Give some memes please

Answer: uhhhhhhhhhhhhhhhhhhh whats the question?

Step-by-step explanation:

9514 1404 393

Answer:

  15/28

Step-by-step explanation:

We can rearrange the problem a bit and make it a little simpler.

  1 2/7 - 3/4 = (1 -3/4) + 2/7 = 1/4 + 2/7

  = (7+4·2)/(4·7) = 15/28

_____

The sum of fractions can always be found by ...

  [tex]\dfrac{a}{b}+\dfrac{c}{d}=\dfrac{ad+bc}{bd}\\\\\dfrac{1}{4}+\dfrac{2}{7}=\dfrac{1\cdot7+4\cdot2}{4\cdot7}=\dfrac{7+8}{28}=\dfrac{15}{28}[/tex]

The relation ‘equal to’ is an equivalence relation on A.

a) To give an example of an onto function f: A → B, we need to ensure that every element in set B is mapped to from set A. Since set B has three elements (5, 6, 7) and set A has four elements (1, 2, 3, 4), it is impossible to have an onto function from A to B.

This is because there are more elements in A than in B, so at least one element in B will not have a corresponding element in A.

b) A function g: A → B is a one-to-one function if each element of set A is paired with a distinct element in set B. Let us create a table to get the one-to-one function g.

Table of one-to-one function gA1234B5677The function g: A → B can be defined by g(1) = 5, g(2) = 6, g(3) = 7 and g(4) = 7.

Hence, this is a one-to-one function.

c) An equivalence relation is a relation that is reflexive, symmetric, and transitive.

We can define an equivalence relation on set A using the relation ‘equal to’. Every element of set A is equal to itself, i.e., ∀ a ∈ A, a = a.

Hence, this is a reflexive relation on A. Also, if a and b are two elements of A such that a = b, then b = a.

Hence, this is a symmetric relation on A. Also, if a, b, and c are three elements of A such that a = b and b = c, then a = c. Hence, this is a transitive relation on A.

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The maximum value of the objective function Z is 1800. The optimal values for the decision variables are X1 = 10, X2 = 0, and X3 = 0. The constraints are satisfied, and the optimal solution has been reached using the Simplex Method.

To compute the given problem using the Simplex Method, we need to convert it into a standard form.

The standard form of a linear programming problem consists of maximizing or minimizing a linear objective function subject to linear inequality constraints and non-negativity constraints.

Let's rewrite the problem in standard form:

Maximize:

Z = 50X1 + 20X2 + 10X3

Subject to the constraints:

2X1 + 4X2 + 5X3 <= 200

X1 + X3 <= 90

X1 + 2X2 <= 30

X1, X2, X3 >= 0

To convert the problem into standard form, we introduce slack variables (S1, S2, S3) for each constraint and rewrite the constraints as equalities:

2X1 + 4X2 + 5X3 + S1 = 200

X1 + X3 + S2 = 90

X1 + 2X2 + S3 = 30

Now, we have the following equations:

Objective function:

Z = 50X1 + 20X2 + 10X3 + 0S1 + 0S2 + 0S3

Constraints:

2X1 + 4X2 + 5X3 + S1 = 200

X1 + X3 + S2 = 90

X1 + 2X2 + S3 = 30

X1, X2, X3, S1, S2, S3 >= 0

Next, we will create a table representing the initial simplex tableau:

  | X1 | X2 | X3 | S1 | S2 | S3 | RHS |

---------------------------------------

Z  | 50 | 20 | 10 | 0  | 0  | 0  | 0   |

---------------------------------------

S1 | 2  | 4  | 5  | 1  | 0  | 0  | 200 |

---------------------------------------

S2 | 1  | 0  | 1  | 0  | 1  | 0  | 90  |

---------------------------------------

S3 | 1  | 2  | 0  | 0  | 0  | 1  | 30  |

---------------------------------------

To compute the optimal solution using the Simplex Method, we'll perform iterations by applying the simplex pivot operations until we reach an optimal solution.

Iterating through the simplex method steps, we can find the following tableau:

  | X1 | X2 | X3 | S1 | S2 | S3 | RHS |

---------------------------------------

Z  | 0  | 40 | 10 | 0  | 0  | -500| 1800|

---------------------------------------

S1 | 0  | 3  | 5  | 1  | 0  | -40 | 120  |

---------------------------------------

S2 | 1  | 0  | 1  | 0  | 1  | 0   | 90   |

---------------------------------------

X1 | 0  | 2  | 0  | 0  | 0  | -1  | 10   |

---------------------------------------

The optimal solution is Z = 1800, X1 = 10, X2 = 0, X3 = 0, S1 = 120, S2 = 90, S3 = 0.

Therefore, the maximum value of Z is 1800, and the values of X1, X2, and X3 that maximize Z are 10, 0, and 0, respectively.

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Using the identities to find values of the sine and cosine functions of the function the angle measure,

cos 2x = 1

sin 2x = -8√17/17.

Given that tan x = -4, we can determine the values of cos 2x and sin 2x.

Using the identity tan x = sin x / cos x, we have sin x = -4 cos x.

Now, we can use the Pythagorean identity sin² x + cos² x = 1 to solve for cos x:

(-4 cos x)² + cos² x = 1

16 cos² x + cos^2 x = 1

17 cos² x = 1

cos² x = 1/17

cos x = ± √(1/17)

Since we know that cos x > 0, we take cos x = √(1/17).

Next, we can find sin x using sin x = -4 cos x:

sin x = -4 × √(1/17) = -4/√17 = -4√17/17.

Now, we can find cos 2x and sin 2x using the double angle identities:

cos 2x = cos² x - sin² x = (1/17) - (-16/17) = 17/17 = 1

sin 2x = 2 sin x cos x = 2 × (-4√17/17) × √(1/17) = -8√17/17.

Therefore, cos 2x = 1 and sin 2x = -8√17/17.

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Answer:

3,360 different codes.

Step-by-step explanation:

Here we have a set of 8 numbers:

{0, 0, 1, 5, 8, 9, 9, 9}

Now we want to make an 8th digit code with those numbers (each number can be used only once)

Now let's count the number of options for each digit in the code.

For the first digit, we will have 8 options

For the second digit, we will have 7 options (because one was already taken)

For the third digit, we will have 6 options (because two were already taken)

you already can see the pattern here:

For the fourth digit, we will have 5 options

For the fifth digit, we will have 4 options

For the sixth digit, we will have 3 options

For the seventh digit, we will have 2 options

For the eighth digit, we will have 1 option.

The total number of codes will be equal to the product between the numbers of options for each digit, then we have that the total number of codes is:

N = 8*7*6*5*4*3*2*1 = 8!

But wait, you can see that the 9 is repeated 3 times (then we have 3*2*1 = 3! permutations for the nines), and the 0 is repeated two times (then we have 2*1 = 2! permutations for the zeros).

Then we need to divide the number of different codes that we found above by 3! and 2!.

We get that the total number of different codes is:

C = [tex]\frac{8!}{2!*3!} = \frac{8*7*6*5*4}{2} = 8*7*6*5*2 = 3,360[/tex]

3,360 different codes.

The number of eight digit code she can make is, 3360.

If any number have n digits, then number of ways it can be arranged = [tex]n![/tex]

Given that,  Born date is,  08/05/1999

Total number of digits in birth date =  8

So, number of ways it can be arranged = [tex]8![/tex]

Since, In birth date 9 is three times and 0 is two times.

Therefore, number of arrangements = [tex]\frac{8!}{3!*2!}=3360[/tex]

Therefore, she can make 3360 eight digit codes from given birth date.

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To interpolate the function f(x) = x ln(2+1) by a second-order polynomial on equidistant nodes on the interval (0,1), we can use the Lagrange interpolation formula.

To interpolate f(T) by a second-order polynomial on equidistant nodes on (0,1), we need three equidistant nodes. Let's denote these nodes as x₀, x₁, and x₂, with x₀ = 0, x₁ = h, and x₂ = 2h, where h = (1-0)/2 = 1/2.

We can construct the Lagrange polynomial P₂(x) of degree 2 that interpolates f(x) at these nodes. The Lagrange interpolation formula for P₂(x) is:

P₂(x) = f(x₀) × L₀(x) + f(x₁) × L₁(x) + f(x₂) × L₂(x)

where L₀(x), L₁(x), and L₂(x) are the Lagrange basis polynomials.

Using the given function f(x) = x ln(2+1), we can evaluate f(x₀), f(x₁), and f(x₂). Plugging these values into the Lagrange interpolation formula, we obtain the second-order polynomial interpolation for f(T).

To estimate the error, we can use the error formula for polynomial interpolation. The error term E(x) is given by:

E(x) = f(x) - P₂(x)

To calculate the error, we would need to evaluate the derivative of f(x) and find its maximum value on the interval (0,1). However, without knowing the interval (T), we cannot estimate the error.

In summary, we can interpolate f(T) by a second-order polynomial on equidistant nodes on (0,1) using the Lagrange interpolation formula. However, without specifying the interval (T), it is not possible to estimate the error.

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Answer:

I believe the answer is y=4x+4

Step-by-step explanation:

because the 4 that is on the  Y axis is the Y axis

and the 4 on the x axis will be the one with the variable

Hopefully this helps.

Answer:

9 units

Step-by-step explanation:

got it right on edg

Answer:

The two numbers that multiply to -5 and add to 4 are:

5 and -1

Step-by-step explanation:

5 • -1= -5

5 - 1= 4

Answer:

True

Step-by-step explanation:

The p-value can be calculated to test the null hypothesis that the average running time of HP laptops is 120 minutes against the alternative hypothesis that it is not equal to 120 minutes.

The p-value for testing the hypothesis that the average time for the HP laptops is not equal to 120 minutes can be calculated using a t-test. Given a sample mean of 122 minutes, a sample size of 60, a null hypothesis mean of 120 minutes, and a standard deviation of 25 minutes, we can calculate the t-value and find the corresponding p-value.

To calculate the t-value, we use the formula: t = (sample mean - null hypothesis mean) / (sample standard deviation / sqrt(sample size))

Plugging in the values, we get: t = (122 - 120) / (25 / sqrt(60))

Calculating the t-value, we find t ≈ 0.894

To find the p-value associated with this t-value, we can refer to a t-distribution table or use statistical software. The p-value represents the probability of observing a t-value as extreme as the one obtained, assuming the null hypothesis is true.

Since the p-value (0.757) is greater than the commonly used significance level of 0.05, we fail to reject the null hypothesis. This suggests that there is not enough evidence to conclude that the average running time of HP laptops is significantly different from 120 minutes.

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The higher Variability in the math book data, it is not a valid inference to conclude that the grammar book has more words per page solely based on the mean comparison.

Based on the given information, the valid inference would be:

d) No, because the mean is larger in the grammar book.

The mean number of words per page in the grammar book is 49.7, while the mean number of words per page in the math book is 34.5. Since the mean in the grammar book is larger, Macy's claim seems valid at first glance. However, it is important to consider other factors such as the variability in the data.

The mean absolute deviation (MAD) provides a measure of the variability or spread of the data. In this case, the MAD for the grammar book is 18.4, while the MAD for the math book is 41.9. The fact that the MAD for the math book is significantly higher indicates that there is more variability in the number of words on each page in the math book.

This high variability in the math book data suggests that there could be pages with a significantly higher number of words, even though the mean is lower. On the other hand, the lower MAD for the grammar book suggests that the number of words per page in the grammar book is more consistent.

Therefore, considering the higher variability in the math book data, it is not a valid inference to conclude that the grammar book has more words per page solely based on the mean comparison.

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Answer:

use the link it helps alot

1. The population of interest are all named storms that have made landfall in the United States since 2000.

2. The parameter of interest is the mean µ of sustained wind speed of the storms. Therefore, the correct answer is option B.  

The other options are not correct as follows:

Option A. The average π sustained wind speed of the storms at the time they made landfall - The term "average" is equivalent to "mean." However, π is not applicable since it denotes the constant 3.14159....

Option C. The proportion µ of the wind speed of storm - Proportion refers to a fraction or percentage of a whole, so this answer is illogical because µ denotes the mean.

Option D. The mean µ of sustained wind speed of the storms - This answer is wrong because it is not the correct order.

Option E. The proportion π of the number of storms with high wind speed - This answer is incorrect since π denotes the constant 3.14159..., and it is not applicable in this context.

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The population of interest is all named storms that have made landfall in the United States since 2000. The parameter of interest would be the mean sustained wind speed of the storms at the time they made landfall, as you're seeking the average wind speed at the moment of landfall.

The population of interest refers to the complete group of individuals or cases that a researcher is interested in studying. In this case, it would be all named storms that have made landfall in the United States since 2000.

The parameter of interest is a numerical measure that describes a characteristic of a population. Based on the information in question 1, the parameter of interest would be D. The mean µ sustained wind speed of the storms at the time they made landfall. This is because you're interested in knowing the average wind speed of the storms at the moment they hit the land, not the proportion of storms with high wind speed or any other aspect of the storms.

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There is no region in the complex plane to shade for the given inequality.

To shade the region in the complex plane defined by {z ∈ C: 2+2+2i| ≤ 2}, let's break down the problem step by step.

The inequality given is: |2+2+2i| ≤ 2

First, let's simplify the expression within the absolute value:

2 + 2 + 2i = 4 + 2i

The inequality now becomes: |4 + 2i| ≤ 2

To find the absolute value of a complex number z = a + bi, we use the formula: |z| = √(a² + b²)

Applying this formula to our complex number, we have:

|4 + 2i| = √(4² + 2²) = √(16 + 4) = √20 = 2√5

Now the inequality becomes: 2√5 ≤ 2

To solve for √5, we divide both sides of the inequality by 2:

√5 ≤ 1

Since the square root of 5 is approximately 2.236, and it is not less than or equal to 1, the inequality is not satisfied.

Therefore, there is no region in the complex plane to shade for the given inequality.

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Incorrect. We are 95% confident that the interval from 26.2 and 27.4 captures the BMI of all young American women is the correct interpretation of the confidence interval.

A 95% confidence interval is a range of values that we can be 95% sure contains the true mean of the population. The 95% confidence interval for the mean body mass index (BMI) of young American women is 26.8 ± 0.6.

This means that we are 95% confident that the true mean BMI of young American women is between 26.2 and 27.4.

Consequently, the statement, "The mean BMI of young American women cannot be 28" is incorrect as the confidence interval does not include the value 28.

However, this does not imply that the true mean BMI of young American women cannot be 28.

A confidence interval is a statistical range that provides an estimate of the possible values for an unknown population parameter, such as a mean or proportion, based on a sample from that population. It provides a range of values within which the true population parameter is likely to fall, along with a specified level of confidence.

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Answer:

so so so sorry I usually don't do this but you know

Step-by-step explanation:

should have never be a

Answer:

Step-by-step explanation:

Hi

Answer:

15

Step-by-step explanation:

The ratio of (the foot of the ladder to the person) : (the person's height) is equal to (the wall to the foot of the ladder) : (the height of the wall) because the triangles are similar. So, if you solve the problem you will get:

(x= the height of the wall)

6:6 = 6+9:x

6:6 = 15:x

1:1=15:x

x=15

The height of the wall is 15 feet.

the volume of the solid within the cone is ρ²(12sin⁴(φ) - 11sin²(φ) + 3) = 0

To find the volume of the solid within the cone and between the spheres using spherical coordinates, we need to determine the limits of integration for the variables ρ, θ, and φ.

In spherical coordinates, we have the following relationships:

x = ρsin(φ)cos(θ)

y = ρsin(φ)sin(θ)

z = ρcos(φ)

Given:

Cone equation: z = 13x² + 3y²

Sphere equation: x² + y² + z² = 4

Plane equation: x + y + z = 25

First, let's determine the limits for the variable ρ:

Since we are dealing with spheres, we can set ρ to range from 0 to the radius of the larger sphere, which is 2.

0 ≤ ρ ≤ 2

Next, let's determine the limits for the variable θ:

The solid lies within the entire range of θ, which is from 0 to 2π.

0 ≤ θ ≤ 2π

Finally, let's determine the limits for the variable φ:

To find the limits for φ, we need to consider the intersection between the cone and the spheres.

1. Intersection of the cone and the larger sphere:

Substituting the equations of the cone and the larger sphere, we get:

13x² + 3y² = 4 - x² - y² - z²

12x² + 4y² + z² = 4

12(ρsin(φ)cos(θ))² + 4(ρsin(φ)sin(θ))² + (ρcos(φ))² = 4

12ρ²sin²(φ)cos²(θ) + 4ρ²sin²(φ)sin²(θ) + ρ²cos²(φ) = 4

ρ²(12sin²(φ)cos²(θ) + 4sin²(φ)sin²(θ) + cos²(φ)) = 4

ρ²(12sin²(φ)(1 - sin²(θ)) + cos²(φ)) = 4

ρ²(12sin²(φ) - 12sin²(φ)sin²(θ) + cos²(φ)) = 4

ρ²(12sin²(φ) - 12sin²(φ)(1 - cos²(θ)) + cos²(φ)) = 4

ρ²(12sin²(φ) - 12sin²(φ) + 12sin²(φ)cos²(θ) + cos²(φ)) = 4

ρ²(12sin²(φ)cos²(θ) + cos²(φ)) = 4

We need to solve this equation for ρ. Simplifying further:

ρ²(12sin²(φ)cos²(θ) + cos²(φ)) = 4

ρ²(12sin²(φ)(1 - sin²(φ)) + cos²(φ)) = 4

ρ²(12sin²(φ) - 12sin⁴(φ) + cos²(φ)) = 4

ρ²(12sin²(φ) - 12sin⁴(φ) + 1 - sin²(φ)) = 4

ρ²(11sin²(φ) - 12sin⁴(φ) + 1) = 4

ρ²(12sin⁴(φ) - 11sin²(φ) + 3) = 0

Since ρ cannot be negative

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a) The function gof is gof(x) = 3x + 3.

b) The function gof: RR is well-defined.

a. The value of function gof(x) = 3x + 3.

To find the composition gof, we substitute the expression for g into f:

gof(x) = f(g(x))

= f(x + 1)

= 3(x + 1)

= 3x + 3

b. To prove that gof is both one-to-one and onto, we need to show the following:

(i) One-to-one: For any two different inputs x1 and x2, if gof(x1) = gof(x2), then x1 = x2.

(ii) Onto: For every y in the range of gof, there exists an x such that gof(x) = y.

Proof of one-to-one:

Let x1 and x2 be two different inputs. Assume that gof(x1) = gof(x2).

Then, 3x1 + 3 = 3x2 + 3.

Subtracting 3 from both sides, we have 3x1 = 3x2.

Dividing both sides by 3, we obtain x1 = x2.

Therefore, gof is one-to-one.

Proof of onto:

Let y be any real number in the range of gof, which is the set of all real numbers.

We need to find an x such that gof(x) = y.

Consider the equation 3x + 3 = y.

Subtracting 3 from both sides, we have 3x = y - 3.

Dividing both sides by 3, we obtain x = (y - 3)/3.

Thus, for any y in the range of gof, we can find an x such that gof(x) = y.

Therefore, gof is onto.

Since gof is both one-to-one and onto, it is a bijection.

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Answer:

24

Explanation: base times height divided by 2

Answer:

D) 24

Step-by-step explanation:

Area of a triangle:

A = 1/2bh

Given:

b = 12

h = 4

Work:

A = 1/2bh

A = 1/2(12)(4)

A = 6(4)

A = 24

Answer:

Hi! The other answer is not correct to your question

The answer to your question is n= [tex]\frac{dc}{(c+d)(c-d)}[/tex]

Step-by-step explanation:

Solve the rational equation by combining expressions and isolating the variable n

※※※※※※※※※※※※※※※

⁅Brainliest is greatly appreciated!⁆

- Brooklynn Deka

Hope this helps!!

Answer: D. There are at least two oatmeal cookies next to each other.

Step-by-step explanation:

Alright so basically we can use process of elimination to determine what is true or false so

A. States the farthest to the left is chocolate but we can't prove that because all we know is the cookie farthest to the right is chocolate so this is false

B. Same reason as A we cannot prove what cookie is farthest to the left because we are not given a pattern so B is false

C. Since there are definitely twice as many girls as boys in the class and that also means there are twice as many oatmeal cookies then we cannot prove that 2 chocolate cookies have to be next to each other so also false

D. This has to be true because if there are twice as many girls as boys and more oatmeal than chocolate then is whatever cookie line combinataion we will have at least 2 oatmeal cookies next to each other So this is true

E. This is most definitely not true because the question tells us that twice as many girls gave him oatmeal so if anything there are more oatmeal cookies