simplified fraction. Use a comma to separate answers as needed.) B. The solution set is {x|x is a real number and x ≠ (Type an integer or a simplified fraction. Use a comma to separate answers as needed.) C. There is no solution.

Write an equation that expresses the following relationship: x varies jointly as y and a and inversely as the square root of m. Then solve the equation for y. Write an equation that expresses the given relationship. Use k as the constant of variation. x=

Find the absolute change and the percentage change in the following case. The number of daily news paper in a country was 2063 in 1900 and 1312 in 2010. The absolute change is (Simplify your answer. Type an integer or a decimal.)

The polynomial of degree 4, P(x) has a root of multiplicity 2 at x = 1 and roots of multiplicity 1 at x = 0 and x = - 4. It goes through the point (5, 72). Find a formula for P(x).

Last year, Pinwheel Industries introduced a new toy. It cost $7900 to develop the toy and $25 to manufacture each toy. Fill in the blanks below as appropriate. A.) Give a linear equation in the form C (n) =mn+b gives the total cost, C to produce, n of those toys. C (n) = B.) The total cost to produce n = 4300 toys is $ C.) With $81650, a total of A toys can be produced.

Find the equation of the line, in slope-intercept form, that satisfies the given conditions. The graph is parallel to the graph of x + 2y = 8 and passes through the point whose coordinates are (-2,-4).

What is the best way to manage adversity in the workplace? A) Look for the root cause of the problem. B) Brainstorm ways the problem can be overcome. C) Consider the causes and effects of the problem. D) View the problem as an opportunity to make changes.

To cut costs, the Rose City school board has decided to eliminate art and music courses. Isabella's daughter plans to go to art school after high school and needs access to art courses. Which action shows that Isabella understands the importance of root cause analysis when wanting to effect change? A) She meets with the school principal to express her concerns about the decision. B) She makes a list of why the school board may have decided to drop art and music classes. C) She asks teachers, students, and parents to sign a petition in favor of keeping art and music classes. D) She uses social media to boycott the school if the school board does not change its decision.

An arithmetic sequence is one that involves adding or subtracting by the same number to each term in the sequence. A geometric sequence is one that involves multiplying or dividing by the same number to each term in the sequence. Classify each sequence as arithmetic, geometric, or neither. There should be two sequences in each category.

An architect is designing a garden for a client on a planning sheet. The client requests the relocation of a water fountain by the rule (x,y) → (x+ 9, y-8). Later, the client decides that they would prefer the water fountain's location moved from this new position 5 units left and 3 units down. Find the composition as a single transformation. A. (x,y) → (x+4, y-11) B. (x,y) → (x+6, y-13) C. (x, y) → (x + 14, y − 5) D. (x, y) → (x-3, y-5)

To produce the graph of the function Y=0.5cot(0.5x), what transformations should be applied to the graph of the parent function Y = cot(x)? a horizontal compression to produce a period of π/2 and a vertical compression a horizontal compression to produce a period of π/2 and a vertical stretch a horizontal stretch to produce a period of 2π and a vertical compression a horizontal stretch to produce a period of 2π and a vertical stretch

The trifecta at most racetracks consists of selecting the first-, second-, and third-place finishers in a particular race in their proper order. If there are twelve entries in the trifecta race, how many tickets must you purchase to guarantee a win?

The original photograph shown is 4 inches by 6 inches. a. What transformations can you use to produce the new photograph? b. You dilate the original photograph by a scale factor of What are the dimensions of the new photograph? c. You have a frame that holds photos that are 8.5 inches by 11 inches. Can you dilate the original photograph to fit the frame? Explain your reasoning.

A typical Chinese restaurant will often feature a Special Dinner, in which the customer has the choice of ordering one appetizer and one entree. 1. If there are 8 appetizers and 11 entrees, how many different Special Dinners are there? 2. If there are 12 appetizers and 7 entrees, how many different Special Dinners are there? 3. There are 12 appetizers; 4 are soups, 6 contain meat, and 2 do not. In how many different orders can 3 different appetizers be brought to the table? 4. In how many different orders can 5 different appetizers of the 12 be brought to the table? 5. Do Exercises 3-4 involve permutations or combinations?