6 tractors take 10 days to collect the harvest. How long would it take 15 tractors to do the same amount of work

To calculate the probability that at least one dog will be adopted out of nine visits to an animal shelter, given a single visit adoption probability of 0.20, you use the complementary probability principle: 1 minus the probability of no adoptions in nine visits (0.80^9).

The question asks to calculate the probability that at least one dog will be adopted out of nine visits to an animal shelter, given that the probability of adopting a dog on any visit is 0.20. To find this, we need to use the concept of complementary probability, which states that the probability of at least one event occurring is equal to 1 minus the probability of the event not occurring at all. Here, the event not occurring at all means no dogs are adopted in nine visits.

First, let's find the probability of not adopting a dog on a single visit, which is 1 - 0.20 = 0.80. Next, to find the probability of not adopting a dog in nine visits, we raise this number to the ninth power: 0.80^9. Lastly, to find the probability of at least one adoption in nine visits, we subtract this value from 1.

So, the calculation goes as follows:

Performing the arithmetic gives us the answer.

The algebraic expression for '3 less than twice the sum of a number and 4' where x is the unknown number is

'2(x + 4) - 3'.

The algebraic expression for the verbal statement "3 less than twice the sum of a number and 4" can be written as follows:

First, let's represent the unknown number by x. The phrase 'the sum of a number and 4' translates to x + 4. 'Twice this sum' means we multiply the expression by 2, resulting in 2(x + 4). Finally, '3 less than' indicates that we need to subtract 3 from this expression. Therefore, the complete algebraic expression is 2(x + 4) - 3.

Solution:

Distance between Ruth House and Ruth Friend House =20 Meter north and 100 meter east of Ruth

Now , Ruth Starts Driving,

but after 70 mi she comes to a detour that takes her 15 mi south before going east again. she then drives east for 8 mi and runs out of gas.

The Diagram of Ruth Driving is depicted below.

Now , when ward flies in small plane to get Ruth,

So, Distance between Ruth and Ward , when Ruth is at Point S=SM

In Right Δ SVM, By Using Pythagoras theorem

SM²=SV² + VM²

DT=VS=15 m

VM=100 - (70+8)

     = 100 -78

     =22 meter

SM²=(15)² + (22)²

       = 225 + 484

       = 709

[tex]SM=\sqrt{709}=26.62[/tex]

So, Ward has to travel 26.62 miles east north to reach Ruth.

multiply speed by time to get distance

70 *8.5 = 595 miles

The slope of the blue curve measures the plane's rate of descent. the unit of measurement for the slope of the curve is feet per minute. at point a, the slope of the curve is -2,500, which means that the plane is descending at a rate of 2,500 feet per minute. at point b, the slope of the blue curve is , which means that the plane is at a rate of feet per minute

As you are measuring altitude against time, the slope of the curve measures the plane's rate of climb or descent.

At t = 0, the plane is at an altitude of 11 kilometer. It is descending all the time until at t = 10 the plane reaches ground level.  At both points the plane is descending.  Whereas at point A, the tangent line shows the rate of descent as 2 km over 2 minutes = 1 km per minute.

At point B, the tangent line shows the rate of descent as 2 km over 4 minutes = ½ km per minute.

Grade:  9

Subject:  Mathematics

Chapter:  Math and Graphing Assessment

Keywords:  feet per minute, The slope of the blue curve, the unit of measurement, the plane, the slope

The slope of the curve on a position versus time graph represents the instantaneous velocity of the plane. The unit of measurement is typically meters per second or feet per minute, and the slope at a given point can be calculated using a tangent line at that point.

The slope of the blue curve is related to the instantaneous velocity of the plane on a position versus time graph. The unit of measurement for the slope of the curve is meters per second (m/s) or feet per minute depending on the system being used. At point A, the slope indicates the rate at which the plane's velocity is at that moment in time. The steeper the slope of the curve at a particular point, the faster the plane is moving at that instant. At point B, a different slope value would imply a different instantaneous velocity.

To calculate the slope at any point, you would draw a straight line tangent to the curve at that point, which represents the instantaneous velocity. The slope is calculated as the 'rise over run'—the change in position (displacement) over the change in time. If we had specific numerical values at points A and B, we could calculate and state the exact rates of change in the plane's position, hence giving us the instantaneous velocities at those points.

The height of the statue is 97.6 meters

The Breakdown

To determine the height of the statue, we can use trigonometry and create a right triangle with the sailor, the tip of the torch, and the top of the statue.

Assuming the height of the statue is "h" (in meters). The distance between the sailor and the statue is the sum of the initial distance and the additional distance sailed, which is 110 meters.

In the first observation, the angle of elevation is 25 degrees. This means that the tangent of the angle is equal to the height of the statue divided by the initial distance between the sailor and the statue:

tan(25°) = h / initial distance

Similarly, in the second observation, the angle of elevation is 43 degrees and 50 minutes. We need to convert this angle to decimal degrees before using it in calculations. 50 minutes is equal to 50/60 = 5/6 degrees.

So, the angle of elevation in decimal degrees is 43 + 5/6 = 43.8333 degrees.

Now, we can use the tangent function again to relate the height of the statue to the new distance between the sailor and the statue:

tan(43.8333°) = h / (initial distance + 110)

We have two equations with two unknowns (h and initial distance). We can solve this system of equations to find the height of the statue.

Solving the first equation for the initial distance:

initial distance = h / tan(25°)

Substituting this value into the second equation, we get:

tan(43.8333°) = h / (h / tan(25°) + 110)

Now, we can solve this equation for h:

h = (tan(43.8333°) × 110) / (1 - tan(43.8333°) / tan(25°))

Using a calculator, we find that:

tan(43.8333°) ≈ 0.957

tan(25°) ≈ 0.466

Substituting these values into the equation:

h = (0.957 × 110) / (1 - 0.957 / 0.466)

h ≈ 97.6 meters

Therefore, the height of the statue is 97.6 meters.

let cat food = x

 total plus 5% = 105% = 1.05

1.05 * (11.50 + X) = 16.80

12.075 + 1.05x = 16.80

1.05x = 16.80-12.075

1.05x = 4.725

x = 4.725 / 1.05

x= 4.50

 the cat food cost $4.50

11.50 +4.50 = 16.00

16.00 * 0.05 = 0.80

16.00 + 0.80 = 16.80

1 liter = 100 centiliter

0.31 * 100 = 31

31 centiliters = 0.31 liters

1 liter = 100 centiliter

0.31 * 100 = 31

31 centiliters = 0.31 liters

To simplify the expression (3b^3)^4, raise the base to the fourth power and simplify the exponent.

To simplify the expression (3b^3)^4, we need to raise the base, 3b^3, to the fourth power. This can be done by multiplying the exponents. The result is 3^4 * (b^3)^4, which simplifies to 81b^12.

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Answer:

The common ratio r is -7.

Step-by-step explanation:

The common ratio of a geometric sequence is the division of the term [tex]a_{n+1}[/tex] by the term [tex]a_{n}[/tex].

In this problem, we have that:

[tex]a_{1} = 2, a_{2} = -14, a_{3} = 98, a_{4} = -686[/tex].

So the common ratio r is:

[tex]r = \frac{-14}{2} = \frac{98}{-14} = \frac{-686}{98} = -7[/tex]

The common ratio r is -7.

To write 5 - 2y = 3x in standard form, you rearrange it to Ax + By = C, resulting in the equation 3x - 2y = -5, which is in standard form as requested.

To write the equation 5 - 2y = 3x in standard form, you want to arrange it to Ax + By = C, where A, B, and C are integers, and A should not be negative. Here's how you can do it:

Thus, the standard form of the equation is 3x - 2y = -5.

The required formula is  y = 6x e⁻ˣ for a function of the form y=bxe^−ax with the local maximum at (1,2.2073).

A function curve has peaks known as maxima. There can be an unlimited number of peaks.

The given function of the form as:

y = bxe⁻ᵃˣ   y' = be⁻ᵃˣ  (1-ax)

Plug point (x,y) = (1, 2.2073) into equation:  2.2073 = 6be⁻ᵃ

Now plug in y' = 0 at the same x value:  0 = be-6ᵃ(1-6a) or a = 1

and y' = be⁻ᵃ(-a + 1) = 0  giving a = 1

From first equation  2.2073 = b e⁻¹ so b = 2.2073e =  6

So the required formula is  y = 6x e⁻ˣ

To find b, plug an into the first equation. The sign of the first derivative shifts from + to -, indicating that it is a maximum critical point.

You may graph the equation using your constants and observe that the point (1, 2.2073) is the maximum.

Therefore, the required formula is  y = 6x e⁻ˣ.

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Answer:

C. The difference in length between Cassie’s longest and shortest practice sessions was greater than the difference in length between Jacqueline’s longest and shortest sessions.

Step-by-step explanation:

Answer:

x=7.

Step-by-step explanation:

To solve this you just hace to clear x from the equation and multipliead the other part of the equation by -84:

[tex]\frac{-6}{7} =\frac{-x}{84} \\x=\frac{6*-84}{7} \\x=\frac{504}{7}\\ x= 72[/tex]

So we know that the value of x in the equation will be 72,

The registration fee for a used car is 0.8% of the sale price of $5,700 as a result the registration fee is $ 45.60.

It's the ratio of two integers stated as a fraction of a hundred parts. It is a metric for comparing two sets of data, and it is expressed as a percentage using the percent symbol.

The usage of percentages is widespread and diverse. For instance, numerous data in the media, bank interest rates, retail discounts, and inflation rates are all reported as percentages. For comprehending the financial elements of daily life, percentages are crucial.

It is given that the registration fee for a used car is 0.8% of the sale price of $5,700,

The value of the registration fee is found as,

Registration fee = 0.8% of $5,700

Registration fee = (0.8/100) × $5,700

Registration fee = $ 45.6

Thus, the registration fee for a used car is 0.8% of the sale price of $5,700 as a result the registration fee is $ 45.60.

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The solution to the inequality x - 7.67 ≥ 8.4 is x ≥ 16.07, which is found by isolating x on one side of the inequality.

To solve this inequality, we need to isolate x on one side. The inequality is x - 7.67 ≥ 8.4. To get x by itself, we have to remove 7.67 from the left side of the inequality. We can do that by adding 7.67 to both sides of the inequality.

So, the revised equation is x - 7.67 + 7.67 ≥ 8.4 + 7.67. After simplifying, we get x ≥ 16.07. This is the solution to the inequality.

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The range of the first relation is {-5, -4, 2}, and the domain of the second relation is {-1, 1, 3}.

The range of a relation is the set of all second elements in each ordered pair. For the relation R = {(3, -5), (1, 2), (-1, -4), (-1, 2)}, the range is the set of second elements {-5, 2, -4, 2}. When we list the unique values, we get the range as {-5,-4, 2}.

The domain of a relation consists of all the first elements in each ordered pair. Given the relation R = {(3, -2), (1, 2), (-1, -4), (-1, 2)}, the domain is the set of first elements {3, 1, -1, -1}. The domain with unique values is {-1, 1, 3}.

Answer:3/28

Step-by-step explanation:

The probability that the first person chosen has a license and the second one does not is 15/56

A probability is a number that reflects the chance or likelihood that a particular event will occur.

Probabilities can be expressed as proportions that range from 0 to 1, and they can also be expressed as percentages ranging from 0% to 100%.

Given that, there are 8 people fishing at lake 5 have fishing licenses, and 3 do not. An inspector chooses two of the people at random. we need to find the probability that the first person chosen has a license and the second one does not

Let us consider the possibility of the first person not having a license, which is:

3/7

Now, after a person has been chosen, there will be 7 people remaining. Assuming that the first person chosen did not have a license, there will be 2 people left in the group without a license.

So, the probability of choosing a person without a license the second time will be:

3/7

In probability, when two events occur together (the word "and" is used), multiplication is carried out.

Therefore, we multiply the two probabilities to get:

5/8 x 3/7 = 15/56

Hence, The probability of choosing two people without a license is 15/56

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