Describe or show two ways to find the following product: 1/4 x 2/3.

To find the value of k that makes f(x) a probability density function, we need to satisfy two conditions: f(x) must be non-negative for all x and the total area under the curve of f(x) must equal 1. Solving the integral of the function f(x) = k(9x - x^2) from x = 0 to x = 9, we find that the value of k that satisfies these conditions is approximately 0.0696.

In order for the function f(x) to be a probability density function, it must satisfy two conditions:

The function must be non-negative for all values of x.

The total area under the curve of the function must be equal to 1.

Let's analyze the function f(x) = k(9x - x^2) for 0 ≤ x ≤ 9 and f(x) = 0 for x < 0 or x > 9:

Therefore, the value of k that makes f(x) a probability density function is approximately 0.0696.

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Answer : The correct equation will be, (A) [tex]d=(55)\times (4.5)[/tex]

Step-by-step explanation :

As we are given that:

Speed = 55 mph

Time = 4.5 hr

As we know that:

[tex]Distance=Speed\times Time[/tex]

So,

[tex]Distance=55mph\times 4.5hr[/tex]

[tex]Distance=55\times 4.5[/tex]

or,

[tex]d=(55)\times (4.5)[/tex]

Thus, the correct equation will be, (A) [tex]d=(55)\times (4.5)[/tex]

The units after conversion are:

48 c = 12 qt

96 oz > 5 lb

6 yd, 1 ft = 19 ft

6 1/2 lb = 104 oz

We have,

1.

To convert 48 cups to quarts, we know that there are 4 cups in 1 quart. Therefore, dividing 48 by 4 gives us the number of quarts.

48 cups / 4 cups/quart = 12 quarts

2.

To compare 96 ounces to 5 pounds, we need to convert one of the units so that they are in the same unit of measurement.

Since there are 16 ounces in 1 pound, we can convert 5 pounds to ounces.

5 pounds x 16 ounces/pound = 80 ounces

3.

Now we can compare 96 ounces and 80 ounces.

Since 96 is greater than 80.

4.

To convert 6 yards and 1 foot to feet, we know that there are 3 feet in 1 yard.

Therefore, we can convert the yards to feet and add the 1 foot.

6 yards x 3 feet/yard = 18 feet

18 feet + 1 foot = 19 feet

5.

To convert 6 1/2 pounds to ounces, we know that there are 16 ounces in 1 pound. We can convert the whole number part and the fraction part separately and then add them together.

6 pounds x 16 ounces/pound

= 96 ounces

Now let's convert the fraction:

1/2 pound x 16 ounces/pound = 8 ounces

Adding the two parts together:

96 ounces + 8 ounces = 104 ounces

Thus,

The units after conversion are:

48 c = 12 qt

96 oz > 5 lb

6 yd, 1 ft = 19 ft

6 1/2 lb = 104 oz

Learn more about unit conversion here:

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Let

x-------> represents the poodle’s body length

y-------> represents the shoulder height

Constraints

[tex]10\ in \leq y \leq 15\ in[/tex] --------> constraint A

[tex]x \leq 16\ in[/tex] --------> constraint B

[tex]y \leq x+1[/tex] --------> constraint C  

Using a graphing tool

see the attached figure

The solution is the shaded area

we know that

If a pair ordered is a solution for a successful poodle measurement

then

the pair ordered meet all the constraints

Let's check each case to determine the solution to the problem

Replace the values of x and y of the point in the different constraints. If all constraints are met, then the point is a system solution

Case A) [tex](11,14)[/tex]  

constraint A

[tex]10\ in \leq 14 \leq 15\ in[/tex] ------> is true

constraint B

[tex]11 \leq 16\ in[/tex] --------> is true

constraint C

[tex]14 \leq 11+1[/tex]

[tex]14 \leq 12[/tex] -------> is not true

therefore

the pair  [tex](11,14)[/tex] does not meet all constraints

Case B) [tex](10,12)[/tex]  

constraint A

[tex]10\ in \leq 12 \leq 15\ in[/tex] ------> is true

constraint B

[tex]10 \leq 16\ in[/tex] --------> is true

constraint C

[tex]12 \leq 10+1[/tex]

[tex]12 \leq 11[/tex] -------> is not true

therefore

the pair  [tex](10,12)[/tex]  does not meet all constraints

Case C) [tex](12,10.5)[/tex]  

constraint A

[tex]10\ in \leq 10.5 \leq 15\ in[/tex] ------> is true

constraint B

[tex]12 \leq 16\ in[/tex] --------> is true

constraint C

[tex]10.5 \leq 12+1[/tex]

[tex]10.5 \leq 13[/tex] -------> is true

therefore

the pair  [tex](12,10.5)[/tex]  meets all constraints

Case D) [tex](15,11)[/tex]  

constraint A

[tex]10\ in \leq 11 \leq 15\ in[/tex] ------> is true

constraint B

[tex]15 \leq 16\ in[/tex] --------> is true

constraint C

[tex]11 \leq 15+1[/tex]

[tex]11 \leq 16[/tex] -------> is true

therefore

the pair [tex](15,11)[/tex] meets all constraints

Case E) [tex](11,9)[/tex]  

constraint A

[tex]10\ in \leq 9 \leq 15\ in[/tex] ------> is not true

constraint B

[tex]11 \leq 16\ in[/tex] --------> is true

constraint C

[tex]11 \leq 15+1[/tex]

[tex]11 \leq 16[/tex] -------> is true

therefore

the pair  [tex](11,9)[/tex]    does not meet all constraints

therefore

the answer is

[tex](12,10.5)[/tex]

[tex](15,11)[/tex]

Answer:  The missing term in the given geometric sequence is 20√5  or  -20√5.

Step-by-step explanation:  We are given to find the missing term in the following geometric sequence :

4,     ?,    500,  .   .   .

Let b represents the missing term.

Since the given sequence is a geometric one, so there common ratio r such that

[tex]\dfrac{b}{4}=\dfrac{500}{b}=r\\\\\\\Rightarrow \dfrac{b}{4}=\dfrac{500}{b}\\\\\Rightarrow b^2=4\times500\\\\\Rightarrow b^2=2000\\\\\Rightarrow b=\pm\sqrt{2000}\\\\\Rightarrow b=\pm20\sqrt{5}.[/tex]

Thus, the missing term in the given geometric sequence is 20√5  or  -20√5.

To calculate the average weekly driving mileage based on an annual average of 11,900 miles, divide the total miles by 52 weeks, resulting in approximately 228.85 miles driven per week.

The question asks us to calculate how many miles are driven each week if an average person drives 11,900 miles per year. To find the weekly mileage, we can divide the total annual miles by the number of weeks in a year. Since there are 52 weeks in a year, we would perform the following calculation:

Therefore, on average, a person drives approximately 228.85 miles each week.

To write the comparison as a ratio reduced to lowest terms, we need to convert both the hours and the days to a common unit of time. There are 24 hours in a day, so we can convert 13 days to hours by multiplying 13 by 24: 13 days x 24 hours/day = 312 hours. Now, the comparison is 114 hours to 312 hours. We can simplify this ratio by dividing both numbers by their greatest common factor, which is 6. 114 ÷ 6 = 19, and 312 ÷ 6 = 52. Therefore, the simplified ratio is 19:52.

To write the comparison as a ratio reduced to lowest terms, we need to convert both the hours and the days to a common unit of time. There are 24 hours in a day, so we can convert 13 days to hours by multiplying 13 by 24: 13 days x 24 hours/day = 312 hours. Now, the comparison is 114 hours to 312 hours. We can simplify this ratio by dividing both numbers by their greatest common factor, which is 6. 114 ÷ 6 = 19, and 312 ÷ 6 = 52. Therefore, the simplified ratio is 19:52.

Answer:

Solve for

x = 1

y = 7

Step-by-step explanation:

Final answer:

To find the number of teams playing the game, divide the total number of children by the number of children on each team. In this case, there are 20 children and 5 children on each team, so there are 4 teams playing the game.

Explanation:

To find the number of teams playing the game, you can divide the total number of children by the number of children on each team. In this case, there are 20 children and 5 children on each team. So, the division sentence to represent the problem is:

20 ÷ 5 = 4

Therefore, there are 4 teams playing the game.

Answer:

1.

add 1

m - 1 = 2

2.

subtract 1

3 = 1 + m

3.

add 2

-2 + m = 1

4 .

subtract m

2m = 1 + m

5 .

subtract 2

2 + m = 3

6 .

subtract 2m

2m - 1 = 3m

Final answer:

The simplified form of the expression [tex](-0.2b^{6})^3(5b)[/tex] is [tex]-0.04b^{19}[/tex], obtained through raising to a power and multiplication.

Explanation:

The student's question involves simplifying an algebraic expression by raising a term to a power and then multiplying it by another term. To simplify [tex](-0.2b^{6})^3(5b)[/tex], we must first raise [tex]-0.2b^{6}[/tex] to the third power and then multiply the result by 5b. This will give the answer [tex]-0.04b^{19}[/tex], which can be obtained following the below mentioned steps.

Let's do this step by step:

Raise [tex]-0.2b^{6}[/tex] to the third power: [tex](-0.2)^3[/tex]= −0.008 and [tex](b^{6})^3[/tex]= [tex]b^{18}[/tex]

Multiply the result by 5b: [tex](-0.008)b^{18}*5b[/tex] = [tex](-0.008*5)b^{18+1}[/tex] = [tex]-0.04b^{19}[/tex]

The final simplified expression is [tex]-0.04b^{19}[/tex].

Answer:

22 square foot

Step-by-step explanation:

Consider PQR be a triangle, such that PQ=9 feet, PR=10 feet.

Now, Perimeter of triangle=24

⇒Sum of all the sides=24

⇒PQ+PR+QR=24

⇒9+10+QR=24

⇒QR=5 feet

Also, s=[tex]\frac{a+b+c}{2}=\frac{9+10+5}{2}=12[/tex]

Area of triangle A=[tex]\sqrt{s(s-a)(s-b)(s-c)}[/tex]

=[tex]\sqrt{12(12-9)(12-10)(12-5)}[/tex]

=[tex]\sqrt{12(3)(2)(7)}[/tex]

=[tex]\sqrt{504}[/tex]

=[tex]22.44[/tex]

≈[tex]22sq foot[/tex]

thus, area of triangle=22 square foot.

Answer:

The probability is 38.4%

Step-by-step explanation: Here we have two posibilites for each of the 3 items, it is defective or it is not.

Where the probability that the item is defective is equal to 20% (or 0.2 in decimal form)

Now, if only one is defective, this means that the other two are not, so the probabilites (at random) are 20%, 80% and 80%.

Then the joint probability, equal to the product of those 3 probabilities, is:

p = 0.2*0.8*0.8 = 0.128

But we have 3 posible permutations (in which different options are the deffective one) so the probability is 3 times that number:

P = 3p = 3*0.128 = 0.384

So the probbility, in percentage form, is 38.4%

Answer:

0

Step-by-step explanation:

the other person is correct! :D