what’s the answer to k and m ? please explain how you found the answer .

Answer:

[tex]u(t)=T+(u_{0}-T})e^{-kt}[/tex]

Step-by-step explanation:

We know:

[tex]\frac{du}{dt} = -k(u-T)[/tex]

We integrate in order to find u(t):

[tex]\int\limits^u_{u_{0}} {\frac{1}{-k(u-T)} \, du } = \int\limits^t_0 \, dt[/tex]

[tex]ln(\frac{u-T}{u_{0}-T} )=-kt\\[/tex]

[tex]u(t)=T+(u_{0}-T})e^{-kt}[/tex]

Answer: C. 2340

Step-by-step explanation:

Hi!

The first character is a letter. There are 26 letters in the alphabet. For each letter you choose a two digit number, but you cannot repeat the digits. There are 100 (0 to 99) two digit numbers, and you have to discard 00, 11, 22, 33, 44, 55, 66, 77, 88, 99. Those are the 10 numbers with repeated digits.

So, for each letter, you have any of 90 possible numbers. The answer is then 26*90 = 2340

Answer:

[tex]-4x+y=-5[/tex]

Step-by-step explanation:

It is given that he vector y = ai + bj is perpendicular to the line ax + by = c.

Given given point is P(-1,-9) and given vector is v = -4i + j.

Here, a = -4 and b= 1.

We need to find the equation of the line through P perpendicular to v.

Using the above fact, the vector v = -4i + j is perpendicular to the line

[tex](-4)x+(1)y=c[/tex]

[tex]-4x+y=c[/tex]          ... (1)

The line passes through the point (-1,-9).

Substitute x=-1 and y=-9 in the above equation to find the value of c.

[tex]-4(-1)+(-9)=c[/tex]

[tex]4-9=c[/tex]

[tex]-5=c[/tex]

The value of c is -5.

Substitute c=-5 in equation (1).

[tex]-4x+y=-5[/tex]

Therefore the equation of line which passes through P and perpendicular to v is -4x+y=-5.

Answer:

Step-by-step explanation:

There are six basic types of quadrilaterals:

Then we have:

Quadrilaterals with NOT ALWAYS congruent diagonals:

Quadrilaterals with ALWAYS congruent diagonals:

Answer:

The system is inconsistent.

Step-by-step explanation:

Consider the provided information.

The augmented matrix for a given system has a pivot in every column.

Let us understand this fact with the help of an example.

Suppose an 8 × 6 augmented matrix has a pivot in every column.

The above matrix is augmented and has a pivot in every  column, that means the rightmost column in the above matrix must be a pivot column.

The rightmost column of the above matrix will be something like this:

0 0 0 0 0 | b

Where b≠0 because if b is 0 then it can't be a pivot position.

But from the above 0 = b, which is false.

This means  that the system is not consistent,

Hence, the system is inconsistent.

Answer: She would need 40 minutes to infuse a dose.

Step-by-step explanation:

Since we have given that

Number of minutes a nurse takes to infuse a dose = 50 minutes

Rate faster by 20%

So, if the initial rate = 100%

After increasing the rate,

rate becomes 100%-20% = 80%

So, Number of minutes taken to infuse a dose now is given by

[tex]\dfrac{80}{100}\times 50\\\\=0.8\times 50\\\\=40\ minutes[/tex]

Hence, she would need 40 minutes to infuse a dose.

Answer:

a) There are 11,881,376 of these words in total.

b) 7,893,600 of these words contain no repeated letters.

c) 896,376 of these words start with an a or end with a z or both.

Step-by-step explanation:

The English alphabet has 26 letters.

Our word has the following format

C1 - C2 - C3 - C4 - C5

C1 is the first character, C2 the second, etc...

(a) How many of these words are there total?

Each of C1, C2,... can be 26. So the total is

[tex]T = (26)^{5} = 11,881,376[/tex]

There are 11,881,376 of these words in total.

(b) How many of these words contain no repeated letters?

C1 can be any letter. C2 can be any letter bar the letter at C1. C3 any other than C2, C1... So

26-25-24-23-22

[tex]T = 26*25*24*23*22 = 7,893,600[/tex]

7,893,600 of these words contain no repeated letters.

(c) How many of these words start with an a or end with a z or both (repeated letters are allowed)?

[tex]T = T_{1} + T_{2} + T_{3}[/tex]

[tex]T_{1}:[/tex] Start with a, end with any letter other than z.

1-26-26-26-25

[tex]T_{1} = 26^{3}*25 = 439,400[/tex]

[tex]T_{2}:[/tex]End with z, start with any other letter than A

25-26-26-26-1

[tex]T_{2} = 26^{3}*25 = 439,400[/tex]

[tex]T_{3}:[/tex]Start with A, end with Z

1-26-26-26-1

[tex]T_{3} = 17,576[/tex]

[tex]T = T_{1} + T_{2} + T_{3} = 439,400 + 439,400 + 17,576 = 896,376[/tex]

896,376 of these words start with an a or end with a z or both.

Answer:

8 is the modular inverse of 12 mod 19 since 12*8 mod 19 ≡ 1.

Step-by-step explanation:

We need to find the inverse of 12 modulo 19.

[tex]12^{-1}(\text{ mod 19})[/tex]

If a is an integer and m is modulo, then the modular multiplicative inverse of a modulo m is an integer b such that

[tex]a\times b\equiv 1(\text{ mod m})[/tex]

Substitute different values of b and check whether that remainder is 1 after modulo 19.

At b=1,

[tex]12\times 1\equiv 12(\text{ mod 19})[/tex]

At b=2,

[tex]12\times 2\equiv 5(\text{ mod 19})[/tex]

At b=3,

[tex]12\times 3\equiv 17(\text{ mod 19})[/tex]

At b=4,

[tex]12\times 4\equiv 10(\text{ mod 19})[/tex]

At b=5,

[tex]12\times 5\equiv 3(\text{ mod 19})[/tex]

At b=6,

[tex]12\times 6\equiv 15(\text{ mod 19})[/tex]

At b=7,

[tex]12\times 7\equiv 8(\text{ mod 19})[/tex]

At b=8,

[tex]12\times 8\equiv 1(\text{ mod 19})[/tex]

Therefore, 8 is the modular inverse of 12 mod 19 since 12*8 mod 19 ≡ 1.

Yes, .13 is less than .32

Answer:

The Social Security Administration increased the taxable wage base from $106,800 to $110,100.

A:

The percent increase in the base =

[tex]\frac{110100-106800}{106800}\times100=3.09[/tex]%

B:

Previous year tax = [tex]0.062\times106800=6621.60[/tex] dollars

This year tax = [tex]0.062\times110100=6826.20[/tex] dollars

Increase in tax = [tex]6826.20-6621.60=204.60[/tex] dollars

Hence, Joe’s increase in Social Security tax for the new year is $204.60.

The taxable wage base increased by 3.09%. The additional amount that Joe will pay in Social Security tax due to this increase is $204.60.

The percent increase in the base can be found by subtracting the old base from the new base, dividing the difference by the old base, and finally multiplying by 100 to convert to a percentage. So, the percent increase is: ((110,100 - 106,800) / 106,800 ) * 100 = 3.09%.

To calculate Joe's increase in Social Security tax, you need to determine the taxable increase, which is the difference between the new and old taxable wage bases, and then multiply this amount by the tax rate. For Joe, the taxable increase is $3,300 (110,100 - 106,800). Therefore, Joe's increase in Social Security tax is: 3,300 * 6.2% = $204.60.

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Answer:

5-card hands with at least one club: [tex] {52 \choose 5}-{39 ]choose 5}[/tex]

5-card hands with at least two cards of the same rank: [tex]{52 \choose 5}-{13 \choose 5}4^5[/tex]

Step-by-step explanation:

To determine how many 5-card hands have at least one club, we can count how many do NOT have at least one club, and then subtract that from the total amount of 5-card hands that there are.

A 5-card hand that doesn't have at least one club, is one whose 5 cards are from spades,hearts or diamonds. Since a standard deck of cards has 13 clubs, 39 of the cards are spades, hearts of diamonds. Getting a 5-card hand out of those cards, is choosing 5 cards out of those 39 cards. So there are [tex] {39 \choose 5}[/tex] 5-card hands without any clubs.

The total amount of 5-card hands is [tex]{52 \choose 5}[/tex], since a 5-card hand is simply a group of 5 cards out of the full deck, which has 52 cards.

Therefore the number of 5-card hands that have at least one club is [tex] {52 \choose 5}-{39 \choose 5}[/tex].

To determine how many 5-card hands have at least two cards with the same rank we can follow the same approach. We determine how many 5-card hands have NO cards with the same rank, and the subtract that out of the total amount of 5-card hands.

A 5-card hand that doesn't have cards of the same rank, is a group of 5 cards all from different ranks. Such hand can be made then by choosing first which 5 different ranks are going to be present in the hand, out of the 13 available ranks. So there are [tex] {13 \choose 5}[/tex] possible combinations of ranks. Then, choosing which card from each of the chosen ranks is the one that is going to be in the hand, is choosing which of 4 cards from EACH rank is going to be in the hand. So for each rank there are 4 availble choices, and so there are [tex]4^5[/tex] possible ways to choose the specific cards from each rank that will be in the hand. So the amount of 5-card hands with all ranks different is [tex] {13 \choose 5}\cdot{4^5}[/tex]

Therefore the amount of 5-card hands with at least two cards with the same rank is  [tex]{52 \choose 5}-{13 \choose 5}\cdot4^5[/tex]

Answer:

b

Step-by-step explanation:

Answer: The sides length are 8.32 cm

Step-by-step explanation:

An equilateral triangle has all his sides of the same lenght, so we assume that the triangle has an L lenght in his sides.

The area of a triangle is [tex]Area = \frac{base * height}{2}[/tex] where the base is L, the Area is 30 and an unknown height.

To determine the height, we cut the triangle in half and take one side. By simetry, one side has a base of [tex]\frac{L}{2}[/tex], a hypotenuse of L and a the unknown height.  

Then we apply the Pythagoras theorem, this states that in a right triangle, the square of the hypotenuse is equal to the sum of the squares of the other two sides, or, [tex]hypotenuse = \sqrt{c^{2} + c^{2} }[/tex] Where one c is [tex]\frac{L}{2}[/tex] and the other is the height.

Then we find one of the c of the equation wich will be the height.

[tex]height = \sqrt{hypotenuse^{2}-base^{2} }[/tex]

[tex]height = \sqrt{ L^{2} -\frac{L}{4} ^{2}}\\height = \sqrt{\frac{ 3L^{2}}{4} } \\\\height = \frac{\sqrt{3}L }{2}[/tex]

Finally, we use the triangle area mentioned before an find the value of L.

[tex]30 = \frac{L*\frac{\sqrt{3}L }{2} }{2} \\\\L = \sqrt{\frac{120}{\sqrt{3} } } \\\\L = 8.32 cm[/tex]

Answer: 49 people

Step-by-step explanation:

First you need to separate the people that read both from the people that read the daily news. Do this by subtracting 171 - 40 = 131.

Now you can subtract the total amount of people that only read the Daily Mews from the total amount of people polled (198-131=67)

From here you need to subtract the amount of people that read neither from the remaining total. (67-18=49)

this is where you get the 49 people out of 198 that read the Sun Gazette

The number of people who read the Sun Gazette is calculated by subtracting the number of people who only read the Daily News and those who read neither from the total polled. The result is 49 Sun Gazette readers.

This problem involves the mathematics concept of set theory, specifically union and intersection of sets. Here, the total number of people polled are considered as the 'Universal Set'. The 'Daily News readers' and the 'Sun Gazette readers' are the two subsets of this Universal set.

The data given can be interpreted as follows:

Since 40 people read both, they are being counted twice in the 171 (Daily News readers) figure. Hence, we subtract 40 from 171.

The number of people who only read the Daily News = 171 - 40 = 131

We subtract this number and those who read neither from the total polled to find the number of Sun Gazette readers.

The number of Sun Gazette readers = 198 - 131 (only Daily News readers) - 18 (neither) = 49 Sun Gazette readers

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Answer:

one

Step-by-step explanation:

I think, there were 4 lines and the two lines are reaching each other

Answer:

35 people did no travel by any of those modes of transportation.

Step-by-step explanation:

Reviewing the groups described, we can see there are 170 that traveled by either plane or train and 50 traveled by bus, but not plane or train.

This means that the 50 people that traveled by bus are not included in the group of 170 that used either plane or train.

Since those two groups include people that used bus (50 people) and people that used either plane or train (170 people), the union of these two sets include all the people that used at least one of the tree modes of transportation mentioned (bus, plane or train).

The result of the union between these two sets is 50+170=220 people which travel by at least one of those modes of transportation.

Since the total number of surveyed adults is 255, the number of people that did not travel by any of these modes of transportations is 255-220=35 people.

Answer:

The required answer is 5790 meters in 1 minute.

Step-by-step explanation:

Consider the provided information.

193 meters in 2 seconds = meters in 1 minute

193 meters in 2 seconds can be written as:

193 meters = 2 seconds

There are 60 seconds in 1 minute. To convert 2 seconds to 1 minute multiply both the sides by 30.

30 × 193 meters = 30 × 2 seconds

5790 meters = 60 seconds

5790 meters = 1 minute (As we know 60 seconds = 1 minute)

This can be written as:

5790 meters in 1 minute.

Hence, the required answer is 5790 meters in 1 minute.

Answer: Transitive property of congruence.

Step-by-step explanation:

Transitive property of congruence is similar to transitive property of equality , it says that if a is congruent to b and b is congruent to c , then a is congruent to c.

Given statement : If AB is congruent to CD and CD is congruent to EF, then AB  is congruent to EF.

Here a= AB  , b= CD and c= EF

Therefore, the geometric postulates justifies given the statement must be Transitive property of congruence.

Answer:

[tex]\dfrac{2}{s^3}e^{-3s}\ +\ \dfrac{6}{s^2}e^{-3s}\ +\ \dfrac{9}{s}e^{-3s}\ -\ \dfrac{3}{s}[/tex]

Step-by-step explanation:

Given polynomial,

[tex]f(t)\ =\ t^2.u(t-3)\ -\ 3[/tex]

we can write above polynomial as

[tex]f(t)\ =\ (t-3+3)^2.u(t-3)\ -\ 3[/tex]

     [tex]=\ ((t-3)^2\ +\ 2\times 3\times (t-3)\ +\ 3^2).u(t-3)-3[/tex]

     [tex]=\ (t-3)^2.u(t-3)\ +\ 6(t-3).u(t-3)\ +\ 9.u(t-3)\ -\ 3[/tex]

Now, we have to calculate the Laplace of above polynomial

according to shifting property of Laplace transform, we can write

[tex]f(t-t_0)\ =\ F(s).e^{-st_0}[/tex]

So, we can write the Laplace transform of above polynomial as

[tex]L[f(t)]\ =\ L[(t-3)^2.u(t-3)\ +\ 6(t-3).u(t-3)\ +\ 9.u(t-3)\ -\ 3][/tex]

          [tex]=\ \dfrac{2}{s^3}e^{-3s}\ +\ \dfrac{6}{s^2}e^{-3s}\ +\ \dfrac{9}{s}e^{-3s}\ -\ \dfrac{3}{s}[/tex]

So, the Laplace transform of the given polynomial will be[tex]\ \dfrac{2}{s^3}e^{-3s}\ +\ \dfrac{6}{s^2}e^{-3s}\ +\ \dfrac{9}{s}e^{-3s}\ -\ \dfrac{3}{s}[/tex]

Over the 28-day cycle of taking Triphasil-28 birth control tablets, a total of 1.925 mg of levonorgestrel and 0.680 mg of ethinyl estradiol are consumed.

The Triphasil-28 birth control tablets are taken in a sequence of 21 active pills containing hormones and 7 inactive pills (placebos). To calculate the total amount of levonorgestrel and ethinyl estradiol consumed over the 28-day period, each phase needs to be taken into account.

In phase 1, there are 6 tablets each with 0.050 mg of levonorgestrel and 0.030 mg ethinyl estradiol. So, 6 tablets * 0.050 mg = 0.300 mg of levonorgestrel and 6 tablets * 0.030 mg = 0.180 mg of ethinyl estradiol.

In phase 2, there are 5 tablets each with 0.075 mg of levonorgestrel and 0.040 mg ethinyl estradiol. So, 5 tablets * 0.075 mg = 0.375 mg of levonorgestrel and 5 tablets * 0.040 mg = 0.200 mg of ethinyl estradiol.

In phase 3, there are 10 tablets each with 0.125 mg of levonorgestrel and 0.030 mg ethinyl estradiol. So, 10 tablets * 0.125 mg = 1.250 mg of levonorgestrel and 10 tablets * 0.030 mg = 0.300 mg of ethinyl estradiol.

Adding up all the quantities, we have a total of 0.300 mg + 0.375 mg + 1.250 mg = 1.925 mg of levonorgestrel and 0.180 mg + 0.200 mg + 0.300 mg = 0.680 mg of ethinyl estradiol consumed over the 21 active days of the 28-day cycle.

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If a  physician prescribes 2.5 million units of penicillin G potassium daily for 1 week. To provide the prescribed dosage regimen of 2.5 million units of penicillin G potassium daily for 1 week we would need 42 tablets, each containing 250 mg.

What is the Number of tablets needed ?

Total amount of penicillin G potassium required

Since there are 7 days in a week the total amount required is:

Total amount required =2.5 million units/day * 7 days

Total amount required = 17.5 million units

Convert the units of penicillin G potassium to micrograms (mcg)

Total amount required in micrograms:

Total amount required = 17.5 million units * 0.6 mcg/unit

Total amount required = 10.5 million mcg

Convert micrograms to milligrams (mg)

Convert the total amount required to milligrams:

10.5 million mcg / 1000

= 10,500 mg

The number of tablets needed:

Number of tablets needed:

Number of tablets needed = 10,500 mg / 250 mg/tablet

Number of tablets needed  = 42 tablets

Therefore to provide the prescribed dosage regimen of 2.5 million units of penicillin G potassium daily for 1 week we would need 42 tablets, each containing 250 mg.

The patient needs to take 42 tablets of penicillin G potassium over one week. This is determined by converting the prescribed units to milligrams and dividing by the tablet dosage.

Calculating Dosage of Penicillin G Potassium

To determine how many tablets of penicillin G potassium are needed, we need to go through several steps of unit conversion.

Therefore, the patient needs to take 42 tablets over the course of one week.

Answer:

Force, F = 68.93 pounds

Step-by-step explanation:

Given that,

Mass of the astronaut, m = 80.70 kg

Acceleration due to gravity on Mars, [tex]a=3.8\ m/s^2[/tex]

The force acting on him is given by using second law of motion as :

[tex]F=m\times a[/tex]

[tex]F=80.70\ kg\times 3.8\ m/s^2[/tex]

F = 306.66 N

Since, 1 newton = 0.224 pound

F = 306.66 N = 68.93 pounds

So, 68.93 pounds force she exerts on the martian surface. Hence, this is the required solution.

Answer:

The solutions of the equation are 0 and 0.75.

Step-by-step explanation:

Given : Equation [tex]16x^4 - 24x^3 +9x^2 =0[/tex]

To find : All solutions of the equation algebraically. Use a graphing utility to verify the solutions graphically ?

Solution :

Equation [tex]16x^4 - 24x^3 +9x^2 =0[/tex]

[tex]x^2(16x^2-24x+9)=0[/tex]

Either [tex]x^2=0[/tex] or [tex]16x^2-24x+9=0[/tex]

When [tex]x^2=0[/tex]

[tex]x=0[/tex]

When [tex]16x^2-24x+9=0[/tex]

Solve by quadratic formula, [tex]x=\frac{-b\pm\sqrt{b^2-4ac}}{2a}[/tex]

[tex]x=\frac{-(-24)\pm\sqrt{(-24)^2-4(16)(9)}}{2(16)}[/tex]

[tex]x=\frac{24\pm\sqrt{0}}{32}[/tex]

[tex]x=\frac{24}{32}[/tex]

[tex]x=\frac{3}{4}[/tex]

[tex]x=0.75[/tex]

The solutions of the equation are 0 and 0.75.

For verification,

In the graph where the curve cut x-axis is the solution of the equation.

Refer the attached figure below.

Answer:

a) 10912 Yards

b) 9977.93 meters

Step-by-step explanation:

We are given the following information in the question.

1 Meter = 100 Centimeter

1 Inch = 2.54 Centimeter

1 Foot = 12 Inch

1 Yard = 3 Foot

1 Mile = 1760 Yards

The length of race is 6.2 miles.

a) We have to find length of race in yards.

Since we know 1 Mile = 1760 Yards

Thus, 6.2 Miles = 6.2 × 1760 Yards = 10912 Yards

Thus , the race is 10912 yards in length.

b) We have to calculate the length of the race in meters.

Since we know 1 Mile = 1760 Yards

Thus. 6.2 miles = [tex]\frac{(6.2)(1760)(3)(12)(2.54)}{100}[/tex] = 9977.93 meters

Answer:

1015 widgets

Step-by-step explanation:

First investigate how many widgets can machine A produce in 1 hour:

If it produces 435 in 3 hours, then it will produce one third of that in one hour:

In ONE (1) hour [tex]\frac{435}{3} = 145[/tex] widgets

Therefore in seven (7) hours it will produce seven times the amount it does in one hour, that is:

[tex]145 * 7 = 1015[/tex] widgets

Answer:

answer is 1015.

Step-by-step explanation:

Answer:

4.3155 kW

Step-by-step explanation:

Given,

speed of wind when enters into the turbine, V = 12 m/s

speed of wind when exits from the turbine, U = 9 m/s

mass flow rate of the wind = 137 kg/s

According to the law of conservation of energy

Energy generated = change in kinetic energy

Hence,energy generated in 1 sec can be given by

[tex]E\ =\ \dfrac{1}{2}.m.V^2\ -\ \dfrac{1}{2}.m.U^2[/tex]

   [tex]=\ \dfrac{1}{2}\times 137\times 12^2\ -\ \dfrac{1}{2}\times 137\times 9^2[/tex]

   [tex]=\ 9864\ -\ 5548.5[/tex]

    = 4315.5 J

So, the power generated in 1 sec will be given by

[tex]P\ =\ \dfrac{energy\ generated}{time}[/tex]

    [tex]=\ \dfrac{4315.5}{1}[/tex]

    = 4315.5 W

    = 4.13 kW

So, the power generated will be 4.13 kW.

Answer:

360 inch

Step-by-step explanation:

Step 1: Converting

6inch = 6inch

5ft = 60inch

Step 2: Finding the area

Area of a rectangle = L x B

A = 6 x 60

A = 360inch

Answer:

[tex]f''(x)=f''(-x)[/tex]

Step-by-step explanation:

A function satisfying the equation [tex]f(x)=f(-x)[/tex] is said to be an even function. This denomination comes from the fact that the same relation is satisfied for functions of the form [tex]x^{n}[/tex] with [tex]n[/tex] even. Observe that if [tex]f[/tex] is twice differentiable we can derivate using the chaing rule as follows:

[tex]f(x)=f(-x)[/tex] implies [tex]f'(x)=f'(-x)\cdot (-1)=-f'(-x)[/tex]

Applying the chain rule again we have:

[tex]f'(x)=-f'(-x)[/tex] implies [tex]f''(x)=-f''(-x)\cdot (-1)=f''(-x)[/tex]

So we have that function [tex]f''(x)[/tex] is also an even function.

Answer with Step-by-step explanation:

We are given that [tex]v_1,v_2,..,v_4[/tex] are in [tex]R^4[/tex] and [tex]v_1,v_2,v_3[/tex] is linearly dependent then {v_1,v_2,v_3,v_4}[/tex] is also linearly dependent.

We have to find that given statement is true or false.

Dependent vectors:Dependent vectors are those vectors in which atleast one vector is  a linear combination of other given vectors.

Or If we have vectors [tex]x_1,x_2,....x_n[/tex]

Then their linear combination

[tex]a_1x_1+a_2x_2+.....+a_nx_n=0[/tex]

There exist at least one scalar which is not zero.

If [tex]v_1,v_2,v_3[/tex] are dependent vectors then

[tex]a_1v_1+a_2v_2+a_3v_3=0[/tex] for scalars [tex]a_1,a_2,a_3[/tex]

Then , by definition of dependent  vectors

There exist a vector which is not equal to zero

If vector [tex]v_3[/tex] is a linear combination of [tex]v_1\;and \;v_2[/tex], So at least one of vectors in the set is a linear combination of others and the set is linearly dependent.

Hence, by definition of dependent vectors

{[tex]v_1,v_2,v_3,v_4[/tex]} is linearly dependent.

Option B is true.