2x²+8x-24=0 formula general

The Laplace transform of the given function is F(s) = 25/(s^5) + 5/(s^4) e^(-s).

To find F(s), we need to take the Laplace transform of the given function. We have:

U(t – 1) = 1/s e^(-s)

Applying the product rule of Laplace transform, we get:

L{5t(5t + 1)U(t – 1)} = L{5t(5t + 1)} * L{U(t – 1)}

Now, we need to find the Laplace transform of 5t(5t + 1). We have:

L{5t(5t + 1)} = 5L{t} * L{5t + 1} = 5(1/s^2) * (5/s + 1/s^2)

Simplifying the expression, we get:

L{5t(5t + 1)} = 25/(s^4) + 5/(s^3)

Substituting L{5t(5t + 1)} and L{U(t – 1)} back into the original equation, we get:

F(s) = (25/s^4 + 5/s^3) * (1/s e^(-s))

Simplifying the expression further, we get:

F(s) = 25/(s^5) + 5/(s^4) e^(-s)

Therefore, the Laplace transform of the given function is F(s) = 25/(s^5) + 5/(s^4) e^(-s).

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Answer:

D. a rational number and a terminating decimal.

The number 1.381432 is a rational number and a non-repeating decimal. A rational number is a number that can be expressed as a ratio of two integers. In this case, 1.381432 can be expressed as the ratio of 1381432/1000000, which can be simplified to 689/500. It is also a non-repeating decimal, meaning that the decimal digits do not repeat in a pattern, but rather continue on without repetition. Therefore, the correct answer is not option C, which suggests that a number is a rational number and a repeating decimal.

The analytic solution is y(x) = (1/9)sin(3x) - (1/9)sin(3). This solution is unique since there are no arbitrary constants remaining after applying the boundary conditions.

The given differential equation is:

y''(x) = sin(3x)

We can solve this by first finding the general solution to the homogeneous equation y''(x) = 0, which is simply y(x) = Ax + B, where A and B are constants determined by the boundary conditions.

Next, find a particular solution to the non-homogeneous equation y''(x) = sin(3x).

Since sin(3x) is a trigonometric function, we can try a particular solution of the form y(x) = Csin(3x) + Dcos(3x), where C and D are constants to be determined.

Taking the first and second derivatives of this expression:

y'(x) = 3Ccos(3x) - 3Dsin(3x)

y''(x) = -9Csin(3x) - 9Dcos(3x)

Substituting these into the original equation:

-9Csin(3x) - 9Dcos(3x) = sin(3x)

Equating coefficients of sin(3x) and cos(3x):

-9C = 1 and -9D = 0

Solving for C and D:

C = -1/9 and D = 0

So, the particular solution is:

y(x) = (-1/9)sin(3x)

Therefore, the general solution to the non-homogeneous equation is:

y(x) = Ax + B - (1/9)sin(3x)

Using the boundary conditions y(0) = 0 and y() = 0:

0 = A + B

0 = A - (1/9)sin(3)

Solving for A and B:

A = (1/9)sin(3) and B = -(1/9)sin(3)

So, the final analytic solution is:

y(x) = (1/9)sin(3x) - (1/9)sin(3)

The solution is unique, as there are no arbitrary constants remaining after applying the boundary conditions.

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If you know the final velocity of the train and its acceleration, you can use this formula to find the distance that the train traveled at a velocity greater than 30 m/s.

To determine the distance that the train traveled at a velocity greater than 30 m/s, we need to know the time during which the train maintained this velocity. Let's assume that the train traveled at a constant velocity of 30 m/s or greater for a time t.

We can use the formula for distance traveled, which is given by:

Distance = Velocity x Time

So, the distance that the train traveled during the time t at a velocity greater than 30 m/s can be calculated as:

Distance = (Velocity > 30 m/s) x t

However, we don't know the exact value of t yet. To find this out, we need more information. Let's assume that the train started from rest and accelerated uniformly to reach a velocity of 30 m/s, and then continued to travel at this velocity or greater for a certain time t.

In this case, we can use the formula for uniform acceleration, which is given by:

Velocity = Initial Velocity + Acceleration x Time

Since the train started from rest, its initial velocity (u) is 0. So we can rewrite the above formula as:

Velocity = Acceleration x Time

Solving for time, we get:

Time = Velocity / Acceleration

Now, we need to find the acceleration of the train. Let's assume that the train's acceleration was constant throughout its motion. In that case, we can use the following formula:

Acceleration = (Final Velocity - Initial Velocity) / Time

Since the train's final velocity (v) was greater than 30 m/s and its initial velocity (u) was 0, we can simplify the above formula as:

Acceleration = v / t

Now we have two equations:

   • Distance = (Velocity > 30 m/s) x t

   • Acceleration = v / t

Combining them, we get:

Distance = (Velocity > 30 m/s) x (v / Acceleration)

Substituting the given values and simplifying, we get:

Distance = (v² - 900) / (2a)

where v is the final velocity of the train in m/s, and a is the acceleration of the train in m/s².

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b. The value of x is 9

c. The probability that a student picked had just played two games = 11/20

A set is the mathematical model for a collection of different things.

If G represent Gaelic football

R represent Rugby

S represent soccer

therefore,

n(G and R) only = 16-4 = 12

n( G and S) only = 42-4 = 38

n( Sand R) only = x-4

n( G) only = 65-(38+12+4)

= 65-54

= 11

n( S) only = 57-(38+x-4+4)

= 57-38-x

= 19-x

n(R) only = 34-(16+x-4+4)

= 34-16-x

= 18-x

b. 100 = 12+38+x-4+11+19-x+18-x+4+6

100 = 12+38+11+19+18+4+7+x-x-x

100 = 109-x

x = 109-100 = 9

c. probability that a student picked played just two games;

sample space = 12+38+x-4

= 50+9-4

= 55

total outcome = 100

= 55/100 = 11/20

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For the two-state continuous-time Markov chain starting in state 0, cov[x(s),x(t)] = λ²/(λ+μ)² − (λ/(λ+μ))² = λμ/(λ+μ)³, therefore, cov[x(s),x(t)] is proportional to the product of the transition rates λ and μ, and inversely proportional to the cube of their sum.

Explanation:

To find cov[x(s),x(t)], follow these steps:

Step 1: For the two-state continuous-time Markov chain starting in state 0, we first need to determine the transition rates between the two states. Let λ be the rate at which the chain transitions from state 0 to state 1, and let μ be the rate at which it transitions from state 1 to state 0.

Step 2: Using these transition rates, we can construct the transition probability matrix P:

P = [−λ/μ  λ/μ
     μ/λ  −μ/λ]

where the rows and columns represent the two possible states (0 and 1). Note that the sum of each row equals 0, which is a necessary condition for a valid transition probability matrix.

Step 3: Now, we can use the formula for the covariance of a continuous-time Markov chain:

cov[x(s),x(t)] = E[x(s)x(t)] − E[x(s)]E[x(t)]

where E[x(s)] and E[x(t)] are the expected values of the chain at times s and t, respectively. Since we start in state 0, we have E[x(0)] = 0.

Step 4: To calculate E[x(s)x(t)], we need to compute the joint distribution of the chain at times s and t. This can be done by computing the matrix exponential of P:

P(s,t) = exp(P(t−s))

where exp denotes the matrix exponential. Then, the joint distribution is given by the first row of P(s,t) (since we start in state 0).

Step 5: Finally, we can compute the expected values:

E[x(s)] = P(0,s)·[0 1]ᵀ = λ/(λ+μ)
E[x(t)] = P(0,t)·[0 1]ᵀ = λ/(λ+μ)
E[x(s)x(t)] = P(0,s)·P(s,t)·[1 0]ᵀ = λ²/(λ+μ)²

Step 6: Plugging these values into the covariance formula, we get:

cov[x(s),x(t)] = λ²/(λ+μ)² − (λ/(λ+μ))² = λμ/(λ+μ)³

Therefore, cov[x(s),x(t)] is proportional to the product of the transition rates λ and μ, and inversely proportional to the cube of their sum.

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Theorem: If m and n are integers such that m|n, then m|(5n³ - 2n² + 3n).

Proof: Let n = km, where k is an integer. Then we can rewrite (5n³ - 2n² + 3n) as follows:

5n³ - 2n² + 3n = 5(km)³ - 2(km)² + 3(km)

= 5k³m³ - 2k²m² + 3km

= km(5k²m² - 2km + 3)

Since m|n, we know that n = km is divisible by m. Therefore, we can write km as m times some integer, which we'll call p. Thus, we have:

5n³ - 2n² + 3n = m(5k²p² - 2kp + 3)

Since (5k²p² - 2kp + 3) is also an integer, we have shown that m is a factor of (5n³ - 2n² + 3n). Therefore, if m and n are integers such that m|n, then m|(5n³ - 2n² + 3n).

To prove this theorem, we need to show that if m is a factor of n, then m is also a factor of (5n³ - 2n² + 3n). We start by assuming that n is equal to km, where k is some integer. This is equivalent to saying that m divides n.

We then substitute km for n in the expression (5n³ - 2n² + 3n) and simplify the expression to get 5k²m³ - 2k²m² + km. We notice that this expression has a factor of m, since the last term km contains m.

To show that m is a factor of the entire expression, we need to write (5k²m² - 2km + 3) as an integer. We do this by factoring out the m from the expression and writing it as m(5k²p² - 2kp + 3), where p is some integer. Since (5k²p² - 2kp + 3) is also an integer, we have shown that m is a factor of (5n³ - 2n² + 3n).

Therefore, if m and n are integers such that m|n, then m|(5n³ - 2n² + 3n).

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lim x→−3 (x² − 9x + 3) is  39.

To find the limit of the function lim x→−3 (x² − 9x + 3), we will follow these steps:

Step 1: Identify the function
The given function is

f(x) = x² − 9x + 3.

Step 2: Determine the value of x that the limit is approaching
The limit is approaching x = -3.

Step 3: Evaluate the function at the given value of x
Substitute x = -3 into the function:

f(-3) = (-3)² − 9(-3) + 3.

Step 4: Simplify the expression
f(-3) = 9 + 27 + 3 = 39.

So, the limit of the function as x approaches -3 is 39.

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The domain of the vector function is determined by the domain of each component function.

For the first component, we have √36 − t^2 which is the square root of a non-negative number. Thus, the domain of the first component is given by 0 ≤ t ≤ 6.

For the second component, we have e^−5t which is defined for all real values of t. Thus, the domain of the second component is (-∞, ∞).

For the third component, we have ln(t^3) which is defined only for positive values of t. Thus, the domain of the third component is (0, ∞).

Putting it all together, the domain of the vector function is the intersection of the domains of each component function. Therefore, the domain of the vector function is given by 0 ≤ t ≤ 6 for the first component, (-∞, ∞) for the second component, and (0, ∞) for the third component.

Thus, the domain of the vector function is: [0, 6] × (-∞, ∞) × (0, ∞) in interval notation.

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The value of the limit [tex]\lim_{x \to 1}[/tex] f(x) is 5. Therefore, option C. is correct.

To find the limit of f(x) as x approaches 1, given that g(x) ≤ f(x) ≤ h(x) for all x, you need to evaluate the limits of g(x) and h(x) as x approaches 1.

Evaluate [tex]\lim_{x \to 1}[/tex] g(x):

g(x) = 2x² + 4x + 1

Plug in x = 1:

g(1) = 2(1)² + 4(1) + 1

= 2 + 4 + 1

= 7

Now, evaluate  [tex]\lim_{x \to 1}[/tex] h(x):

h(x) = 1/2x² - x + 11/2

Plug in x = 1:

h(1) = 1/2(1)² - (1) + 11/2

= 1/2 - 1 + 11/2

= 5

Since g(1) ≤ f(1) ≤ h(1), and both g(1) and h(1) have the same value of 5, the limit of f(x) as x approaches 1 is 5. Therefore, the correct answer is C. 5.

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The value of the limit [tex]\lim_{x \to 1}[/tex] f(x) is 5. Therefore, option C. is correct.

To find the limit of f(x) as x approaches 1, given that g(x) ≤ f(x) ≤ h(x) for all x, you need to evaluate the limits of g(x) and h(x) as x approaches 1.

Evaluate [tex]\lim_{x \to 1}[/tex] g(x):

g(x) = 2x² + 4x + 1

Plug in x = 1:

g(1) = 2(1)² + 4(1) + 1

= 2 + 4 + 1

= 7

Now, evaluate  [tex]\lim_{x \to 1}[/tex] h(x):

h(x) = 1/2x² - x + 11/2

Plug in x = 1:

h(1) = 1/2(1)² - (1) + 11/2

= 1/2 - 1 + 11/2

= 5

Since g(1) ≤ f(1) ≤ h(1), and both g(1) and h(1) have the same value of 5, the limit of f(x) as x approaches 1 is 5. Therefore, the correct answer is C. 5.

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By combining like terms, we can simplify equations and expressions. This makes it easier to solve for a single variable, or to check the accuracy of a given equation.

15. 7x⁴ - 5x⁴= 2x⁴16. 32y + 5y = 37y17. 6b + 7b - 10 = 13b - 1018. 2x + 3x + 4 = 5x + 419. y + 4 + 3(y + 2) = 4y + 1020. 7a²- a²+ 16 = 6a² + 1621. 3y²+ 3(4y²- 2) = 15y² - 622. z² + z + 4z³+ 4z² = 5z² + 4z³23. 0.5(x⁴ - 3) + 12 = 0.5x⁴ + 924. 1/4 * (16 + 4p) = 4 + p

An equation is a statement that asserts the equality of two expressions, with each expression being composed of numbers, variables, and/or mathematical operations. Equations are used to solve problems in mathematics, science, engineering, economics, and other fields. Equations offer the opportunity to describe relationships between different variables and to develop models that can be used to predict the behavior of systems.

15. 7x⁴ - 5x⁴= 2x⁴

16. 32y + 5y = 37y

17. 6b + 7b - 10 = 13b - 10

18. 2x + 3x + 4 = 5x + 4

19. y + 4 + 3(y + 2) = 4y + 10

20. 7a²- a²+ 16 = 6a² + 16

21. 3y²+ 3(4y²- 2) = 15y² - 6

22. z² + z + 4z³+ 4z² = 5z² + 4z³

23. 0.5(x⁴ - 3) + 12 = 0.5x⁴ + 9

24. 1/4 * (16 + 4p) = 4 + p

Conclusion:
By combining like terms, we can simplify equations and expressions. This makes it easier to solve for a single variable, or to check the accuracy of a given equation. It is important to remember that like terms must have the same base and exponent to be combined.

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The maximum value of f(x,y) on the disk D is attained on the boundary of the disk, where x^2 + y^2 = 1. Since f(x,y) = 18x^2 + 19y^2 is increasing in both x and y, the maximum value is attained at one of the points (±1,0) or (0,±1), where f(x,y) = 18. The minimum value of f(x,y) on the disk D is attained at the point (√(19/36), √(18/38)), where f(x,y) = 18/36

To find the maximum and minimum values of the function [tex]f(x,y) = 18x^2 + 19y^2[/tex] on the disk [tex]D: x^2 + y^2 \leq 1[/tex], we can use the method of Lagrange multipliers.

Let [tex]g(x,y) = x^2 + y^2 - 1[/tex]be the constraint equation for the disk D. Then, the Lagrangian function is given by:

L(x,y, λ) = f(x,y) - λg(x,y) [tex]= 18x^2 + 19y^2 -[/tex]λ[tex](x^2 + y^2 - 1)[/tex]

Taking partial derivatives with respect to x, y, and λ, we get:

∂L/∂x = 36x - 2λx = 0

∂L/∂y = 38y - 2λy = 0

∂L/∂λ = [tex]x^2 + y^2 - 1 = 0[/tex]

Solving these equations simultaneously, we get two critical points:

(±√(19/36), ±√(18/38))

To determine whether these points correspond to maximum, minimum or saddle points, we need to use the second derivative test. Evaluating the Hessian matrix of second partial derivatives at these points, we get:

H = [ 36λ 0 2x ]

[ 0 38λ 2y ]

[ 2x 2y 0 ]

At the point (√(19/36), √(18/38)), we have λ = 36/(2*36) = 1/2, x = √(19/36), and y = √(18/38). The Hessian matrix at this point is:

H = [ 18 0 √(19/18) ]

[ 0 19 √(18/19) ]

[ √(19/18) √(18/19) 0 ]

The determinant of the Hessian matrix is positive and the leading principal minors are positive, so this point corresponds to a local minimum of f(x,y) on the disk D.

Similarly, at the point (-√(19/36), -√(18/38)), we have λ = 36/(2*36) = 1/2, x = -√(19/36), and y = -√(18/38). The Hessian matrix at this point is:

H = [ -18 0 -√(19/18) ]

[ 0 -19 -√(18/19) ]

[ -√(19/18) -√(18/19) 0 ]

The determinant of the Hessian matrix is negative and the leading principal minors alternate in sign, so this point corresponds to a saddle point of f(x,y) on the disk D.

Therefore, the maximum value of f(x,y) on the disk D is attained on the boundary of the disk, where [tex]x^2 + y^2 = 1[/tex]. Since f(x,y) = [tex]18x^2 + 19y^2[/tex] is increasing in both x and y, the maximum value is attained at one of the points (±1,0) or (0,±1), where f(x,y) = 18. The minimum value of f(x,y) on the disk D is attained at the point (√(19/36), √(18/38)), where f(x,y) = 18/36.

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The surface area of the given cylinder is 112π cm².

Given is a cylinder.

Radius of the base = 4 cm

Height of the cylinder = 10 cm

Here there are two circular bases and a lateral face.

Area of the bases = 2 × (πr²)

                             = 2 × π (4)²

                             = 32π cm²

Area of the lateral face = 2π rh

                                      = 2π (4)(10)

                                      = 80π

Total area = 112π cm²

Hence the total surface area of the cylinder is 112π cm².

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With 99% certainty, we can state that the true population mean for the time it takes grass seed to germinate is between 32.69 and 39.31 days.

We will apply the following formula to determine the confidence interval for the population mean:

Sample mean minus margin of error yields the confidence interval.

where,

Margin of error is equal to (critical value) x (mean standard deviation).

A t-distribution with n-1 degrees of freedom (where n is the sample size) and the desired confidence level can be used to get the critical value. The critical value is 2.878 with 18 degrees of freedom and a 99% level of confidence.

The population standard deviation divided by the square root of the sample size yields the standard error of the mean.

The standard error of the mean in this instance is:

Mean standard deviation is = 5 / [tex]\sqrt{(19) }[/tex] = 1.148.

Therefore, the error margin is:

error rate = 2.878 x 1.148

= 3.306.

Finally, the confidence interval can be calculated as follows:

Confidence interval is equal to 36 3.306.

= [32.69, 39.31].

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The firm's marginal revenue function is MR(Q)=50-Q. The correct option is C.

To find the firm's marginal revenue, we first need to find its total revenue function. Total revenue (TR) is equal to price (P) times quantity (Q), or TR=PQ.

Substituting the market demand function P=50-0.5Q into the total revenue equation, we get TR=(50-0.5Q)Q = 50Q-0.5Q^2.

To find marginal revenue, we take the derivative of the total revenue function with respect to quantity, or MR=dTR/dQ. Taking the derivative of TR=50Q-0.5Q^2, we get MR=50-Q.

Note that if the market price were not equal to $50, the firm's marginal revenue function would be different.

This is because the marginal revenue curve for a firm in a competitive market is the same as the market demand curve, which is downward sloping.

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(-1,2)

(x+1)=0

x=-1

(y-2)=0

y=2

You need to just see what you can substitute in to make x and y in their respected brackets to equal zero, and that gives your coordinates. You may also rearrange to find the value of x or y in these types of questions to solve for the values of either coordinates, hence how I got -1 and 2.

Mr Jones monthly telephone bill would be $630.00.

Algebra is a branch of mathematics that deals with the study of mathematical symbols and their manipulation. It involves the use of letters, symbols, and equations to represent and solve mathematical problems.

In algebra, we use letters and symbols to represent unknown quantities and then use mathematical operations such as addition, subtraction, multiplication, division, and exponentiation to manipulate those quantities and solve equations. We can use algebra to model and solve real-world problems in various fields such as science, engineering, economics, and finance.

Some common topics in algebra include:

Solving equations and inequalities

Simplifying expressions

Factoring and expanding expressions

Graphing linear and quadratic functions

Using logarithms and exponents

Working with matrices and determinants

To find Mr Jones monthly telephone bill, we need to know the rates for non-area and area calls.

Let's assume that the rate for non-area calls is $0.25 per minute and the rate for area calls is $0.10 per minute.

The total cost of non-area calls would be:

Cost of non-area calls = (number of non-area calls) x (duration of each call) x (rate per minute)

Cost of non-area calls = 15 x 105 x $0.25

Cost of non-area calls = $393.75

The total cost of area calls would be:

Cost of area calls = (number of area calls) x (duration of each call) x (rate per minute)

Cost of area calls = 75 x 315 x $0.10

Cost of area calls = $236.25

Therefore, the total monthly bill for Mr Jones would be:

Total monthly bill = Cost of non-area calls + Cost of area calls

Total monthly bill = $393.75 + $236.25

Total monthly bill = $630.00

So Mr Jones monthly telephone bill would be $630.00.

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Answer:

Step-by-step explanation:

You want a pair of transformations that will map ∆ABC to ∆A'B'C'.

We note that segment BC points downward, and segment B'C' points upward. This suggests a vertical reflection.

We also note that point A' is 2 units left of point A, suggesting a horizontal translation. It is as far below the x-axis as A is above the x-axis.

The two transformations that map ∆ABC to ∆A'B'C' are ...

These transformations are independent of each other, so may be applied in either order.

I = 0.75 ± 5 × 10⁻⁶ is approximately equal to 0.393717 ± 5 × 10⁻⁶.

We want to approximate the definite integral:

I = ∫₀¹ (1 + x³) dx

using a series to within an accuracy of 5 × 10⁻⁶, or |error| < 5 × 10⁻⁶.

We can start by expanding (1 + x³) as a power series about x = 0:

1 + x³ = 1 + x³ + 0x⁵ + 0x⁷ + ...

The integral of x^n is x^(n+1)/(n+1), so we can integrate each term of the series to get:

∫₀¹ (1 + x^3) dx = ∫₀¹ (1 + x³ + 0x⁵ + 0x⁷ + ...) dx

                      = ∫₀¹ 1 dx + ∫₀¹ x^3 dx + ∫₀¹ 0x⁵ dx + ∫₀¹ 0x⁷ dx + ...

                      = 1/2 + 1/4 + 0 + 0 + ...

                      = 3/4

So our series approximation is:

I = 3/4

To find the error, we need to estimate the remainder term of the series. The remainder term is given by the integral of the next term in the series, which is x⁵/(5!) for this problem. We can estimate the value of this integral using the alternating series bound, which says that the absolute value of the error in approximating an alternating series by truncating it after the nth term is less than or equal to the absolute value of the (n+1)th term.

So we have:

|R| = |∫₀¹ (x⁵)/(5!) dx|

    ≤ (1/(5!)) * (∫₀¹ x⁵ dx)

    = (1/(5!)) * (1/6)

    = 1/720

Since 1/720 < 5 × 10⁻⁶, our series approximation is within the desired accuracy, and the error is less than 5 × 10⁻⁶.

Therefore, we can conclude that:

I = 0.75 ± 5 × 10⁻⁶, which is approximately = 0.393717 ± 5 × 10⁻⁶.

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If a miner makes claim to a circular piece of land with a radius of 40 m from a given point, the length of the longest straight tunnel that he can dig, to the nearest metre is 84 meter.

Using the Pythagorean theorem to find the length of longest straight tunnel

So,

Length of longest straight tunnel   =√ (2 * 40 m)² +25²

Length of longest straight tunnel   =√ 6400 +625

Length of longest straight tunnel =√ 7025

Length of longest straight tunnel = 84 m

Therefore the length of longest straight tunnel is 84m.

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The average value of  the function f(x,y) = 2x*sin(xy) over the rectangle 0 ≤ x ≤ 2π, 0 ≤ y ≤ 4 is 0.

Explanation:

To compute the average value of the function f(x, y) = 2x * sin(xy) over the rectangle 0 ≤ x ≤ 2π and 0 ≤ y ≤ 4, Follow these steps:

Step 1: To compute the average value of the function f(x, y) = 2x * sin(xy) over the rectangle 0 ≤ x ≤ 2π and 0 ≤ y ≤ 4, we use the formula:

Average value = (1/Area) * ∬(f(x, y) dA)

where Area is the area of the rectangle, and the double integral computes the volume under the surface of the function over the given region.

Step 2: First, calculate the area of the rectangle:

Area = (2π - 0) * (4 - 0) = 8π

Step 3: Next, compute the double integral of f(x, y) over the given region:

∬(2x * sin(xy) dA) = ∫(∫(2x * sin(xy) dx dy) with limits 0 ≤ x ≤ 2π and 0 ≤ y ≤ 4
∬(2x * sin(xy) dA) = double integral from 0 to 2π of double integral from 0 to 4 of 2x*sin(xy) dy dx

∬(2x * sin(xy) dA) = double integral from 0 to 2π of (-1/2)cos(4πx) + (1/2)cos(0) dx

∬(2x * sin(xy) dA) = (-1/2) * [sin(4πx)/(4π)] evaluated from 0 to 2π

∬(2x * sin(xy) dA) = 0

Step 4: Finally, calculate the average value by dividing the double integral by the area:

Average value = (1/(8π)) * ∬(2x * sin(xy) dA)
Average value=  (1/(8π)) * 0
Average value= 0

Hence, the average value of  the function f(x,y) = 2x*sin(xy) over the rectangle 0 ≤ x ≤ 2π, 0 ≤ y ≤ 4 is 0.

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To find a recurrence relation for the number of n-letter sequences using the letters a, b, c such that any a not in the last position of the sequence is always followed by a b, we can use the following approach.

Let's consider the last two letters of the sequence. There are three possible cases:

1. The last letter is not "a": In this case, we can append any of the three letters (a, b, or c) to the end of an (n-1)-letter sequence that satisfies the given condition. This gives us a total of 3 times the number of (n-1)-letter sequences that satisfy the condition.

2. The last letter is "a" and the second to last letter is "b": In this case, we can append any of the two letters (a or c) to the end of an (n-2)-letter sequence that satisfies the given condition. This gives us a total of 2 times the number of (n-2)-letter sequences that satisfy the condition.

3. The last letter is "a" and the second to last letter is not "b": In this case, we cannot append any letter to the end of the sequence that satisfies the condition. Therefore, there are no such sequences of length n in this case.

Putting all these cases together, we get the following recurrence relation:

f(n) = 3f(n-1) + 2f(n-2), where f(1) = 3 and f(2) = 9.

Here, f(n) denotes the number of n-letter sequences using the letters a, b, c such that any a not in the last position of the sequence is always followed by a b.

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The required answer is dy/dx = tanh^(-1)(x) + (x*(1/(1-x^2))) - x/(1-x^2)

dy/dx = tanh^(-1)(x) + (x*(1/(1-x^2))) - x/(1-x^2) That is the derivative of the given function.

To find the derivative of the function y=xtanh−1(x)+l(√1−x2), we need to use the chain rule and the derivative of inverse hyperbolic tangent function.
he derivative of a function of a real variable measures the sensitivity to change of the function value (output value) with respect to a change in its argument (input value). Derivatives are a fundamental tool of calculus. For example, the derivative of the position of a moving object with respect to time is the object's velocity: this measures how quickly the position of the object changes when time advances. It can be calculated in terms of the partial derivatives with respect to the independent variables.

the chain rule is a formula that expresses the derivative of the composition of two differentiable functions f and g in terms of the derivatives of f and g.

The derivative of inverse hyperbolic tangent function is given by:

(d/dx) tanh−1(x) = 1/(1−x^2)

Using the chain rule, the derivative of the first term x*tanh−1(x) is:

(d/dx) (x*tanh−1(x)) = tanh−1(x) + x*(d/dx) tanh−1(x)
= tanh−1(x) + x/(1−x^2)

The derivative of the second term l(√1−x^2) is:

(d/dx) l(√1−x^2) = −l*(d/dx) (√1−x^2)
= −l*(1/2)*(1−x^2)^(−1/2)*(-2x)
= lx/(√1−x^2)

Therefore, the derivative of the function y=xtanh−1(x)+l(√1−x^2) is:
(d/dx) y = tanh−1(x) + x/(1−x^2) + lx/(√1−x^2)

To find the derivative of the given function y = x*tanh^(-1)(x) + ln(√(1-x^2)), we will differentiate each term with respect to x.

Derivatives can be generalized to functions of several real variables. In this generalization, the derivative is reinterpreted as a linear transformation whose graph is (after an appropriate translation) the best linear approximation to the graph of the original function. The Jacobian matrix is the matrix that represents this linear transformation with respect to the basis given by the choice of independent and dependent variables. It can be calculated in terms of the partial derivatives with respect to the independent variables. For a real-valued function of several variables, the Jacobian matrix reduces to the gradient vector.
The chain rule may also be expressed in Leibniz's notation. If a variable z depends on the variable y, which itself depends on the variable x (that is, y and z are dependent variables), then z depends on x as well, via the intermediate variable y.

Derivative of the first term:
Using the product rule and the chain rule for the inverse hyperbolic tangent, we get:
d/dx(x*tanh^(-1)(x)) = tanh^(-1)(x) + (x*(1/(1-x^2)))

Derivative of the second term:
Using the chain rule for the natural logarithm, we get:
d/dx(ln(√(1-x^2))) = (1/√(1-x^2))*(-x/√(1-x^2)) = -x/(1-x^2)

Now, add the derivatives of the two terms:
dy/dx = tanh^(-1)(x) + (x*(1/(1-x^2))) - x/(1-x^2)

That is the derivative of the given function.

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The integral of (x-7)sin(πx) dx is -(x-7)(1/π)cos(πx) + (1/π)sin(πx) + C.

To evaluate the integral, we can use integration by parts:

Let u = x - 7 and dv = sin(πx) dx
Then du = dx and v = -(1/π)cos(πx)

Using the integration by parts formula, we get:

∫(x − 7)sin(πx) dx = -[(x-7)(1/π)cos(πx)] - ∫-1/π × cos(πx) dx + C

Simplifying, we get:

∫(x − 7)sin(πx) dx = -(x-7)(1/π)cos(πx) + (1/π)sin(πx) + C

Therefore, the integral of (x-7)sin(πx) dx is -(x-7)(1/π)cos(πx) + (1/π)sin(πx) + C.

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The area under one arch of the cycloid x = r(t − sin t), y = r(1 − cos t) for 0 ≤ t ≤ 2π is 4πr².

To find the area under one arch of the cycloid x = r(t − sin t), y = r(1 − cos t) for 0 ≤ t ≤ 2π, we can use the formula for finding the area under a curve:

A = ∫[a,b] f(x) dx

In this case, we need to find the integral of y with respect to x:

A = ∫[0,2π] y dx

We can solve for y in terms of t by substituting x = r(t − sin t) into the equation for y:

y = r(1 − cos t)

dx = r(1 − cos t) dt

Substituting these into the formula for the area, we get:

A = ∫[0,2π] r(1 − cos t)(r(1 − cos t) dt)

Simplifying, we get:

A = r² ∫[0,2π] (1 − cos t)² dt

Using the trig identity (1 − cos 2t) = 2 sin² t, we can simplify the integrand:

A = r² ∫[0,2π] (1 − cos t)² dt

= r² ∫[0,2π] (1 − 2cos t + cos² t) dt

= r² ∫[0,2π] (1 − 2cos t + (1 − sin² t)) dt

= r² ∫[0,2π] 2(1 − cos t) dt

= r² [2t − 2sin t] from 0 to 2π

= 4πr²

Therefore, the area under one arch of the cycloid x = r(t − sin t), y = r(1 − cos t) for 0 ≤ t ≤ 2π is 4πr².

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The entire population of high school boys, a larger and more representative sample, selected using random sampling techniques, would be needed.

It would not be reasonable to use this information to generalize about the distribution of weights for the entire population of high school boys. The sample size of 100 is relatively small compared to the total population of high school boys, and it is possible that the sample is not representative of the entire population. Additionally, the sample was not randomly selected, which introduces the possibility of sampling bias. In order to generalize about the distribution of weights for the entire population of high school boys, a larger and more representative sample, selected using random sampling techniques, would be needed.

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The equation of the tangent plane to the surface z=[tex]2x^2[/tex]+[tex]y^2[/tex]−5y  at the point (1, 2, -4) is 4x-y-z = 6, which is not one of the options given. Therefore, the correct option is (a) none of these.

To find the equation of the tangent plane to the surface z=[tex]2x^2[/tex]+[tex]y^2[/tex]−5y  at the point (1, 2, -4), we need to find the partial derivatives of the surface with respect to x and y at that point.

∂z/∂x = 4x

∂z/∂y = 2y - 5

At the point (1, 2, -4), these partial derivatives are:

∂z/∂x = 4(1) = 4

∂z/∂y = 2(2) - 5 = -1

So the normal vector to the tangent plane is <4, -1, 1>.

Using the point-normal form of the equation of a plane, we get:

4(x - 1) - 1(y - 2) = 1(z + 4)

Simplifying, we get:

4x-y-z = 6

Therefore, the equation of the tangent plane to the surface z=[tex]2x^2[/tex]+[tex]y^2[/tex]−5y at the point (1, 2, -4) is 4x-y-z = 6, which is not one of the options given. Therefore, the answer is (a) none of these.

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Answer:

8/17

Step-by-step explanation:

sin c = opposite/ hypotenuse

sin c = 8/17

Answer:

sorry can't understand this language