Kathy distributes jelly beans among her friends. Alia gets 4^2 fewer jelly beans than Kelly, who gets 3^3 jelly beans. How many jelly beans does Alia get? A. 4^2 ? 3^3 B. 3^3 + 4^2 C. 4 ? 3^3 D. 3^3 ? 4^2 E. 3^2 ? 4^3

Answer:

1 plant

Step-by-step explanation:

The T.Rex dinosaur eats ten twelffths of a plant and later eats two twelfths of a plant. In total, the T.Rex dinosaur ate:

[tex]\frac{10}{12} + \frac{2}{12} =\frac{12}{12}=1[/tex]

Therefore, the dinsaur in total ate one entire plant.

It's better to solve the problem by using fractions instead of decimals. If we had used decimals the response would be the following:

[tex]0.833333+0.166666=0.999999[/tex] which can be rounded to 1.

The pattern in the sequence 9, 3, 1, 1/3 involves each number being a third of the previous number. Following this rule, the next number after 1/3, obtained by dividing by 3, is 1/9.

To determine the next number in the sequence 9, 3, 1, 1/3, we need to identify the pattern or rule that is being followed. Observing the sequence, each subsequent number appears to be a third of the previous number. The first number is 9, and dividing by 3 gives us 3. Dividing the second number, 3, by 3 gives us 1.

Similarly, dividing the third number, 1, by 3 gives us 1/3. Following this logic, to find the next number in the sequence, we divide 1/3 by 3.

Using the arithmetic of division with fractions, we have (1/3) ÷ 3 = (1/3) ÷ (3/1) = 1/9. Therefore, the next number in the sequence is 1/9. We can assume that the rule being applied in this sequence is to divide each number by 3 to find the next number, which aligns with the mathematical pattern identification techniques commonly used.

The next number in the sequence is 1/9.

To find the next number in the sequence 9, 3, 1, 1/3, we need to identify the pattern. This sequence is a geometric sequence where each term is obtained by multiplying the previous term by a common ratio.

Step-by-step:

To find the next term, we continue this pattern:
1/3× (1/3) = 1/9

Answer:

Step-by-step explanation:

They are all true

the answer is a

a square should have 4 lines or sides the same length any longer or shorter would make it a rectangle

Answer:

False

Step-by-step explanation:

If two spheres have the same center but different radii, they are NOT called concentric spheres. They would be called congruent circles if they have the same center but different radii.

Answer:

false

Step-by-step explanation:

Answer:

Step-by-step explanation:

If we let a, b, c represent the numbers of type-1, type-2, and type-3 cabinets produced in the first week, respectively, we can write three equations in these unknowns:

It can be convenient to let a machine solver find the solution to this set of equations. Most graphing calculators can handle it, along with several web sites.

__

Solving by hand, we can subtract the second equation from twice the first. This gives ...

  2(a +b +c) -(a +2b -c) - 2(110) -(10)

  a +3c = 210 . . . . simplify

Subtracting this from 3 times the third equation gives ...

  3(3a +c) -(a +3c) = 3(110) -(210)

  8a = 120 . . . . . simplify

  a = 15 . . . . . . . divide by 8

Using this in the third equation of the original set, we have ...

  3·15 +c = 110

  c = 65 . . . . . . subtract 45

Then, in the first equation, we get ...

  15 + b + 65 = 110

  b = 30 . . . . . . . subtract 80

The solution is (type-1, type-2, type-3) = (15, 30, 65) for the first week.

The problem provides a set of linear equations. Solving this system by substitution or elimination method will give the number of cabinets of each type produced each week. The equations are formed based on the conditions provided in the problem.

From the information provided, we can use a system of equations to solve this. Let's denote the number of type-1 cabinets made in the first week as x , the number of type-2 cabinets as y, and the number of type-3 cabinets as z. The first condition in the problem gives us the equation x + 2y = z + 10. The total number of cabinets produced in each week is 110, so we get the equation x + y + z = 110 for the first week. From the second week's conditions, we know that no type-2 cabinets were made (y=0), the number of type-3 cabinets was the same (z=z) and the number of type-1 cabinets was three times as much as the first week (x=3x), this means 3x + 0 + z = 110.. Solving this system of equations will provide the number of cabinets produced for each type.

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Answer:

The zeros of our function f is at x=-1.

The discontinuity is at x=-4.

These are correct if the function is [tex]f(x)=\frac{x^2+5x+4}{x+4}[/tex] .

Please let know if I did not interpret your function correctly.

Step-by-step explanation:

I imagine you mean [tex]f(x)=\frac{x^2+5x+4}{x+4}[/tex] but please correct me if I'm wrong.

The zero's of a rational expression occur from it's numerator.

That is, in a fraction, the only thing that makes that fraction 0 is it's numerator.

So we need to solve [tex]x^2+5x+4=0[/tex] for x.

The cool thing is this one is not bad to factor since the coefficient of x^2 is 1.  When the coefficient of x^2 is 1 and you have a quadratic, all you have to do is ask yourself what multiplies to be c and adds to be b.

[tex]x^2+5x+4[/tex] comparing to [tex]ax^2+bx+c[/tex] gives you [tex]a=1,b=5,c=4[/tex].

So we are looking for two numbers that multiply to be c and add to be b.

We are looking for two numbers that multiply to be 4 and add to be 5.

Those numbers are 1 and 4 since 1(4)=4 and 1+4=5.

The factored form of [tex]x^2+5x+4[/tex] is [tex](x+1)(x+4)[/tex].

So [tex]x^2+5x+4=0[/tex] becomes  [tex](x+1)(x+4)=0[/tex].

If you have a product equals 0 then at least one of the factors is 0.

So we need to solve x+1=0  and x+4=0.

x+1=0 when x=-1 (subtracted 1 on both sides to get this).

x+4=0 when x=-4 (subtracted 4 on both sides to get this).

The zeros of our function f is at x=-1 and x=-4.

Now to find where it is discontinuous.  We have to think 'oh this is a fraction and I can't divide by 0 but when is my denominator 0'.  If the value for the variable is not obvious to you when the denominator is 0, just solve x+4=0.

x+4=0 when x=-4 (subtracted 4 on both sides).

So we have a contradiction at one of the zeros so x=-4 can't be a zero.  

The discontinuity is at x=-4.

Answer:

This function is discontinuous at x = 4, and has a zero at x = -1.

Step-by-step explanation:

If x = -4, the denominator will be zero and thus the function will be undefined.  Thus, the discontinuity is at x = -4.

To find the zero(s):  Set the numerator = to 0, obtaining

x^2+5x+4 = 0.  Factoring this, we get (x + 4)(x + 1) = 0.  Thus, we have a zero at x = -1.  

Notice that f(x) can be rewritten as

         x^2 + 5x + 4       (x+4)(x+1)

f(x) = -------------------- = ---------------- = x + 1 for all x other than x = -4.

               x + 4                 (x+4)

This function is discontinuous at x = 4, and has a zero at x = -1.

Answer:

b. Statistic

Step-by-step explanation:

b. Statistic because the value is a numerical measurement describing a characteristic of a sample.

Answer:

Option b

Step-by-step explanation:

Given that a sample of employees is selected and it is found that 55 % own a vehicle.

Before we answer the questions let us understand the difference between a parameter and a statistic.

Parameters are numbers that summarizes the data of a population.  But statistics are numbers that summarizes the data of a sample.

Sample is a subset of population i.e. a small portion of the whole population is sample.

Here 55% is the proportion of the sample of employees.  Since this is a number summarizing the data about a sample this is called statistic.

b. Statistic because the value is a numerical measurement describing a characteristic of a sample.

Answer:

  V = 99π in³; S = 81π in²

Step-by-step explanation:

Volume is that of a hemisphere of radius 3 in together with that of a cylinder of radius 3 in and height 9 in.

  V = (2/3)πr³ +πr²h = (πr²)(2/3r +h)

  = 9π(2 +9) = 99π . . . . in³

__

The area is that of a hemisphere, the side of the cylinder, and the circular bottom of the cylinder.

  S = 2πr² +2πrh +πr² = πr(2r +2h +r)

  S = 3π(6+18 +3) = 81π . . . . in²

Answer:

x = 12.63        or         x= -0.63

Step-by-step explanation:

From my understanding the question is x² - 12x = 8

This will be solved through a quadratic equation formula.

Step 1: Form a quadratic equation

x² - 12x = 8

x² - 12x - 8 = 0

Step 2: Apply the quadratic formula

a = 1, b = -12, c = -8

x = -b±√b²-4ac

          2a

x = -(-12)±√(-12)²-4(1)(-8)

                 2(1)

Step 3: Find the value of x

x = 12±4√(11

           2

x = 12+4√(11)                  or            x =  12-4√(11)

            2                                                  2

x = 12.63                         or            x= -0.63

!!

Answer:

2 complex conjugates

Step-by-step explanation:

The discriminate is the part of the quadratic formula that is under the radical sign.  If the discriminate is negative, that means that the solutions, both of them, are complex conjugates, aka imaginary solutions.

For this case we have that by definition, the discriminant of an equation is given by:

[tex]D = b ^ 2-4 (a) (c)[/tex]

We have the following cases:

[tex]D> 0:[/tex] Two different real roots

[tex]D = 0:[/tex]Two equal real roots

[tex]D <0:[/tex] Two different complex roots

In this case we have to:

[tex]D = -6[/tex], [tex]-6 <0[/tex] , Then we have two different complex roots.

Answer:

OPTION B

Answer:

B 6.3

Step-by-step explanation:

r = 8

l = 2*3.14*r

l = 50.24

s=l/360*45

s≈6.3

For this case we have that by definition, the arc length is given by:

[tex]Al = 2 \pi * r *\frac {a} {360}[/tex]

Where:

r: It's the radio

a: It is the angle of the sector

Then, according to the data we have:

[tex]Al = 2 \pi * 8 * \frac {45} {360}\\Al = 2 * 3.14 * 8 * \frac {45} {360}\\Al = 50.24 * \frac {45} {360}\\Al = 6.28[/tex]

Rounding we have 6.3in

Answer:

Option B

Answer:

The probability that you will choose a consonant and then a vowel is 0.21....

Step-by-step explanation:

Total no of tiles = 28 + 12 = 40

First you should choose a consonant = 12/40

Second you should choose a vowel = 28/40

So the probability you choose a consonant and then a vowel:

= 12/40 * 28/40

=336/1600

=0.21

So the probability that you will choose a consonant and then a vowel is 0.21....

Answer: Required probability is,

[tex]\frac{36}{231}[/tex]

Step-by-step explanation:

Given,

White socks = 10,

Black socks = 6,

Brown socks = 4,

Blue socks = 2,

Total socks = 10 + 6 + 4 + 2 = 22,

Thus, the total ways of choosing any 2 socks = [tex]^22C_2[/tex],

Now, the ways of choosing a black socks = [tex]^6C_1[/tex]

Thus, ways of choosing a pair of black socks = [tex]^6C_1\times ^6C_1[/tex]

Hence, the probability of pulling out a matching pair of black socks

= [tex]\frac{^6C_1\times ^6C_1}{^{22}c_2}[/tex]

= [tex]\frac{36}{231}[/tex]

Answer:

  110

Step-by-step explanation:

z is apparently 10 times x.

10 times 11 is 110.

Hey! I just answered this on plato. the answer is that it includes negative factors, which makes not all solutions viable.

Answer:

Look at the attachment

Step-by-step explanation:

First we need to find out the equations that will represent each inequality:

For the bacteria:

This is an exponential growth equation, the formula is simple:

y≤[tex]n*(1+r)^{x}[/tex]  where n is the starting point of the sample, r is the rate and x is the variable dependent on time so:

y≤[tex]100*(1+0.062)^{x}[/tex]

y≤[tex]100*(1.062)^{x}[/tex]

For the container:

This is a line equation, following the formula:

y<mx+b where m is the slope or growing rate (100 more per hour), and b is the starting point (300 bacteria)

y< 100x+300

The graph will be like is showed in the attachment, and the solution is the intersecting area to the right of both functions, since they are trying to find out if the inhibitor works, the rate of growth will be equal or smaller than 6.2% thus closing in to 100 bacterias as a constant in time if it works.

Answer:

Option C.) Geometric, common ratio = 3

Step-by-step explanation:

we know that

In a Geometric Sequence each term is found by multiplying the previous term by a constant

The constant is called the common ratio

In this problem we have

For x=1, f(1)=3

For x=2, f(2)=9

For x=3, f(3)=27

For x=4, f(4)=81

so

f(2)/f(1)=9/3=3 -----> f(2)=3*f(1)

f(3)/f(2)=27/9=3 -----> f(3)=3*f(2)

f(4)/f(3)=81/27=3 -----> f(4)=3*f(3)

f(n+1)/f(n)=3 -----> f(n+1)=3*f(n)

therefore

This is a Geometric sequence and the common ratio is equal to 3

The sequence is a geometric sequence with a common ratio of 3.

The sequence given is a geometric sequence. A geometric sequence is a sequence of numbers where each term after the first is found by multiplying the previous term by a fixed, non-zero number called the common ratio. In this case, the common ratio can be found by dividing a term in the sequence by its preceding term. For example, if we divide the second term (9) by the first term (3), we get 3. The same goes for the rest of the terms in the sequence. Therefore, the correct answer is Option C: Geometric, common ratio = 3.

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Answer:

x=7

Step-by-step explanation:

Since this is a parallelogram, you can say that the 5x+3 will equal to 38 in this situation. 38-3 =35.

[tex]\frac{35}{5} \\\\x=7[/tex]

So the answer is 7

Answer:

The total interest earned is $1,439.

Step-by-step explanation:

Consider the provided information:

Florence Tyler invests $6,500 in a 4-year certificate of deposit that earns interest at an annual rate of 5% compounded daily.

Now, Use the formula: [tex]A=P(1+\frac{r}{n} )^{nt}[/tex]

Where, A is the total amount (after adding interest), P is the principal (investment or loan), r is the interest rate, n is compound, and t is the time (in years).

[tex]A=P(1+\frac{r}{n} )^{nt}[/tex]

[tex]A=6500(1+\frac{0.05}{365} )^{4(365)}[/tex]

[tex]A=6500(1.00014)^{1460}[/tex]

[tex]A=6500(1.22139)[/tex]

[tex]A=7939.00918[/tex]

Therefore total interest earned is:  

$7,939.00 - $6500 = $1,439.00

Hence, interest earned is $1,439.

Explanation:

A fraction of an hour costs the same as an hour.

  actual time ⇒ time charged ⇒ cost of parking

  5 min ⇒ 1 hour ⇒ $3

  1 hour ⇒ 1 hour ⇒ $3

  1 hour 50 min ⇒ 2 hours ⇒ $6

  2 hours ⇒ 2 hours ⇒ $6

  2 hours 1 min ⇒ 3 hours ⇒ $9

  3 1/2 hours ⇒ 4 hours ⇒ $12

Answer:

g(x) = -5x

Step-by-step explanation:

If the point from f(x) is plotted using the slope, the coordinate would be located at (1, 5) since the slope of 5x tells us we go up 5 units from the origin and over 1 unit to the right.  That point will be reflected through the x-axis to land at (1, -5).  That means that the equation of the new line would be

g(x) = -5x

A reflection across the x -axis would have the opposite value of the output.

If the value is a positive value, the mirrored value would be a negative value.

The function of g(x) would be g(x) = -5x

Answer:

  [tex]8a^6b^{-1}[/tex]

Step-by-step explanation:

This is math that involves the properties of exponents. For this problem, three rules are used:

[tex](ab)^c=a^cb^c\\\\(a^b)^c=a^{bc}\\\\a^{-b}=\dfrac{1}{a^b}[/tex]

So, your expression can be written as ...

[tex]\dfrac{(2a^2)^3}{b}=\dfrac{2^3(a^2)^3}{b^1}=8a^6b^{-1}[/tex]

The mathematics involved is about exponential notation and algebraic expressions. The expression (2a^2)^3/b simplifies to 8a^6b^-1.

The math involved here is known as exponential notation and algebraic expressions. In the given expression (2a^2)^3/b, the power rule of exponents can be applied, where to simplify the power of a power, we multiply the exponents. Therefore, (2a^2)^3 becomes 2^3 * (a^2)^3 which equals 8a^6. The expression then becomes 8a^6/b. This can be rewritten as 8a^6b^-1 (since anything divided by b can be written as multiplied by b^-1) adhering to the ca^pb^q format. So, the equivalent form of the given expression is 8a^6b^-1.

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Step-by-step explanation:

An inscribed angle is half the arc angle.

m∠MNQ = 80°/2

m∠MNQ = 40°

The angle between two chords is the average of the arc angles.

m∠AMB = (80° + 85°) / 2

m∠AMB = 82.5°

Answer:

x = (C-By)/A

Step-by-step explanation:

Ax + By = C

Subtract By from each side

Ax + By-By = C-By

Ax = C -By

Divide each side by A

Ax/A = (C-By)/A

x = (C-By)/A

Answer:

[tex]f(x)=120,000(1.055)^{x}[/tex]

Step-by-step explanation:

In this problem we have a exponential function of the form

[tex]f(x)=a(b)^{x}[/tex]

where

f(x) a home's value

x the number of years

a is the initial value

b is the base

b=(1+r)

r is the rate of grown

we have

a=$120,000

r=5.5%=5.5/100=0.055

b=1+0.055=1.055

substitute

[tex]f(x)=120,000(1.055)^{x}[/tex]

Answer:

It is In fact C. f(x) = 120,000(1.055)x

Step-by-step explanation:

Took this on Edg, it's right.

Answer:

12a^3 + 2a^2 + 23a + 18    

Step-by-step explanation:

Please use the " ^ " symbol to represent exponentiation:   4a^2 – 2a + 9.

Now carry out the multiplication as follows:

First, multiply each term in 4a^2 – 2a + 9 by 3a:  12a^3 - 6a^2 + 27a.

Next, multiply each term in 4a^2 – 2a + 9 by 2:  8a^ 2 - 4a + 18.

Now combine like terms:

12a^3 - 6a^2 + 27a

            8a^ 2 - 4a + 18

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

12a^3 + 2a^2 + 23a + 18                

a.

a^2 + b^2 = c^2

The legs are a and b. c is the hypotenuse.

Let a = 6x + 9y; b = 8x + 12y; c = 10x + 15y

The equation is:

(6x + 9y)^2 + (8x + 12y)^2 = (10x + 15y)^2

b.

Now we square each binomial and combine like terms on each side.

36x^2 + 108xy + 81y^2 + 64x^2 + 192 xy + 144y = 100x^2 + 300xy + 225y^2

36x^2 + 64x^2 + 108xy + 192xy + 81y^2 + 144y^2 = 100x^2 + 300xy + 225y^2

100x^2 + 300xy + 225y^2 = 100x^2 + 300xy + 225y^2

The two sides are equal, so it is an identity.

Answer:

see below

Step-by-step explanation:

a  The pythagorean theorem is a^2 + b^2 = c^2  where a and b are the legs and c is the hypotenuse

a^2 + b^2 = c^2

(6x+9y)^2 + (8x+12y)^2 = (10x + 15y)^2

b solve

(6x+9y)^2 + (8x+12y)^2 = (10x + 15y)^2

(6x+9y)(6x+9y) + (8x+12y)(8x+12y) = (10x + 15y)(10x+15y)

Factor out the common factors

3(2x+3y)3(2x+3y) + 4(2x+3y)4(2x+3y) = 5(2x+3y)5(2x+3y)

Rearrange

9 (2x+3y)^2 +16 (2x+3y)^2 = 25(2x+3y)^2

Divide each side by(2x+3y)^2

9 (2x+3y)^2/ (2x+3y)^2 +16 (2x+3y)^2/(2x+3y)^2 = 25(2x+3y)^2/(2x+3y)^2

9 + 16 = 25

25=25

This is true, so it is an identity

Answer: Option A

[tex]\theta=tan^{-1}(\frac{8}{6})[/tex]

Step-by-step explanation:

We can model the situation by means of a right triangle.

Where the  angle [tex]\theta[/tex] is the angle that you make with the top of the TV.

Then the horizontal distance of 6 feet is the adjacent side and the vertical distance of 8 feet is the opposite side to the angle the.

By definition of the [tex]tan(\theta)[/tex] function we know that:

[tex]tan(\theta)=\frac{opposite}{adjacent}[/tex]

Therefore:

[tex]tan^{-1}(\frac{8}{6})=\theta[/tex]

[tex]\theta=tan^{-1}(\frac{8}{6})[/tex]

Answer:

CORRECT

Step-by-step explanation:

Answer:

  A. 25°

Step-by-step explanation:

The angles on either side of the bisector are congruent, so ...

  (3x -5)° = (x +15)°

  2x = 20 . . . . . . . . . . . . divide by °; add 5-x

  x = 10 . . . . . . . . . . . . . .divide by 2

Substitute this result into the expression for the angle measure:

m∠BAC = (3·10 -5)° = 25°

Answer: The answer would be 333

Step-by-step explanation: Hope this was helpful

To make at least $5,000, Anna must sell a minimum of 200 at-the-door tickets priced at $25 each. This is the minimum required, but the venue's capacity allows for selling up to 400 tickets to potentially exceed the fundraising goal.

The question asks us to calculate the minimum number of at-the-door tickets Anna needs to sell to meet the fundraiser target of at least $5,000, given the constraints of the venue capacity and the ticket prices. This can be solved by first identifying the total amount needed to be raised and then calculating the number of at-the-door tickets needed if no pre-sale tickets are sold.

Since at-the-door tickets sell for $25 each, we divide the total amount Anna wants to raise ($5,000) by the price of each at-the-door ticket:

$5,000 ÷ $25 = 200 tickets

This means Anna will have to sell at least 200 at-the-door tickets to raise $5,000. However, the venue limits the capacity to 400 people, and it is not specified how many pre-sale tickets are sold. To ensure reaching the target, assuming no pre-sale tickets are sold, Anna should aim to sell all 400 tickets at the door. Selling any fewer at the door would require pre-sale tickets to make up the difference to reach the $5,000 target.

Therefore, the minimum number of at-the-door tickets Anna needs to sell to reach the $5,000 goal is 200, although to fully utilize the venue's capacity and potentially exceed the target, she can sell up to 400 tickets at the door.

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Answer:

The number is 15.

Step-by-step explanation:

If you look closely, the sum of any two adjacent boxes in the bottom row gives the number in the top row. For example, the sum of the first two boxes 27 and 18 gives the number 45.

27+18 = 45

Similarly,

21+x = 36 (Third and fourth boxes in bottom row)

Solving, we get x=15.

We can confirm this by checking with the last two boxes.

x+13 = 28

x=15

So, the answer is 15.

Please mark Brainliest if this helps!