if a ≡ b (mod n), then a and b have the same remainder when divided by n.

The scalar projection of bb onto aa is given by compab=|b|cos(θ) where θ is the angle between a and b.

We can compute the magnitude of b as |b|=√(−3)^2+5^2+11^2=√155, and the cosine of the angle between a and b can be found using the dot product formula, as a⋅b=|a||b|cos(θ), which gives cos(θ)=a⋅b/(|a||b|)=(-1)(-3)+(1)(5)+(2)(11)/(|a|√155)=28/(3√155). Therefore, compab=|b|cos(θ)=√155(28/(3√155))=28/3. The vector projection of bb onto aa is given by projab=compab(aa/|a|), where aa/|a| is a unit vector in the direction of a. We can compute the magnitude of a as |a|=√((-1)^2+1^2+2^2)=√6, and a/|a|=⟨−1/√6,1/√6,2/√6⟩. Therefore, projab=compab(a/|a|)=28/3⟨−1/√6,1/√6,2/√6⟩=⟨−4/√6,4/√6,8/√6⟩.

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The population in 2020 is given as follows:

255,323.

The population is obtained applying the proportions in the context of the problem.

From 2010 to 2015, the population grew by 7%, hence the population in 2015 is obtained as follows:

246000 x 1.07 = 263220.

From 2015 to 2020, the population fell by 3%, hence the population in 2020 is obtained as follows:

0.97 x 263220 = 255,323.

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The missing side for the triangle in this problem is given as follows:

a) [tex]\sqrt{19}[/tex] m.

The Pythagorean Theorem states that in the case of a right triangle, the square of the length of the hypotenuse, which is the longest side,  is equals to the sum of the squares of the lengths of the other two sides.

Hence the equation for the theorem is given as follows:

c² = a² + b².

The sides for this problem are given as follows:

Hence we obtain the missing side, which is the hypotenuse, as follows:

[tex]x^2 = (\sqrt{7})^2 + (2\sqrt{3})^2[/tex]

x² = 7 + 12

x² = 19

[tex]x = \sqrt{19}[/tex]

Meaning that option A is the correct option for this problem.

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if x' and x'' are both inverses of x, then x' = x'' = 0. Therefore, the inverse element in a boolean algebra is unique.

To show that the inverse element in a boolean algebra is unique, we will assume that there are two inverse elements, say x' and x'', such that x'x = x''x = 1 and xx' = xx'' = 0.

Then, we have:

x' = x'1 (since 1 is the multiplicative identity in a boolean algebra)

= x'(xx'') (since xx'' = 0)

= (x'x)x'' (associativity of multiplication)

= xx'' (since x'x = 1)

= 0 (since x'' is an inverse of x)

Similarly, we have:

x'' = x''1 (since 1 is the multiplicative identity in a boolean algebra)

= x''(xx') (since xx' = 0)

= (x''x)x' (associativity of multiplication)

= xx' (since x''x = 1)

= 0 (since x' is an inverse of x)

Thus, we have shown that if x' and x'' are both inverses of x, then x' = x'' = 0. Therefore, the inverse element in a boolean algebra is unique.

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Size, form, orientation, and location are the four fundamental geometric attributes that must be considered to define the geometry of a feature of a part.

Size refers to the dimensions of a feature or part, such as length, width, and height. These dimensions are typically specified in a drawing or model and must be precise to ensure that the part is manufactured to the correct size.

Form is the shape of a feature or part, including curves, angles, and other geometric features. Form must be accurately defined to ensure that the part is manufactured to the correct shape and that it will function as intended.

Orientation refers to the position of a feature or part in space. For example, a hole may need to be positioned at a specific angle relative to other features on the part. Orientation is critical to ensure that the part fits and functions correctly in the final assembly.

Location refers to the placement of a feature or part relative to other features on the part or relative to a specific reference point. The location of each feature on the part must be precisely defined to ensure that the part can be accurately manufactured and assembled.

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Rounding this value to the nearest tenth, the volume of the cone-shaped lampshade is approximately 81.7 cubic inches.

The volume of a cone-shaped lampshade, you can use the formula:

Volume = (1/3) × π × r² × h,

where π is a mathematical constant approximately equal to 3.14159, r is the radius of the cone, and h is the height of the cone.

Given that the diameter of the lampshade is 5 inches the radius (r) can be calculated by dividing the diameter by 2:

r = 5 inches / 2 = 2.5 inches.

The height of the lampshade is given as 6.5 inches.

Now we can substitute the values into the volume formula:

Volume = (1/3) × 3.14159 × (2.5 inches)² × 6.5 inches.

Calculating this expression, we get:

Volume ≈ 1/3 × 3.14159 × 6.25 inches² × 6.5 inches.

Volume ≈ 81.6816 cubic inches.

The following formula can be used to determine a lampshade's volume:

Volume is equal to (1/3) r2 h, where r is the cone's radius and h is its height. The mathematical constant is roughly equivalent to 3.14159.

If the lampshade has a diameter of 5 inches, the radius (r) may be found by multiplying the diameter by two:

2.5 inches is equal to r = 5 inches / 2.

The lampshade's height is listed as 6.5 inches.

We can now enter the values into the volume formula as follows:

Volume equals 1/3 of 3.14159 inches, 2.5 inches, and 6.5 inches.

When we compute this equation, we obtain:

Volume 1/3 3.14159 inches, 6.25 inches6.5 x 2 inches.

81.6816 cubic inches of volume.

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Tu) and Tv) are not linearly independent in this case.

(a) If there is a nonzero vector xERm such that T(x) = 0, then T is not one-to-one. This is because there exists a nonzero vector x and a nonzero vector y such that T(x) = T(y) = 0, and thus T is not injective. For example, consider the transformation T: R^2 -> R^2 defined by T(x,y) = (0,0). This transformation maps every vector in R^2 to the zero vector, and thus there exist nonzero vectors that map to the same output.

(b) If there is a nonzero vector xERm such that T(x) = 0, then T cannot be onto. This is because there exists a vector in the range of T (i.e., a vector yERn) that is not mapped to by any vector in the domain of T. For example, consider the transformation T: R^2 -> R^3 defined by T(x,y) = (x,y,0). This transformation maps every vector in R^2 to a vector in the xy-plane of R^3, and thus there does not exist any vector in the z-axis of R^3 that is in the range of T.

(c) If u and v are linearly dependent vectors in R^m, then there exist scalars a and b (not both zero) such that au + bv = 0. Applying T to both sides of this equation yields T(au + bv) = 0, which implies that aT(u) + bT(v) = 0. Thus, T(u) and T(v) are linearly dependent.

(d) If u and v are linearly independent vectors in R^m, then Tu) and Tv) are not guaranteed to be linearly independent. For example, consider the transformation T: R^2 -> R^2 defined by T(x,y) = (x+y, x+y). The vectors (1,0) and (0,1) are linearly independent, but T(1,0) = T(0,1) = (1,1), which are linearly dependent. Therefore, Tu) and Tv) are not linearly independent in this case.

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By following the steps, you will find the slope of the tangent line to the polar curve r = 5 sin(θ) at the point specified by θ = 6.

Hi! To find the slope of the tangent line to the given polar curve r = 5 sin(θ) at the point specified by the value θ = 6, follow these steps:

1. Find the rectangular coordinates (x, y) of the point using the polar to-rectangular conversion formulas:
  x = r cos(θ)
  y = r sin(θ)

2. Differentiate r with respect to θ:
  dr/dθ = 5 cos(θ)

3. Use the chain rule to find the derivatives of x and y with respect to θ:
  dx/dθ = dr/dθ * cos(θ) - r * sin(θ)
  dy/dθ = dr/dθ * sin(θ) + r * cos(θ)

4. Plug in the given value of θ (6) into the expressions above and find the corresponding values of x, y, dx/dθ, and dy/dθ.

5. Finally, find the slope of the tangent line using the formula:
  dy/dx = (dy/dθ) / (dx/dθ)

By following these steps, you will find the slope of the tangent line to the polar curve r = 5 sin(θ) at the point specified by θ = 6.

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Answer:

82 spaces are filled.

Step-by-step explanation:

9•10=90..

90-8=82

The missing values for the exponential function as represented in the table as required are;

It follows from the task content that the missing values from the given table are required to be determined.

By observation; the values of x increases by 1 sequentially; and ;

13.5 / 9 = 20.25 / 13.5 = 1.5

Hence, with every 1 unit increase in x, y increases by a factor of 1.5.

Therefore, since , y = 20.25 when x = 0;

When x = 1; y = 20.25 × 1.5 = 30.375.

When x = 2; y = 30.375 × 1.5 = 45.5625.

Consequently, the correct answer choice is; Choice C; 30.375 and 45.5625.

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Answer:

0.4

Step-by-step explanation:

if we order them the middle value is the median

Answer: 0.4

Step-by-step explanation: it is in the middle of the data set.

He got to it before me though so give him brainliest.

Answer:

AD ≅ BC                   |        Given

AD || BC                    |        Given

∠CAD ≅ ∠ACB         |        Alternate Interior Angles Theorem

AC ≅ AC                   |        Reflexive Property of Congruence

△ABC ≅ △CDA      |        SAS Theorem

Step-by-step explanation:

Since we know that AD and BC are parallel (given), we can think of the diagonal AC as a transversal to these parallel lines.

So, we can use the Alternate Interior Angles Theorem, which states that alternate interior angles are congruent. Hence, ∠CAD ≅ ∠ACB.

We also know that AC ≅ AC because of the Reflexive Property of Congruence.

Finally, we can use the SAS (side-angle-side) Theorem to prove the triangles congruent (△ABC ≅ △CDA) because we have two sides and an angle between them that we know are congruent.

The equation of the parabola is: y = 0.55(x - 8)^2 - 55. To find the equation of the parabola, we first need to find the vertex form:

y = a(x - h)^2 + k

where (h, k) is the vertex of the parabola.

Since the parabola passes through the point (3, -30), we can substitute these values into the equation to get:

-30 = a(3 - h)^2 + k

We also know that the x-intercepts are -2 and 18. This means that the parabola intersects the x-axis at (-2, 0) and (18, 0), which gives us the following two equations:

0 = a(-2 - h)^2 + k

0 = a(18 - h)^2 + k

Simplifying these equations, we get:

4a(h + 2)^2 = 4ak

324a(h - 18)^2 = 4ak

Dividing these equations, we get:

81(h + 2)^2 = (h - 18)^2

Expanding this equation, we get:

81h^2 + 2916h + 2916 = h^2 - 36h + 324

Simplifying, we get:

80h^2 + 2940h - 2592 = 0

Solving for h using the quadratic formula, we get:

h = (-b ± sqrt(b^2 - 4ac)) / 2a

h = (-2940 ± sqrt(2940^2 - 4(80)(-2592))) / 2(80)

h = (-2940 ± 4248) / 160

h = 9.675 or -5.175

Since the parabola has x-intercepts at -2 and 18, we know that the vertex must be halfway between these two points, which is:

h = (18 - 2) / 2 = 8

Substituting this value of h into the equation -30 = a(3 - h)^2 + k, we get:

-30 = a(3 - 8)^2 + k

-30 = 25a + k

Substituting h = 8 and solving for k, we get:

-30 = 25a + k

-30 = 25a + k

-30 = 25a + k

-30 = 25a + k

-30 = 25a + k

-30 = 25a + k

k = -55

Therefore, the vertex form of the parabola is:

y = a(x - 8)^2 - 55

To find the value of a, we can use one of the x-intercepts:

0 = a(-2 - 8)^2 - 55

55 = 100a

a = 0.55

Therefore, the equation of the parabola is: y = 0.55(x - 8)^2 - 55

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The line integral of f(x, y) along C is -1. Answer: none of the given options. We can parameterize the curve C as r(t) = (t, t) for t in the interval [0, π/2]. Then the line integral of f(x, y) along C is given by:

∫C f(x, y) ds = ∫[0,π/2] f(r(t)) ||r'(t)|| dt

where ||r'(t)|| is the magnitude of the derivative of r(t) with respect to t.

We can find r'(t) by taking the derivative of each component of r(t):

r'(t) = (1, 1)

Then ||r'(t)|| = sqrt(1^2 + 1^2) = sqrt(2).

Substituting everything into the line integral formula, we get:

∫C f(x, y) ds = ∫[0,π/2] (cos t + sin t) sqrt(2) dt

We can evaluate this integral by using the trigonometric identity cos t + sin t = sqrt(2) sin (t + π/4). Then we have:

∫C f(x, y) ds = ∫[0,π/2] (cos t + sin t) sqrt(2) dt

= sqrt(2) ∫[0,π/2] sin (t + π/4) dt

= sqrt(2) [-cos(t + π/4)] [0,π/2]

= sqrt(2) [-cos(π/4) + cos(3π/4)]

= sqrt(2) (-sqrt(2)/2 + 0)

= -1

Therefore, the line integral of f(x, y) along C is -1. Answer: none of the given options.

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Thus, angle q can either measure approximately 65.1 degrees or approximately 114.9 degrees.

To find all possible measures for angle q in triangle PQR, we can use the Law of Cosines:
c^2 = a^2 + b^2 - 2ab cos(C)

where c is the length of the side opposite the angle we are trying to find (in this case, side q), and a and b are the lengths of the other two sides.

Plugging in the given values, we get:

85^2 = 45^2 + b^2 - 2(45)(b) cos(37°)

Simplifying and solving for b, we get:

b = 81.5 cm or b = 128.5 cm

However, we can only accept the solution b = 81.5 cm since the other value (b = 128.5 cm) would result in side b being longer than side c (which is not possible in a triangle).

So, the possible measures for angle q are:

q = 65.1° or q = 114.9°

Therefore, angle q can either measure approximately 65.1 degrees or approximately 114.9 degrees.

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This study design allows for the comparison of the health outcomes between the two groups, enabling researchers to evaluate the specific effects of multivitamin supplements on both men and women.

1. This study design is an example of a randomized controlled trial (RCT) aimed at exploring the effects of multivitamin supplements on health. The study recruited 100 volunteers and divided them into two groups: a multivitamin group and a placebo group. The multivitamin group consists of half of the participants, while the other half is assigned to the placebo group. The researchers recognized the potential differences in nutritional needs between men and women and, therefore, ensured separate random assignment within each gender group.

2. A randomized controlled trial (RCT) is a research design commonly used to assess the effectiveness or impact of a particular intervention, such as a medication, treatment, or in this case, a multivitamin supplement. The goal of an RCT is to determine whether the intervention has a causal effect on the outcome of interest by randomly assigning participants to either an intervention group or a control group.

3. In this example, the study design involved recruiting 100 volunteers and dividing them into two groups: a multivitamin group and a placebo group. This division ensures that the effects observed can be attributed to the multivitamin supplement itself and not to other factors. By randomly assigning participants to the groups, the researchers minimize the potential for bias, as randomization helps to distribute confounding factors equally between the two groups.

4. Furthermore, the researchers recognized the potential differences in nutritional needs between men and women. To account for this, they separately and randomly assigned half of the women to the multivitamin group and half of the men to the multivitamin group. This stratified random assignment within gender groups ensures that any observed effects can be analyzed separately for men and women, allowing for a more nuanced understanding of how multivitamin supplements may impact their health differently.

5. Overall, this study design demonstrates a well-structured approach to investigating the effects of multivitamin supplements on health outcomes, considering both the potential gender differences and the need for rigorous control through randomization.

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Answer:

[tex] log(30) + log( \frac{x}{2} ) = log(60) [/tex]

[tex] log(30( \frac{x}{2} ) ) = log(60) [/tex]

[tex]30( \frac{x}{2} ) = 60[/tex]

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

[tex]x = 4[/tex]

The number of women in the workforce will not equal the number of men during the time period of 2014-2022.

To determine whether the number of women in the workforce will equal the number of men during the period of 2014-2022, we need to solve the system of equations:

-7x + 16y = 1070

-5x + 10y = 759

where x=14 corresponds to the year 2014.

Substituting x=14 into the equations, we get:

-7(14) + 16y = 1070

-5(14) + 10y = 759

Simplifying and solving for y, we get:

y = 77

y = 153

So according to these models, the estimated number of women and men in the workforce in 2022 are 77 million and 153 million, respectively.

Therefore, the number of women in the workforce will not equal the number of men during the time period of 2014-2022.

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The evaluated integral is:

∫e^(7θ)sin(8θ) dθ = -(1/49)e^(7θ)cos(8θ) + (8/49)e^(7θ)sin(8θ) + C

where C is the constant of integration.

How"Integrate e^7θ sin(8θ) dθ."

We can solve this integral using integration by parts. Let u = sin(8θ) and dv/dθ = e^(7θ)dθ. Then du/dθ = 8cos(8θ) and v = (1/7)e^(7θ). Using the formula for integration by parts, we have:

∫e^(7θ)sin(8θ) dθ = -(1/7)e^(7θ)cos(8θ) - (8/7)∫ e^(7θ)cos(8θ) dθ

Letting I = ∫e^(7θ)cos(8θ) dθ, we can use the same process as before but with u = cos(8θ) and dv/dθ = e^(7θ)dθ. Then du/dθ = -8sin(8θ) and v = (1/7)e^(7θ). Substituting these values, we have:

I = (1/7)e^(7θ)cos(8θ) - (8/7)∫e^(7θ)sin(8θ) dθ

Now we can substitute this result back into our original equation to get:

∫e^(7θ)sin(8θ) dθ = -(1/7)e^(7θ)cos(8θ) - (8/7)((1/7)e^(7θ)cos(8θ) - I)

Simplifying, we have:

∫e^(7θ)sin(8θ) dθ = -(1/49)e^(7θ)cos(8θ) + (8/49)e^(7θ)sin(8θ) + C

where C is the constant of integration

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Answer:

C=0

Step-by-step explanation:

1. The graph of the function f(x) = 2/5(x + 5)²(x + 1)(x - 1) is added as an attachment

2. The graph of the piecewise function f(x) is attached

3. The graph of the function f(x) = |x + 2| + 1 is attached

4. The graph of the function f(x) = ∛x - 3 is attached

(1) The function f(x)

Given that

f(x) = 2/5(x + 5)²(x + 1)(x - 1)

The above function is a polynomial function that has been transformed from the parent function f(x) = x⁴

Next, we plot the graph using a graphing tool

The graph of the function is added as an attachment

(2) The function f(x)

Given that

f(x) = x < -4, 3/2x

       -4 ≤ x < 3, x² + 2x + 1

       3 ≤ x, 1/3x + 2

The above function is a piecewise function that has two linear functions and one quadratic function

The graph of the function is added as an attachment

(3) The function f(x)

Given that

f(x) = |x + 2| + 1

The above function is an absolute function that has its vertex at (-2, 1)

The graph of the function is added as an attachment

(4) The function f(x)

Given that

f(x) = ∛x - 3

The above function is a cubic function that has been shifted down by three units

The graph of the function is added as an attachment

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Answer:

ILUYKLUIL7L;J

Step-by-step explanation:

6 divided by 3 divided by 20 can be expressed as:

6÷3/10, which can also be written as

6/ 3/ 10

To further simplify, it becomes:

6/ 3 x 10 / 1

Dividing through, we get:

2 x 10

Which equals 20

The time-domain expression of v(t) for V = 5-j12 is v(t) = 5sin(2π100t) - 12cos(2π100t).The time-domain expression of v(t) for V = -4-33 is v(t) = -4sin(2π100t) - 33cos(2π100t).The time-domain expression of v(t) for V = -19 is v(t) = -19sin(2π100t).The time-domain expression of v(t) for V = 7 is v(t) = 7sin(2π100t).

The complex amplitude V represents the phasor or Fourier coefficient of a sinusoidal signal with frequency f = 100 Hertz. To find the time-domain expression of v(t), we need to convert the phasor V into its corresponding trigonometric form. Specifically, we need to extract the amplitude and phase angle of V and use them to construct the time-domain expression of v(t) as a combination of sine and cosine functions.

For example, for V = 5-j12, we have an amplitude of √(5^2+(-12)^2) = 13 and a phase angle of -arctan(12/5) = -67.38 degrees (or -1.18 radians).

Using these values, we can write V as 13∠-1.18 and express v(t) as a linear combination of sine and cosine functions using the trigonometric identity:sin(ωt - φ) = sin(ωt)cos(φ) - cos(ωt)sin(φ)where ω = 2πf = 2π100 and φ is the phase angle in radians. The resulting time-domain expression for v(t) is then a sum of sine and cosine functions with coefficients derived from the phasor V.

Similarly, we can find the time-domain expressions of v(t) for the other given complex amplitudes V. For V = -4-33, we have an amplitude of √((-4)^2+(-33)^2) = 33.5 and a phase angle of -arctan(-33/4) = -86.87 degrees (or -1.52 radians). For V = -19, we have an amplitude of 19 and a phase angle of π (or 180 degrees). For V = 7, we have an amplitude of 7 and a phase angle of 0 degrees.

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The probability of drawing a black ball from the box is 5/12, while the probability of drawing either a black or white ball is 9/12.

To find the probability of an event, we divide the number of favorable outcomes by the total number of possible outcomes.

1. Probability of drawing a black ball: There are 5 black balls in the box, and a total of 12 balls. Therefore, the probability of drawing a black ball is 5/12.

2. Probability of drawing a black or white ball: There are 5 black balls and 4 white balls in the box, totaling 9 balls. The total number of balls in the box is still 12. Hence, the probability of drawing either a black or white ball is 9/12.

For the second question regarding the baseball player's batting average, we can use the given information to determine the probability of the player getting a hit in the next at-bat.

The batting average of .300 means that the player gets 3 hits in 10 times at bat. To find the probability of getting a hit in the next at-bat, we divide the number of hits by the total number of at-bats. In this case, the probability of getting a hit is 3/10 or 0.3. Therefore, the probability that the player will get a hit in the next at-bat is 0.3 or 30%.

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The equation used to determine the population is y = 1500(1.11)ˣ.

What is the exponential function?

Calculating the exponential growth or decay of a given collection of data is done using an exponential function, which is a mathematical function. Exponential functions, for instance, can be used to estimate population changes, loan interest rates, bacterial growth, radioactive decay, and disease spread.

Here, we have

Given: the population of Exponentville is 1500 in 2010, and the population increases each year by 11%.

We have to find the equation used to determine the population, y, of exponentially x years after 2010.

Initial population = 1500

Population increases each year by 11%.

x = years

The equation is :

y = 1500(1+11/100)ˣ

y = 1500(1.11)ˣ

Hence, the equation used to determine the population is y = 1500(1.11)ˣ.

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The minimum distance from the line x + 2y = 5 to the point (0, 0) is found to be √(5).

We can start by finding the equation of the perpendicular line that passes through the origin. The given line can be rewritten in slope-intercept form as y = (-1/2)x + 5/2. The slope of any line perpendicular to this line is the negative reciprocal, which is 2. So, the equation of the perpendicular line passing through the origin is y = 2x.

x + 2y = 5

y = 2x

Substituting y = 2x into the first equation gives,

x + 2(2x) = 5

5x = 5

x = 1

Substituting x = 1 into y = 2x gives,

y = 2(1)

y = 2

So, the intersection point is (1, 2). Now, the distance,

√[(1-0)² + (2-0)²] = √5

Therefore, the minimum distance from the line x + 2y = 5 to the point (0,0) is √5.

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Complete question - find the minimum distance from the line x + 2y = 5 to the point (0, 0). (hint : start by minimizing the square of the distance.)

After considering all the details we conclude that the radius at the end of the cylinder is 9.2 ×10⁻⁴ m, under the condition that a cylindrical solid metal is 3m long and has a mass of 4kg.

The formula for the volume of a cylinder is
[tex]V = \pi r^2h[/tex]
Here,
V = volume,
r = radius
h = height.
The formula for density is density = mass/volume.
It is known to us  that the mass of the cylindrical solid metal is 4kg and its density is 5.6g/cm³, we can evaluate its volume as follows:
Density = mass/volume
Volume = mass/density
Volume = 4/(5.6/1000) m³
Volume = 0.000714 m³
Since the metal cylinder is 3m long, we can evaluate its height as follows:
Height = 3m
Now we can evaluate the radius of the cylinder as follows:
[tex]V = \pi r^2h[/tex]
0.000714 m³ = πr²(3m)
r² = (0.000714 m³)/(π*3m)
r² = 0.0000758 m²
r = √(0.0000758) m
r ≈ 0.0092 m
r = 9.2 ×10⁻⁴ m
Therefore, the radius of the end of the cylindrical solid metal is 9.2 ×10⁻⁴ m .
To learn more about volume
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