A spaceship traveled 3 4 of a light-year and stopped at a space station. Then it traveled 1 12 of a light-year further to a planet. How far did the spaceship travel in all?

Answer:2 7/10 hours

Step-by-step explanation:

Subtract 2 3/10 out of 5

Answer: 2 7/10

Step-by-step explanation:

Hours spent in basketball= 2 3/10

Total hours spent outside= 5 hours

To get The number of hours he didn't basketball will be (5hours - 2 3/10)

5 - 23/10 = 2 7/10 .

Answer: 336.4447 feet

Step-by-step explanation: from the picture I attached to this answer, you will see how I represented the question in a diagram

Point A being the point of his friends car, point B being the point of the hot air balloon when he noticed the angle of depression to his friends car to be 37 degrees, point C being the point of the hot air balloon after passing his friends car and noticing the angle of depression to be 38 degrees

From my diagram, I labeled y as the distance between B and C and we are told he traveled when a speed of 6 feet per second with a constant altitude, and after 1 and a half minutes he reached point C, which is 90 seconds

To get value of y we multiply the speed and the time, 90 multiplied by 6 which will give 540 feet

From my diagram, I calculated the angle inside the triangle to be 105, we all know the sum of angles in a straight line to be 180, and also knowing alternate angles, we have 37 and 38 degree as the angle outside the triangle at that point, so adding both angle 37+38=75 and subtracting that from 180 we get 105

So the get the distance between him and his friends when the angle of depression is 38 degree, which is the distance between point A and C which I labeled x, we use the sin rule

Sin rule states that the ratio between the length of a side of a triangle and the sin of the angle opposite it is constant for all sides of the triangle,

The steps are also solved in the picture I sent

So we have the ratio of x and sin37 is also equal to the ratio of 540 and sin105

So x divided by sin37 equals 540 divided by sin105

Sin37 equals 0.6018, sin105 equals 0.9659

So making x the subject of formula

We get x will be equal to (540*0.6018)/0.9659 which will give you 336.4447 feet

Using trigonometry and applying the concept of tangent to the angles of depression, we can construct two right triangles to calculate the horizontal distances and then use the Pythagorean theorem to calculate the distance from the balloon to the friend's car.

The question involves a man in a hot-air balloon tracking his distance from a car in a parking lot using the angles of depression before and after flying over the car. To solve this question, we will apply trigonometry specifically, the concept of tangent which relates the angle of depression to the sides of a right triangle formed by the observer's altitude and the horizontal distance.

Firstly, let's find the horizontal distance the man travels in a minute and a half at 6 feet per second:

Distance = speed × time = 6 feet/second × 90 seconds = 540 feet

Now, we form two right triangles: one before he flies over the car and one after. Both have the same altitude (since he maintains a constant altitude).

For the first triangle, using the 37° angle of depression, we can denote:

For the second triangle, using the 38° angle of depression, we can denote:

Solving these two equations we find the horizontal distance (x) and then can find the direct line distance using Pythagoras' theorem.

To find the distance, we will use the tangent of 38° (the angle of depression after passing the car) since that relates the perpendicular distance from the balloon to the car (which we are interested in) to the horizontal distance. Let's denote the perpendicular distance as 'h' (altitude of the balloon).

Tan(38°) = h / (x - 540 feet)

After some algebraic manipulation and applying trigonometry, we can solve for 'h' and find the direct line distance from the balloon to the car.

Answer:

DV/dt    = 0,2355 m³/min

Step-by-step explanation:

Conical tank volume    V  =  1/3 *π*r²*h

r radius at the top    2 meters

when depth of water is 3 meters the radius of the level of water is:

let     α  angle of vertex of cone then

tan∠α   = 2/8        tan∠α   = 1/4         tan∠α  = 0,25

At the same time when water is at 3 meters depth  radius is

tan∠α  = r/3             0,25*3= r         r  = 0,75 m

Now

DV/dt    =  (1/3)*π*r²*Dh/dt            

Dh/dt  =  0,4 meters/min

By substitution

DV/dt    = 0,2355 m³/min

Answer:

Option C is correct. Option f is the same as option C

Step-by-step explanation:

From the question, There are three high schools in the district, each with grades between nine to twelve. The school board decided to pool all of the students together and randomly samples 250 students in the whole district that has schools between the grade of nine to twelve.

In order to test for high school students in the district for Attention Deficit disorder(ADD), they could have chosen any 250 students from any school with grades betweem nine to twelve throughout the district.

Answer:

     A = 6.13e^(0.00884769t)

Step-by-step explanation:

The exponential growth model can be written two ways. Comparing them, we can find the value of k.

  A = 6.13×(7.00/6.13)^(t/(2015-2000)) = 6.13×e^(kt)

Dividing by 6.13 and taking natural logs, we get ...

  t/15×ln(7.00/6.13) = kt

  k = ln(7.00/6.13)/15 . . . . . divide by t

  k ≈ 0.00884769

Then the exponential growth function can be written as ...

  A = 6.13e^(0.00884769t)

Answer: The amount in the account is A = A(1 + P/400)^20

Step-by-step explanation:

Initial amount deposited into the account is A. This means that the principal is A, so

P = A

It was compounded quarterly. This means that it was compounded once in four months. So

n = 4

The rate at which the principal was compounded is P%. So

r = P/100

It was compounded for a total of 5 years. So

n = 5

The formula for compound interest is

A = P(1+r/n)^nt

A = total amount in the account at the end of n years.

Let A = B

B = A(1 + (P/100)/4)^4×5

A = A(1 + P/400)^20

Final answer:

The correct expression for the amount in an account after 5 years, where interest is compounded quarterly, is D. [tex]A(1 + \frac{P}{25})^{20}[/tex].

Explanation:

When calculating the future value of an investment with compound interest, it's important to consider the initial amount A, the annual interest rate P, the number of times the interest is compounded per year, and the total number of years the money is invested. In this question, where the account compounds quarterly for 5 years, the formula for compound interest applies, which is:

P(t) = [tex]A(1 + \frac{r}{n})^{nt}[/tex]

Here, r represents the annual nominal interest rate in decimal form [tex](\frac{P}{100})[/tex], n is the number of times interest is compounded per year, and t is the number of years the money is invested. Given that the account compounds quarterly, n equals 4. So after 5 years, the formula would be:

P(5) = [tex]A(1 + \frac{P}{400})^{(4 \times 5)}[/tex]

Based on the options provided in the question, the correct expression for the amount in the account after 5 years, in terms of A and P, when compounded quarterly is:

D. [tex]A(1 + \frac{P}{25})^{20}[/tex]

Answer: The weight of X is [tex]33\dfrac{1}{3}\%[/tex] of weight of mixture.

Step-by-step explanation:

Since we have given that

Percentage of seed mixture X for ryegrass = 40%

Percentage of seed mixture Y for ryegrass = 25%

If a mixture of X and Y contains 30 percent ryegrass,

Let total seed mixture be 100

So, for seed X = x

For seed Y = 100-x

So, According to question,

[tex]0.4x+0.25(100-x)=30\\\\0.4x+25-0.25x=30\\\\0.15x=30-25\\\\0.15x=5\\\\x=\dfrac{5}{0.15}\\\\x=\dfrac{100}{3}[/tex]

So, weight of mixture X is given by

[tex]\dfrac{\text{Weight of X}}{\text{Weight of mixture}}\times 100\\\\=\dfrac{\dfrac{100}{3}}{100}\times 100\\\\=\dfrac{100}{3}\%\\\\=33\dfrac{1}{3}\%[/tex]

Hence, the weight of X is [tex]33\dfrac{1}{3}\%[/tex] of weight of mixture.

Answer:

Step-by-step explanation:

The leading term tells you what you want to know. It is of even degree, so the value of S(x) is the same regardless of the sign of x as the magnitude of x gets large.

The sign of S(x) matches the sign of the leading coefficient (-3), so is negative as x gets large.

Hence ...

Answer:

Explanation:

The vertical height of the cliff, 30 m tall, and the horizontal distance from the kayak to the base of the mountain form a right triangle.

The angle of depression is 40º.

By the alternate interior angles theorem, that depression angle is congruent to the elevation angle from the kayak to the spot where Bob is standing on.

The tangent trigonometric ratio relates the height (30 m) with the distance from the kayak to the base of the mountain:

Answer:

In statistics, there are several strategies to select a sample. Remember that a sample is a sub group selected from a population. This sample selection must be random to have more reliability in the research, each answer option represents a type of sampling.

In this case, the researcher is using a multistage sampling, because it consists  in taking smaller sample units at each stage, which is being done in this example. First, is selected a number of counties, then the precincts, and at the end the voters. By this way, the sample is being reduced to less subjects at each stage.

The sampling strategy described is an example of c) multistage sampling. This technique helps in reducing complexity and cost.

The sampling strategy described in the question is an example of multistage sampling.

In this process:

Multistage sampling is used to reduce the complexity and cost of data collection by breaking the population into smaller groups at each stage.

Final answer:

We found there were 7 Blue Jays, 42 sparrows, and 4 Falcons.

Explanation:

The question involves solving a simple algebraic problem to determine the number of sparrows and Blue Jays when given the total number of birds and the number of Falcons.

To solve this, let's define the number of Blue Jays as x.

The number of sparrows is six times the number of Blue Jays, so we can express that as 6x.

We are told there are four Falcons.

The total number of birds spotted is 53.

We can set up the equation as:

x + 6x + 4 = 53

Solving this equation:

Since x represents the number of Blue Jays, there are 7 Blue Jays.

To find the number of sparrows, multiply 7 by 6, which gives us 42 sparrows.

We were also told there are four Falcons.

So the group saw 42 sparrows, 7 Blue Jays, and 4 Falcons.

For this case we must find the solution of the following quadratic equation:

[tex]x ^ 2-10x + 25 = 0[/tex]

Where:

[tex]a = 1\\b = -10\\c = 25[/tex]

Then, the solution is given by:

[tex]x = \frac {-b \pm \sqrt {b ^ 2-4 (a) (c)}} {2a}[/tex]

Substituting the values:

[tex]x = \frac {- (- 10) \pm \sqrt {(- 10) ^ 2-4 (1) (25)}} {2 (1)}\\x = \frac {10 \pm \sqrt {100-100}} {2}\\x = \frac {10 \pm \sqrt {0}} {2}\\x = \frac {10} {2} = 5[/tex]

Thus, we have two equal real roots.

[tex]x_ {1} = 5\\x_ {2} = 5[/tex]

Answer:

We have two equal real roots.

Answer:

cannot be determined

Step-by-step explanation:

i tried 1,0,2 dont work

Answer:

Step-by-step explanation:

Let p represent the number of psychology textbooks sold. Then the total number sold was ...

  p + (p+87) = 257

  2p = 170 . . . . . .subtract 87; next divide by 2

  p = 85 . . . . . . . psychology books sold

  p+87 = 172 . . . math books sold

85 psychology textbooks and 172 math textbooks were sold.

Let's denote the number of psychology textbooks sold as x. According to the problem, the number of math textbooks sold, which is 87 more than the psych books, can be represented as x + 87. The total number of textbooks sold is expressed in the problem as 257, which is the sum of the psych books (x) and the math books (x + 87). So:

x (psych books) + x + 87 (math books) = 257

We can simplify this to 2x + 87 = 257. If we subtract 87 from both sides, we'll get 2x = 170. Dividing both sides by 2 results in x = 85. This tells us that 85 psychology books were sold.

Then to find the number of math books, we can use the original relationship given: math books = psychology books + 87, therefore, 85 + 87 = 172 math books.

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Answer:

  DC = 30

Step-by-step explanation:

Point D is the circumcenter of triangle ABC, so it is equidistant from A, B, and C.

We are given the measures of DE and AE, so we can figure AD using the Pythagorean theorem:

  AD² = AE² + DE² . . . . . . . . . . . . . . . E bisects AB, so AE=AB/2=18

  AD = √(18² +24²) = √900 = 30

  DC = AD

  DC = 30

Final answer:

To find the values of a, b, c, and d in the equation 4cos(x)cos(2x)cos(4x) = cos(ax)+cos(bx)+cos(cx)+cos(dx), we can compare the coefficients of the cosine terms on both sides of the equation. By expanding and comparing coefficients, we can determine that a = 12, b = 10, c = 6, and d = 8. Therefore, a + b + c + d = 36.

Explanation:

To find the values of a, b, c, and d, we need to equate the coefficients of cos(ax), cos(bx), cos(cx), and cos(dx) on both sides of the equation.

4cos(x)cos(2x)cos(4x) = cos(ax)+cos(bx)+cos(cx)+cos(dx)

By expanding the left side and comparing coefficients, we get:

From these equations, we can determine that a = 12, b = 10, c = 6, and d = 8.

Therefore, a + b + c + d = 12+10+6+8 = 36.

Answer:

  24 cm wide by 36 cm high

Step-by-step explanation:

The poster with the smallest area will have an aspect ratio that makes the margin dimensions the same percentage of overall dimension in each direction.

Since the ratio of margin widths is 6:4 = 3:2, the poster and printed area will have an aspect ratio of 3:2. That is, the width is ...

  width of printed area = √(2/3·384 cm²) = 16 cm

Then the width of the poster is ...

  width = left margin + printed width + right margin = 4cm + 16 cm + 4 cm

  width = 24 cm

The height is 3/2 times that, or 36 cm.

The smallest poster with the required dimensions is 24 cm wide by 36 cm tall.

_____

If you need to see the calculus problem, consider the printed area width to be x. Then the printed height is 384/x and the overall dimensions are ...

  (x + 8) by (384/x + 12)

We want to minimize the area, which is the product of these dimensions:

  a = (x +8)(384/x +12) = 384 +12x +3072/x +96

  a = 12x + 3072/x +480

This is a minimum where its derivative is zero.

  a' = 12 -3072/x^2 = 0

  a' = 1 -256/x^2 = 0 . . . . . . divide by 12; true when x^2 = 256

This has solutions x=±16, of which the only useful solution is x=16.

Answer:

Step-by-step explanation:

Given

no of houses that can be served by water is directly Proportional to the square of diameter

[tex]N\propto d^2[/tex]

[tex]N=kd^2[/tex]

where k =constant

10 cm diameter can supply 40 houses

[tex]40=k(10)^2[/tex]-----------1

For d=30 cm Pipe

[tex]N_1=k(30)^2[/tex]-------------2

divide 1 & 2

[tex]\frac{N_1}{40}=(\frac{30}{10})^2[/tex]

[tex]N_1=40\times 9=360 [/tex]

(b)for N=1440 houses

[tex]1440=k(d_2)^2[/tex] ----------------3

[tex]\frac{1440}{40}=(\frac{d_2}{10})^2[/tex]

[tex]d_2=6\times 10[/tex]

[tex]d_2=60 cm[/tex]

A water pipe with a diameter of 30 cm can serve 360 houses. And to serve 1440 houses, a water pipe with a diameter of 60 cm is required.

The relationship between the number of houses that could be supplied by the water pipe and the diameter of the pipe can be described as a direct square relationship. This means if you square the diameter of the pipe, you'll get the number of houses that can be served. We know from the given info that a 10 cm diameter pipe can serve 40 houses. Therefore, the constant of variation (k) can be calculated as k=No. of houses/diameter². Hence, k=40/10²=0.4.

a.) A pipe with a 30 cm diameter can serve 0.4*(30)² = 360 houses.

b.) For a new subdivision of 1440 houses, we rearrange the formula to find the required diameter: Diameter= sqrt(No. of houses/k) = sqrt(1440/0.4) = 60 centimeters.

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Answer: it will take 8.25 seconds to reach maximum height

Step-by-step explanation:

Initial velocity, u of baseball = 132 feet per second. The height of the baseball, h in feet after t seconds is given by the function h = −16t^2 + 132t + 4

The given function is a quadratic equation. If values of height attained is plotted against time, the graph will take the shape of a parabola whose vertex corresponds to the maximum height attained by the baseball

Vertex of the parabola = -b/2a

a = - 16

b = 132

Vertex = - 132/-16× 2 = -132/32

Vertex = 4.125

The maximum height is 4.125 feets

To determine the time it will take to reach the maximum height of 4.125 feets, we will substitute h = 4.125 in the equation

4.125 = −16t^2 + 132t + 4

−16t^2 + 132t - 0.125 = 0

Applying the general formula for quadratic equations,

t = [- b ± √b^2 - (4ac)]/2a

a = -16

b = 132

c = -0.125

t = [- 132 ± √132^2 - 4(-16 × - 0.125)]/2× -16

t = [- 132 ± √17424 - 8)]/-32

t = [- 132 ± √17416]/-32

t = (-132 ± 132)/-32

t = (-132 + 132)/-32 or (-132 -132)/-32

t = 0 or -264/-32

t = 8.25 seconds

Final answer:

The baseball reaches its maximum height after 8.25 seconds.

Explanation:

To find the time when the baseball reaches its maximum height, we need to determine the time at which the vertical velocity becomes zero. The equation for the height of the ball as a function of time is given as h = -16t² + 132t + 4. To find the time at which the velocity becomes zero, we need to solve the equation v = -16t + 132 = 0. Solving for t, we get t = 8.25 seconds. Therefore, the baseball reaches its maximum height after 8.25 seconds.

Answer:

Yes

Step-by-step explanation:

Full price for first course:  £8.90

Half price:                           £4.45

One and one half times

 full price is then:             £13.35

Since this is less than Craig's £13.40, he can just barely afford to buy two main courses at these prices.

I think the answer would be -$5.17 because you would have to find the unexpected value.

I think the answer to this picture is 0.122

Game:

1/36(94) + 35/36(-8) = 94/36 -280/36 = -186/36 = -5.17

4. Add the probabilities together for 5 and under:

0.122 + 0.061 + 0.022 + 0.006 + 0.001 = 0.212

Airline :

Given: P = 70, P = 97% = 0.97, q = 1-0.97 = 0.03

Probability of being greater than 68:

(70 * 0.97^69 * 0.03^1) + (1*0.97^70*1)

= 0.2567 + 0.1185

= 0.375

Answer:

For every 1000 pairs sold, the manufacturer expect to replace 239 pairs for free.

Step-by-step explanation:

Given:

Mean (μ) = 2.2, Standard deviation(S.D) (σ) = 1.7 years and x = 1 (1 year)

Let's find the Z score.

Z = [tex]\frac{x - mean}{S.D}[/tex]

Now plug in the given values in the above formula, we get

Z = [tex]\frac{1 - 2.2}{1.7} = -0.71[/tex]

Now we have to use the z-score table.

The z-score for 0.71 is 0.2611

Since it z is negative, so we subtract 0.2611 from 0.5000

0.5000 - 0.2611 = 0.2389

Percentage = 0.2389 × 100 = 23.89%

To find replaces for 1000 pairs, we need to multiply 23.89% by 1000

= [tex]\frac{23.89}{100} .1000 = 238.9[/tex]

= 239

The cannot be in decimal, when we round off to the nearest whole, we get

239

Answer: number of people that had allergic reactions is 0.7%

Step-by-step explanation:

The total number of people that came to try the company's product is 3000

21 out of the 3,000 people had an allergic reaction. We want to determine how many percent of the total number of 3000 people that tried the product is 21 people that had reaction

Percentage of people that had allergic reactions = number of people that had allergic reactions / total number of people that tried the products × 100

Percentage of people that had an allergic reaction

= 21/3000× 100

= 0.007 × 100 = 0.7%

Answer:

A

Step-by-step explanation:

Ok. All coordinate are multiplied by factor of 1/3.

So,

(0,0) becomes (0,0).

(6,9) becomes (2,3).

(15,0) becomes (5,0).

Answer:

volume of cone = 12.56 cubic units

Step-by-step explanation:

Volume of cone = 1/3  π r² h

            r = 2

            h = 3

then

V= 1/3 3.14 * (2) ² 3

 = 12.56 cubic units

Answer:

12.56 cubic units

Step-by-step explanation:

Right on Edge 2022

Answer:

21

Step-by-step explanation:

Answer:

Null hypothesis:[tex]p=0.25[/tex]  

Alternative hypothesis:[tex]p \neq 0.25[/tex]

z=2.53

pv=0.0114

So based on the p value obtained and using the significance given [tex]\alpha=0.05[/tex] we have [tex]p_v<\alpha[/tex] so we can conclude that we reject the null hypothesis, and we can said that at 5% of significance the proportion of people who says that they use the Internet differs from 0.25 or 25% .  

Step-by-step explanation:

1) Data given and notation

n=3010 represent the random sample taken

X represent the people who says that said that they use the Internet.

[tex]\hat p=\frac{X}{106}=0.27[/tex] estimated proportion of people who says that said that they use the Internet.

[tex]p_o=0.25[/tex] is the value that we want to test

[tex]\alpha[/tex] represent the significance level  

z would represent the statistic (variable of interest)

[tex]p_v[/tex] represent the p value (variable of interest)  

2) Concepts and formulas to use  

We need to conduct a hypothesis in order to test the claim that 50% of people who says that  they would watch one of the television shows.:  

Null hypothesis:[tex]p=0.25[/tex]  

Alternative hypothesis:[tex]p \neq 0.25[/tex]  

When we conduct a proportion test we need to use the z statisitc, and the is given by:  

[tex]z=\frac{\hat p -p_o}{\sqrt{\frac{p_o (1-p_o)}{n}}}[/tex] (1)  

The One-Sample Proportion Test is used to assess whether a population proportion [tex]\hat p[/tex] is significantly different from a hypothesized value [tex]p_o[/tex].

3) Calculate the statistic  

Since we have all the info requires we can replace in formula (1) like this:  

[tex]z=\frac{0.27 -0.25}{\sqrt{\frac{0.25(1-0.25)}{3010}}}=2.53[/tex]

4) Statistical decision  

P value method or p value approach . "This method consists on determining "likely" or "unlikely" by determining the probability assuming the null hypothesis were true of observing a more extreme test statistic in the direction of the alternative hypothesis than the one observed". Or in other words is just a method to have an statistical decision to fail to reject or reject the null hypothesis.  

We have the significance level provided [tex]\alpha=0.05[/tex]. The next step would be calculate the p value for this test.  

Since is a bilateral test the p value would be:  

[tex]p_v =2*P(z>2.53)=2*(0.0057)=0.0114[/tex]  

So based on the p value obtained and using the significance given [tex]\alpha=0.05[/tex] we have [tex]p_v<\alpha[/tex] so we can conclude that we reject the null hypothesis, and we can said that at 5% of significance the proportion of people who says that they use the Internet differs from 0.25 or 25% .  

Answer:

t=19188.2 y

Step-by-step explanation:

The exponential decay equation is:

[tex] A=A_{0}e^{-0.00012t}[/tex]      (1)

But, A is 10% of A₀, it means that A=0.10A₀.

If we put it into equation (1), we will have:

[tex] 0.10A_{0}=A_{0}e^{-0.00012t}[/tex]      

[tex] 0.10=e^{-0.00012t}[/tex]         (2)

Now, we just need to solve (2) for t.

[tex] t=\frac{ln(0.10)}{-0.000121} = 19188.2 y [/tex]      

I hope it helps you!    

Answer:

Total number of dogs is 5.

Step-by-step explanation:

Cups of food each dog gets=[tex]\frac{2}{3}[/tex]

Here,each dog eats two-third cups of dog food.

Amount of dog food used=[tex]\frac{10}{3}[/tex]

A total of three and one-third cups of food is used up.

Let the number of dogs be x.

To find the number of dogs,divide total dog food used by the amount of dog food eaten by each dog.

Hence,  x  =[tex]\frac{\frac{10}{3} }{\frac{2}{3} }[/tex]

              x  =[tex]\frac{10}{2}[/tex]

               x  =5

The question is flawed due to its opinion-based and leading nature. It presupposes information, leads the participant, and doesn't provide a full range of response options.

This question, as posed by the 1995 Corporation for Public Broadcasting poll, is opinion-based and leading. There are several factors that make this question flawed. Firstly, it presupposes information by referencing a psychological study that potentially not all participants may be aware of, providing an initial bias. Secondly, it leads the participant in the direction of agreeing with the study, providing no neutral or mixed opinion option. Lastly, the question does not allow for participants to disagree somewhat, only strongly, which may influence the responses to be more in line with the premise of the study. In reliable polling, questions should offer sufficient options for the participant to choose from that captures the range of potential opinions and should avoid leading language or assumptions to obtain an accurate representation of the participants' views.

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