please help plsssssss​

Prem purchased a plot for ₹1.1 lakh and its price increased at an annual rate of 5%.Ram's flat had a higher value than Prem's plot, Prem paid Ram the difference, which was ₹0.118 lakh or ₹11,800. Ram's flat is more valuable than Prem's plot of land

After two years, the value of Ram's flat would be ₹1.1 lakh + (10% of ₹1.1 lakh × 2 years) = ₹1.43 lakh.

Similarly, the value of Prem's plot of land would be ₹1.1 lakh + (5% of ₹1.1 lakh × 2 years) = ₹1.21 lakh.

Therefore, the difference in value between Ram's flat and Prem's plot of land is ₹1.43 lakh - ₹1.21 lakh = ₹22,000.

Ram would have to pay ₹22,000 to Prem as Ram's flat is more valuable than Prem's plot of land.

Ram purchased a flat for ₹1.1 lakh and its price increased at an annual rate of 10%. After two years, the flat's value would be:

1.1 lakh * (1 + 0.1)^2 = 1.1 lakh * 1.21 = ₹1.331 lakh

Prem purchased a plot for ₹1.1 lakh and its price increased at an annual rate of 5%. After two years, the plot's value would be:

1.1 lakh * (1 + 0.05)^2 = 1.1 lakh * 1.1025 = ₹1.213 lakh

After exchanging their properties, the difference in value is:

₹1.331 lakh (flat) - ₹1.213 lakh (plot) = ₹0.118 lakh

Since Ram's flat had a higher value than Prem's plot, Prem paid Ram the difference, which was ₹0.118 lakh or ₹11,800.

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Answer:

3/4

Step-by-step explanation:

9/12

divide top and bottom by 3

3/4

The equation for the ellipse in standard form with the center at the origin and a height of 3 units and width of 1 unit is given as follows:

x²/0.25 + y²/2.25 = 1

Considering the center at the origin, the format for the equation of the ellipse is given as follows:

x²/a² + y²/b² = 1.

The ellipse has a height of 3 units, hence the parameter b is given as follows:

2b = 3

b = 1.5.

Hence the square is of:

b² = 1.5² = 2.25.

The ellipse has a width of 1 unit, hence the parameter a is given as follows:

2a = 1

a = 0.5.

Then the square is of:

a² = 0.5² = 0.25.

Then the equation is given as follows:

x²/0.25 + y²/2.25 = 1

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Answer:

Step-by-step explanation:

f(x) = -2(x+3)^2 -1 would be the fourth graph because its translated 3 to the left, negative, and 1 down

f(x)=2(x+3)^2+1 would be the first graph since it's translated 3 to the left, positive, and shifted 1 up

f(x)=-2(x+3)^2+1 would be the second graph since it's translated 3 to the right, negative, and shifted 1 up

f(x)=2(x-3)^2+1 would be the third graph since it's translated 3 to the right, positive, and shifted 1 up

a) The standard deviation of T is the square root of the variance, which is SD(T) = sqrt(980) ≈ 31.3 months.

The rate of discovery of new beetle species can be modeled by a Poisson process with rate parameter λ = 1/7.0 new species per month. Let T be the time (in months) until 20 new species are discovered. Then T follows a gamma distribution with shape parameter k = 20 and rate parameter λ. The expected value of T is E(T) = k/λ = 20/(1/7.0) = 140 months. The variance of T is Var(T) = k/λ^2 = 20/(1/7.0)^2 = 980 months^2.

b) The probability that the supplement will be published within 10 years (120 months) is equal to the probability that T ≤ 120. Using the cumulative distribution function (CDF) of the gamma distribution, we can compute this probability as follows:

P(T ≤ 120) = F(120) = ∫[0,120] f(t) dt

where f(t) is the probability density function (PDF) of the gamma distribution, given by:

f(t) = λ^k * t^(k-1) * e^(-λt) / Gamma(k)

where Gamma(k) is the gamma function. Substituting the values of k, λ, and t, we get:

f(t) = (1/7.0)^20 * t^19 * e^(-t/7.0) / Gamma(20)

Using numerical integration or a software program, we can compute the integral:

P(T ≤ 120) ≈ 0.981

Therefore, the probability that the supplement will be published within 10 years is approximately 0.981, or 98.1%.

c) Alternatively, we can approximate the gamma distribution by a normal distribution using the central limit theorem, since the sample size (k = 20) is relatively large. The mean and standard deviation of the normal approximation are given by:

μ = E(T) = 140 months

σ = SD(T) = sqrt(980) ≈ 31.3 months

Using the standard normal distribution, we can standardize the random variable Z = (T - μ) / σ and compute the probability as follows:

P(T ≤ 120) = P(Z ≤ (120 - μ) / σ) ≈ P(Z ≤ (120 - 140) / 31.3) ≈ P(Z ≤ -0.64)

Using a standard normal table or a software program, we can find that the probability of Z being less than or equal to -0.64 is approximately 0.261. Therefore, the probability that the supplement will be published within 10 years using the normal approximation is approximately 0.261, which is lower than the exact probability obtained in part b). This is because the gamma distribution is not exactly symmetric and has a longer tail than the normal distribution, which makes the normal approximation less accurate in the tails of the distribution.

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The quadratic equation from the points is g(x) = x² + 5x + 4

From the question, we have the following parameters that can be used in our computation:

(-1,0), (-4, 0), and (1, 10).

A quadratic function is represented as

g(x) = a(x - x₁)(x - x₂)

Using the given points, we have

g(x) = a(x + 4)(x + 1)

Next, we have

a(1 + 4)(1 + 1) = 10

This gives

a = 1

So, we have

g(x) = (x + 4)(x + 1)

Expand

g(x) = x² + 5x + 4

Hence, the quadratic equation from the points is g(x) = x² + 5x + 4

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[tex]|\Omega|=6\\|A|=3\\\\P(A)=\dfrac{3}{6}=\dfrac{1}{2}[/tex]

Answer:

Step-by-step explanation: A represents 1, 3, 5, or a half of the numbers.

3/6 reduces to 1/2 final answer.

The number of triangles can be formed 84

A triangle is a polygon with three sides which consists of three vertices. A triangle can be formed from three given points only if the three points do not lie on a straight line and also form 180 degree angle.

Since the 3 points are distinct and lie on a circle, then it is not possible to have three points such that all three lie on a line.

Hence, we can use these 3 points to form triangles by selecting 3 points. The number of such ways is the number of different triangles we can form. Hence,

Triangles = [tex]C^9_3[/tex]

Triangles = [tex]\frac{9!}{3!(6!)}[/tex]

Triangles = 84

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Answer:

56°

Step-by-step explanation:

call the unknown side length L.

then 5² + L² = 9²

L² = 9² - 5²

    =81 - 25

    = 56

L =√56

(sin x)/√56  = (sin 90)/9

sin x = (√56 X sin 90)/9 = √56 /9

x = sin^-1 (√56 / 9)

  = 56.25°

  = 56° to nearest degree

According to the given information, the friend's clock showed that 1 hour and 27 minutes had passed between the time we left and the time we arrived. The kitchen clock needs to be adjusted 1 hour and 5 minutes back, which is equal to 65 minutes.

When we left the house, the kitchen clock was showing 10:06, but according to the friend's clock, the correct time was 10:28.

Therefore, we left the house 22 minutes before the correct time. When we arrived at the friend's house, their clock showed 11:55, which means that 1 hour and 27 minutes had passed since we left our house.

However, the kitchen clock was only showing 10:28 + 22 minutes = 10:50, which means that the kitchen clock was slow by 1 hour and 5 minutes.

To adjust the kitchen clock to the correct time, we need to move it back by 1 hour and 5 minutes, which is equal to 65 minutes. Therefore, the correct time on the kitchen clock should be 10:06 - 1 hour and 5 minutes = 9:01. By adjusting the clock back by 65 minutes, it will now show the correct time of 11:55 when we return home.

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The total number of copper (Cu) atoms in each face-centered cubic (FCC) unit cell is  7 atoms.

Here, we have,

In a face-centered cubic (FCC) unit cell, there are a total of 4 atoms.

Each corner of the unit cell contains 1/8th of an atom,

and since there are 8 corners in a cubic unit cell,

the total contribution from the corners is 8 * 1/8 = 1 atom.

Additionally, there is 1 atom located at the center of each face,

and since there are 6 faces in a cubic unit cell,

the contribution from the faces is 6 * 1 = 6 atoms.

Therefore, the total number of copper (Cu) atoms in each face-centered cubic (FCC) unit cell is 1 + 6 = 7 atoms.

Hence, 7 atoms of cu are present in each unit cell.

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Based on the information, we can infer that the dimensions of rectangle A are length = 2√6 cm and width = 3√2 cm, and the dimensions of rectangle B are length = 4√6 cm and width = √6 cm.

To find the dimensions of the rectangle we must take into account the dimensions of the square model as a reference to know the dimensions of the rectangle. Let's represent the dimensions of rectangle A as x and y, and the dimensions of rectangle B as z and w.

We know that the area of rectangle A plus the area of rectangle B equals 36 cm²:

We also know that the ratio of the area of rectangle A to rectangle B is 2:1:

We can use this ratio to write one of the dimensions of rectangle B in terms of one of the dimensions of rectangle A:

Substituting this expression into the first equation, we get:

Simplifying:

Now we can use the ratio again to find the values of z and w:

Substituting this into the area equation for rectangle B:

Solving for w:

Finally, we can find the values of x and y using the fact that xy = 24:

Substituting into the ratio expression for rectangle B:

Solving for x:

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The first car is at a Distance 1/80 units away from the starting end of the track when they pass. The second car is 79/80 units away from the starting end of the track when they pass.

Let's represent the distance traveled by the first car as a function of time, and the distance traveled by the second car as another function of time. We'll assume that the track is of length 1 unit (for simplicity).

The first car's distance as a function of time can be represented by the equation:

d1(t) = t/30

The second car's distance as a function of time can be represented by the equation:

d2(t) = 1 - t/50

To find when the cars pass each other, we need to find the time at which their distances are equal. So we set d1(t) = d2(t) and solve for t:

t/30 = 1 - t/50

Simplifying the equation:

50t = 30 - 30t

80t = 30

t = 30/80 = 3/8

Therefore, the cars pass each other at t = 3/8 seconds. To find the distance from each end of the track when they pass, we substitute this time value into either d1(t) or d2(t):

d1(3/8) = (3/8)/30 = 1/80

The first car is 1/80 units away from the starting end of the track when they pass. Since the track is of length 1 unit, the second car is 1 - 1/80 = 79/80 units away from the starting end of the track when they pass.

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Answer: These two ratios, 10/24 and 5/12 share a proportional relationship.

Step-by-step explanation:

Because when you divide the denominator and the numerator (10/24) by two they’ll equal the other ratio.

Answer:

25.

Step-by-step explanation:

The first thing we must note are thr rules of significant figures:

RULES FOR SIGNIFICANT FIGURES

1. All non-zero numbers ARE significant

2. Zeros between two non-zero digits ARE significant.

3. Leading zeros are NOT significant

4. Trailing zeros to the right of the decimal ARE significant

From this, we see the total amount of sig figs in 24.790000, which is every number, To round this to two sig figs, we just need to round to two places, which ends up being the tens and ones place to the left of the decimal. The answer would then be 25., with the decimal mark to denote that there are only two sig figs.

The probability that exactly 12 out of 22 pitches are strikes is approximately 0.18 (rounded to two decimal places).

To find the probability that exactly 12 out of 22 pitches are strikes, we can use the binomial probability formula. In this case, the probability of throwing a strike for each pitch is 0.431, and we want to calculate the probability of getting exactly 12 strikes out of 22 pitches.

Using the binomial probability formula, the probability of getting exactly 12 strikes out of 22 pitches is:

P(X = 12) = C(22, 12) * (0.431)^12 * (1 - 0.431)^(22 - 12)

where C(22, 12) represents the number of ways to choose 12 strikes out of 22 pitches.

Calculating this probability, we find:

P(X = 12) = 22! / (12! * (22 - 12)!) * (0.431)^12 * (1 - 0.431)^(22 - 12)

P(X = 12) ≈ 0.1832

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Answer:

First we put the number in order

(1 3 3 3 4 4 5 7 8 8 9)

The mode is the number that appears the most.

from the above order 3 is repeated more so 3 is the mode

The median is the middle value of a set of numbers.

from (1 3 3 3 4 4 5 7 8 8 9) the middle value is 4 so the median is 4

⇒Then the product of the mode and median

3*4=12

Here is a paragraph about the transformations I used to create my logo.

I started with a basic shape, a square. I then reflected the square across the horizontal axis, creating a mirror image. I then translated the reflected square up and to the right, creating a new shape. I then rotated the new shape 45 degrees, creating a third shape. The third shape is symmetric, meaning that it can be divided into two identical halves.

I then used these three shapes to create my logo. I used the first shape as the background, the second shape as the foreground, and the third shape as the logotype. I chose these shapes because they represent the three stages of transformation: the beginning, the middle, and the end.

The reflection represents the beginning of the transformation, when something is changed from its original state. The translation represents the middle of the transformation, when something is in the process of being changed. The rotation represents the end of the transformation, when something has been completely changed.

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The Rule for the dilation is (x, y) → (2x, 2y).

The rule that best represents the dilation applied to Triangle E to create Triangle F is:

(x, y) → (2x, 2y)

This rule shows that the dilation is centered at the origin and has a scale factor of 2, which means that all the coordinates of Triangle E are multiplied by 2 to obtain the corresponding coordinates of Triangle F.

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A function is a relation between a set of inputs (called the domain) and a set of outputs (called the range) where each input is associated with exactly one output.

Out of the given options, the function is:

y = 2x + 1

In this equation, for every value of x, there is a unique corresponding value of y. Therefore, it satisfies the definition of a function.

The other options:

Answer: In how many ways can Tom paint the fence if no two neighboring panels can be painted the same color?

Step-by-step explanation:

There are a total of 120 ways to paint the fence with no two neighboring panels painted the same color.

To see why, consider the first panel. Tom can paint it any of the 5 colors. Without loss of generality, assume that he paints it red.

For the second panel, he can choose any of the 4 remaining colors (since he cannot use red again). Without loss of generality, assume that he paints it yellow.

For the third panel, he can choose any of the 3 remaining colors (since he cannot use red or yellow again). Without loss of generality, assume that he paints it green.

For the fourth panel, he can choose any of the 2 remaining colors (since he cannot use red, yellow, or green again). Without loss of generality, assume that he paints it blue.

For the fifth panel, he can choose the only remaining color (since he cannot use red, yellow, green, or blue again). Without loss of generality, assume that he paints it white.

Therefore, there are 5 × 4 × 3 × 2 × 1 = 120 ways to paint the fence with no two neighboring panels painted the same color.

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The value of the height is   10/3 cm

First, we need to know that the formula for calculating the volume of a cylinder is expressed as;

V = πr²h

Such that the parameters are expressed as;

Now, substitute the values, we have that;

r = 12cm

Volume = 480π cm³

Then,

480π = 144π × h

divide both sides by the coefficient of h, we get;

h = 480π/144π

h = 40/12

h = 20/6

h = 10/3 cm

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The Area of ΔABC is 98 cm2.  

The area of the triangle, we can use the formula:

A = 0.5 * b * c * sin(A)

where A is the angle between sides b and c.

Given that b = 28 cm, c = 14 cm, and m∠A = 30°, we can calculate sin(A) as follows

sin(A) = sin(30°) = 0.5

Substituting the values in the formula, we get:

A = 0.5 * 28 * 14 * 0.5 = 98 cm2

Therefore, the area of ΔABC is 98 cm2.

Hence, the correct option is: 98 cm2.

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The perimeter of the rhombus is 4√117 feet.

What is rhombus?

A rhombus is a special type of quadrilateral (a polygon with four sides) where all four sides are equal in length. It is also known as a diamond shape because of its symmetrical appearance.

In a rhombus, the diagonals are perpendicular bisectors of each other. This means that they divide the rhombus into four congruent right triangles.

Let's denote the length of one diagonal as d1 and the length of the other diagonal as d2. In this case, d1 = 18 feet and d2 = 12 feet.

Each right triangle formed by the diagonals has legs equal to half the lengths of the diagonals. Therefore, the lengths of the legs are d1/2 = 18/2 = 9 feet and d2/2 = 12/2 = 6 feet.

Using the Pythagorean theorem, we can find the length of the hypotenuse of each right triangle, which is also a side of the rhombus.

[tex]h^2 = (leg1)^2 + (leg2)^2\\\\h^2 = 9^2 + 6^2\\\\h^2 = 81 + 36\\\\h^2 = 117[/tex]

Taking the square root of both sides:

h = √117

Since the rhombus has four congruent sides, the perimeter is given by:

Perimeter = 4 * h = 4 * √117

Thus, the perimeter of the rhombus is 4√117 feet.

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To find the three numbers, we need to use the information given about their mean, median, and range. Since the median is 18, we know that the middle number of the three must be 18. Also, since the mean is 20, the sum of the three numbers must be 3 times 20, which is 60. So, the 3 numbers are 16, 18, and 26.

Let's call the smallest number x, then the largest number must be x+10 since the range is 10.
Now we can set up an equation to solve for x. We know that the sum of the three numbers is 60, so we can write:
x + 18 + (x+10) = 60
Simplifying this equation gives:
2x + 28 = 60
Subtracting 28 from both sides gives:
2x = 32
Dividing by 2 gives:
x = 16

Therefore, the three numbers are 16, 18, and 26.
Given the information provided, we know the following:
1. Mean of 3 numbers is 20.
2. Median of the 3 numbers is 18.
3. Range (largest - smallest) is 10.
Since there are 3 numbers and the median is 18, the middle number is 18. Let's call the smallest number "x" and the largest number "y". We can now write two equations:
1. (x + 18 + y) / 3 = 20
2. y - x = 10
We can simplify the first equation to find the sum of the 3 numbers:
x + 18 + y = 60
Now, we can solve for x in the second equation:
x = y - 10
Substituting the value of x in the first equation:
(y - 10) + 18 + y = 60
Solving for y:
2y = 52
y = 26
Now, we can find the value of x:
x = 26 - 10
x = 16
So, the 3 numbers are 16, 18, and 26.

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The cost of the burger was approximately $2.19, the cost of the souvenir was approximately $8.

let's first assign variables to the cost of each item. let b be the cost of the burger, s be the cost of the souvenir, and p be the cost of the pass.

from the problem, we know that:

b + s + p = 40.50   (total cost of all three items)b = (1/4)s        (the burger cost one-fourth the price of the souvenir)

s = (2/3)p        (the souvenir cost two-thirds the price of the pass)b + s + p + 2.00 = 40.50  (tim had $2.00 left over)

we can use substitution to solve for the unknown variables.

substituting b = (1/4)s and s = (2/3)p into the first equation, we get:

(1/4)s + s + (2/3)p = 40.50

multiplying both sides by 12 to eliminate the fractions, we get:

3s + 12s + 8p = 486

simplifying, we get:

15s + 8p = 486

substituting s = (3/2)p into the above equation, we get:

15(3/2)p + 8p = 486

simplifying further, we get:

37p = 486

solving for p, we get:

p = 486/37

p ≈ 13.14

now that we know the cost of the pass, we can use the second equation to find the cost of the souvenir:

s = (2/3)p = (2/3)(13.14) ≈ 8.76

finally, we can use the first equation to find the cost of the burger:

b = (1/4)s = (1/4)(8.76) ≈ 2.19 76, and the cost of the pass was approximately $13.14.

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The unknown height of the student on the team, given the stem and leaf plot, would be 60 inches

To find the unknown height, we first have to list the heights of the known students on the team. From the stem and leaf plot, the heights are :

57, 59, 62, 65, 68, 70

The mean height of all the students is 63 inches which means that if this mean is denoted as x, the unknown height would be:

63  = ( 57 + 59 + 62 + 65 + 68 + 70 + x ) / 7

Solving for x gives:

7 x 63 = ( 381 + x )

441 = 381 + x

x = 441 - 381

x = 60 inches

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Candice ran the most consistent number of laps each day based on the mean absolute deviation.

let's calculate the mean number of laps for each friend:

Candice: (5 + 6 + 8 + 5 + 7) / 5 = 31 / 5 = 6.2 laps

Malaya: (4 + 5 + 3 + 3 + 5) / 5 = 20 / 5 = 4 laps

Zoe: (7 + 8 + 6 + 8 + 8) / 5 = 37 / 5 = 7.4 laps

Next, we calculate the absolute deviation of each data point from the mean for each friend:

Candice: |5 - 6.2| = 1.2, |6 - 6.2| = 0.2, |8 - 6.2| = 1.8, |5 - 6.2| = 1.2, |7 - 6.2| = 0.8

Malaya: |4 - 4| = 0, |5 - 4| = 1, |3 - 4| = 1, |3 - 4| = 1, |5 - 4| = 1

Zoe: |7 - 7.4| = 0.4, |8 - 7.4| = 0.6, |6 - 7.4| = 1.4, |8 - 7.4| = 0.6, |8 - 7.4| = 0.6

Now, we calculate the MAD for each friend by taking the average of the absolute deviations:

Candice: (1.2 + 0.2 + 1.8 + 1.2 + 0.8) / 5 = 0.6 laps

Malaya: (0 + 1 + 1 + 1 + 1) / 5 = 0.8 laps

Zoe: (0.4 + 0.6 + 1.4 + 0.6 + 0.6) / 5 = 0.72 laps

Comparing the MAD values, we see that Candice has the lowest MAD (0.6 laps), followed by Zoe (0.72 laps), and Malaya (0.8 laps).

Therefore, Candice ran the most consistent number of laps each day based on the mean absolute deviation.

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The table shows the number of laps Candice and her two friends ran each day for five days. which friend ran the most consistent number of laps each day? use the mean absolute deviation to construct an argument to justify the answer

Girl           Day 1        Day 2         Day 3       Day 4      Day 5

Candice       5             6                 8            5               7

Malaya          4             5                3            3                5

Zoe               7             8                6              8               8