By answering the above question, we may state that As a result, the arc's expressions PB length is around 20.45 cm.
what is expression ?In mathematics, you can multiply, divide, add, or take away. The following is how an expression is put together: Numeric value, expression, and math operator The elements of a mathematical expression include numbers, parameters, and functions. It is feasible to use contrasting words and expressions. Any mathematical statement containing variables, numbers, and a mathematical action between them is known as an expression, often known as an algebraic expression. As an example, the expression 4m + 5 is composed of the expressions 4m and 5, as well as the variable m from the above equation, which are all separated by the mathematical symbol +.
Area of sector OAP = (1/12) x r2 x (30/360)
OAP's area is equal to (1/2) x OA, PA, and sin (AOP)
Knowing that OA = PA = r and that AOP = 30°, we can calculate the area of the triangle OAP as (1/2) x r x r x sin(30°) = (1/4) x r2.
As a result, the darkened region's area is:
Area of the darkened zone is equal to (1/12) x r2 - (1/4) x r2 (462 cm2).
When we simplify this equation, we obtain:
[tex](\pi/3 - 1) x r^2 = 1848[/tex]
The result of dividing both sides by (/3 - 1) is:
[tex]r^2 = 1848 / (π/3 - 1) = 378.9[/tex]
When we square the two sides, we obtain:
[tex]r ≈ 19.47\\PB = (1/6) x 2r = (1/3) x r = 20.45 cm[/tex], where
As a result, the arc's PB length is around 20.45 cm.
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Elijah invested $94,000 in an account paying an interest rate of
4. 125% compounded quarterly. Kayden invested $94,000 in an account paying an interest rate of 4. 25% compounded daily. After 7 years, how much more money would Kayden have in his account than Elijah, to the nearest dollar?
Kayden would have $1,110.45 more in his account than Elijah after 7 years, to the nearest dollar when compounded daily.
What is Compound interest?The interest that is accrued on both the principle and any prior interest is known as compound interest. This implies that the interest received in succeeding periods rises as the interest is added to the principle. Compound interest is a crucial idea in personal finance that may be utilised in calculations for both savings and loans.
The compound interest is given by the formula:
[tex]A = P(1 + r/n)^{(nt)}[/tex]
For Elijah substituting the values we have:
[tex]A = $94,000(1 + 0.04125/4)^{(4*7)} = $129,852.94[/tex]
For Kayden substituting the values we have:
[tex]A = $94,000(1 + 0.0425/365)^{(365*7)} = $130,963.39[/tex]
The difference between the two amounts is:
$130,963.39 - $129,852.94 = $1,110.45
Therefore, Kayden would have $1,110.45 more in his account than Elijah after 7 years, to the nearest dollar.
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Answer:$1286 when rounded. Got it right
Step-by-step explanation:
I need help with this question.
Answer:
System A: C)infinite answers
System B: B)special answer (x,y)=(3,1)
Step-by-step explanation:
System A:
if we find sum of same variables, we get 5x-5x-y+y=-2+2, it means 0=0 so, this system has infinite answers.
System B:
same thing applied here,
x-x+4y+4y=7+1
8y=8
y=1
so,
x+4*1=x+4=7
x=3
riley afirma que hay infinitas soluciones para la ecuacion.2 (4x+1) + 8 = 4 (2x + 1 ) + 8 - _ por que la constante en cada lado de la ecuacion es 8, por lo que la ecuacion resulta en 8= 8
It should be noted that the value on the blank on the equation will be -2.
How to solve the equationThe equation given is:
2(4x+1) + 8 = 4(2x+1) + 8 - x
Simplifying the left-hand side:
8x + 2 + 8 = 8x + 4 + 8 - x
Simplifying the right-hand side:
8x + 4 + 8 - _ = 8x + 12 - x
Combining like terms on both sides:
8x + 10 = 8x + 12 - x
Subtracting 8x from both sides:
10 = 12 - x
x = 10 - 12
x = -2
The value will be -2 to make the equations equal.
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Determine the total number of kilograms from 15 boxes if 1 sachet is 4g
Answer:
50
Step-by-step explanation:
To determine the total number of kilograms from 15 boxes, we need to know the weight of one box. Let's assume that one box contains 50 sachets (this is just an assumption, the actual number may vary). Then the weight of one sachet is 4 grams or 0.004 kilograms.
the weight of one box is:
50 sachets x 0.004 kg/sachet = 0.2 kg
the total weight of 15 boxes is:
15 boxes x 0.2 kg/box = 3 kg
the total weight of 15 boxes is 3 kilograms.
to determine whether the 15 boxes will be enough to last for a year, we need to know how many sachets a person uses in a day. Let's assume that a person uses one sachet per day.
then the total number of sachets used in a year is:
1 sachet/day x 365 days = 365 sachets
the total number of sachets in 15 boxes is:
15 boxes x 50 sachets/box = 750 sachets
since 750 sachets is greater than 365 sachets, 15 boxes will be enough to last for a year.
to determine the number of sachets that will make one box, we need to know the weight of one box and the weight of one sachet. Let's assume that one box weighs 0.2 kg and one sachet weighs 4 grams or 0.004 kg.
then the number of sachets in one box is:
number of sachets = weight of box / weight of one sachet
number of sachets = 0.2 kg / 0.004 kg
number of sachets = 50 sachets
therefore, one box contains 50 sachets.
Question 7 Find the area of the region that is inside the rectangle and outside the circles (blue region ). The circles have a diameter of 3cm
The area of the blue region is 28.93 cm²
How to find the area of the blue region?To find the area of the blue region, we need to subtract the area of the four circle from the area of the rectangle.
Since the diameter of the circle is 3cm. The radius (r) = 3/2 = 1.5 cm.
Length of the rectangle (L) = 4 * diameter of circle (we have 4 circles)
Length of the rectangle = 4 * 3 = 12 cm
Width of the rectangle (W) = diameter of circle = 3 cm
Area of rectangle = L * W
Area of rectangle = 12 * 3 = 36 cm²
Area of circle = πr²
Area of circle = π * 1.5² = 2.25π cm²
Area of the blue region = Area of rectangle - Area of circle
Area of the blue region = 36 - 2.25π
Area of the blue region = 36 - (2.25* 22/7)
Area of the blue region = 28.93 cm²
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Complete Question
Check the attached image
Select the correct answer. Consider functions h and k. The picture shows a one-to-one function diagram. x has values of minus 2, minus 1, 0, 1, and 2, and k of x has values of minus 2, minus 5, minus 6, minus 5, and minus 2. Every x value has a relationship in k of x. What is the value of ? A. B. C. D.
The numeric value of the composite function at x = 1 is given as follows:
(h ∘ k)(1) = 28.
What is the composite function of f(x) and g(x)?The composite function of f(x) and g(x) is given by the rule presented as follows:
(f ∘ g)(x) = f(g(x)).
For the composition of two functions, we have that the output of the inner function, in this example g(x), serves as the input of the outer function, in this case f(x).
Hence the numeric value at x = 1 for the function in this problem is:
h(k(1)).
The numeric value of k at x = 1 is:
k(1) = 3.
Then, as the numeric value of h at x = 3 is of 28, the composite function is:
(h ∘ k)(1) = 28.
Missing InformationThe problem is given by the image presented at the end of the answer.
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Need the answer for A B C
Therefore , the solution of the given problem of percentage comes out to be this amount to the closest dollar, we get $1,042.
What precisely is a percentage?A number or measure that is represented as a proportion of 100 is known as a "a%" in statistics. Additionally, the terms "pct," "pct," and "pc" are not commonly used. However, it is commonly denoted by the symbol "%". There are no dimensions; the percentage total is flat. Since a percentage's numerator is almost always 100, percentages are actually integers. To indicate that a number is a percentage, either the percentage symbol (%).
Here,
a. The formula: can be used to calculate the weekly payment.
=> P = (Ar(1+r)ⁿ) / ((1+r)^n - 1)
A = 9900, r = 0.06/12, and n = 48 in this instance (since there are 4 years or 48 months in total).
Substituting these numbers into the formula, we get:
=> P = (99000.005(1+0.005)⁴⁸) / ((1+0.005)⁴⁸ - 1) ≈ $227.88
Therefore, the monthly payment is roughly $227.88.
=> Overall = P*n = $227.88 * 48 = $10,942.24
We arrive at $10,942 by rounding this sum to the closest dollar.
c. The total interest paid over the course of the loan's four-year term is equivalent to the total amount repaid less the loan balance:
Total interest equals the total sum less A, or $10,942 minus $9,900, or $1,042.
Rounding this amount to the closest dollar, we get $1,042.
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Please help me
Conditional probability question
The conditional probabilities are are (a) P(A/B) = 0.69 b) P(A/B) = 31/100
How to determine the conditional probabilities?You should recall that Probability is the chance that a given event will occur; the ratio of the number of outcomes in an exhaustive set of equally likely outcomes that produce a given event to the total number of possible outcomes;
The conditional probability P(A|B) is calculated using:
P(A/B)
P(A/B) = P( A and B) / P(B)
P(A/B) = (18/26 * 8/26)/ 8/26
P(A/B) = (0.69 * 0.31)/ 0.31
P(A/B) = 0.69
P(A/B) = 69/100
b) Using the same formula
P(B/A) = P( B and A) / P(A)
P(A/B) = (8/26 * 18/26) / 18/26
P(A/B) = (0.31 * 0.69)/0.69
P(A/B) = 0.31
P(A/B) = 31/100
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4) At the end of each quarter year, Rod makes a $500 payment into Lanagham Mutual Fund. If his investments earn 7.88% annual interest compounded quarterly, what will be the value of Rod's annuity in 20 years?
5) Bubba contributes $50 per month into the Vanguard National Bond Fund that earns 7.26% annual interest compounded monthly. What is the value of Bubba's investment after 25 years?
6) Ursula is considering opening an account with Crab Key Bank at 5.15% annual interest compounded quarterly. What is the equivalent APY?
7) How can you tell the difference if one bank offers an investment earning 8.75% annual interest compounded quarterly versus one earning 8.7% compounded monthly?
The value of each investment scenario based on the given interest compounded will be:
Rod's annuity after 20 years will be $30,904.95.Buba's investment value after 25 years will be $41,438.55.Ursula equivalent APY will be 5.25%.The different between an investment earning annual investment compounded ed quarterly and one earning compounded monthly is the number of times the interest is compounded each year.Let's discuss each scenario we have.
4) At the end of each quarter year, Rod makes a $500 payment into Lanagham Mutual Fund. If his investments earn 7.88% annual interest compounded quarterly, what will be the value of Rod's annuity in 20 years?The value of Rod's annuity after 20 years will be $30,904.95. This is calculated by using the formula A = P((1+r/n)^(nt)), where P is the payment, r is the annual interest rate (7.88%), n is the number of times compounded per year (quarterly, or 4), and t is the number of years (20).
5) Bubba contributes $50 per month into the Vanguard National Bond Fund that earns 7.26% annual interest compounded monthly. What is the value of Bubba's investment after 25 years?The value of Bubba's investment after 25 years will be $41,438.55. This is calculated by using the formula A = P((1+r/n)^(nt)), where P is the payment, r is the annual interest rate (7.26%), n is the number of times compounded per year (monthly, or 12), and t is the number of years (25).
6) Ursula is considering opening an account with Crab Key Bank at 5.15% annual interest compounded quarterly. What is the equivalent APY?The equivalent APY for the account at Crab Key Bank with an annual interest rate of 5.15% compounded quarterly is 5.25%. This is calculated by using the formula APY = (1+r/n)^n - 1, where r is the annual interest rate (5.15%), and n is the number of times compounded per year (quarterly, or 4).
7) How can you tell the difference if one bank offers an investment earning 8.75% annual interest compounded quarterly versus one earning 8.7% compounded monthly?The difference between an investment earning 8.75% annual interest compounded quarterly and one earning 8.7% compounded monthly is the number of times the interest is compounded each year. An investment earning 8.75% compounded quarterly has an interest rate of 8.75% that is compounded four times per year, while an investment earning 8.7% compounded monthly has an interest rate of 8.7% that is compounded twelve times per year.
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A surveyor wants to know the length of a tunnel built through a mountain. According to her equipment, she is located 212 meters from one entrance of the
tunnel, at an angle of 57° to the perpendicular. Also according to her equipment, she is 119 meters from the other entrance of the tunnel, at an angle of 14° to
the perpendicular, Based on these measurements, fiad the length of the entire tunnel,
Do not round any intermediate computations. Round your answer to the nearest tenth..
Note that the figure below is not drawn to scale.
Answer: Approximately 2 * AC = 737.2 meters. Rounded to the nearest tenth, the answer is 737.2 meters.
Step-by-step explanation: To solve the problem, we can draw a diagram:
A
/|
/ |
/ | x
/ |
/ |
/θ |
/ |
/ |
/ |
/ |
/ |
B-----------C
y
where A and B are the entrances of the tunnel, C is the point in the middle of the tunnel that we want to find, and θ, x, and y are the angles and distances given in the problem. We want to find the length of AC.
Using trigonometry, we can find the distances BC and AB: tan(57°) = x / y => x = y * tan(57°)
tan(14°) = x / (y + 212) => x = (y + 212) * tan(14°)
Setting these two expressions for x equal, we get: y * tan(57°) = (y + 212) * tan(14°)
Solving for y, we get: y = 212 / (tan(57°) / tan(14°) - 1) ≈ 286.5 meters
Now we can use the law of sines to find the length of AC: sin(θ) / AC = sin(14°) / BC = sin(57°) / AB
Solving for AC, we get: AC = AB * sin(θ) / sin(57°) ≈ 368.6 meters
Therefore, the length of the entire tunnel is approximately 2 * AC = 737.2 meters. Rounded to the nearest tenth, the answer is 737.2 meters.
Part 1
The stem-and-leaf plots show the daily produce sales at Farmer's Market A and Farmer's Market B over the last 15 days. Use the stem-and-leaf plots to complete the statements
The mean for Farmer's Market A is $__, and the mean for Farmer's Market B is $__. From the means, you can conclude the average typical daily sales for Farmer's Market __ (A or B) is greater than the average typical daily sales for Farmer's Market __ (A or B)
According to the means, the average typical daily sales for Farmer's equation Market A are higher than the average typical daily sales for Farmer's Market B.
What is equation?A mathematical statement which thus proves the equality of two factors linked by an equal sign '=' is known as an equation. For example, 2x - 5 = 13. Two examples of phrases are 2x-5 and 13. The character '=' is used to connect the two expressions. A mathematical formula with two algebraic expressions on either side of a =) (=) is called an equation. It depicts the relationship of equivalence between left and right equations. In any formula, L.H.S. = R.H.S. (left side = right side).
[tex]$30 + $31 + $32 + $33 + $35 + 36 + $38 + $40 + $41 + $42 + $43 + $45 + $47 + $49 + $50 = $575 for Farmer's Market A[/tex]
Because there are 15 days, we divide the total sales by 15 to find the mean:
Farmer's Market A Mean [tex]= $575/15 = $38.33[/tex]
Farmers' Market B:
[tex]$20 + $22 + $24 + $26 + $28 + $31 + $32 + $34 + $36 + $39 + $40 + $42 + $44 + $46 + $49 = $524[/tex]
Farmer's Market A has a mean of $38.33, while Farmer's Market B has a mean of $34.93. According to the means, the average typical daily sales for Farmer's Market A are higher than the average typical daily sales for Farmer's Market B.
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What is the answer of :20y=-42
Step by step
Answer:
y=-21/10
Step-by-step explanation:
20y=-42
20y/20=-42/20
y=-42/20
y=-21/10
Find any rational number between -5,25 and -5,26.
Answer:
ANSWER: -5,2.55
Step-by-step explanation:
I got it right
The expression −290+15m represents a submarine that began at a depth of 290 feet below sea level and ascended at a rate of 15 feet per minute. What was the depth of the submarine after 8 minutes?
Select the correct answer below and, if necessary, fill in the answer box to complete your choice.
A) The submarine was (enter answer here) feet below sea level after 8 minutes.
B) The submarine will have reached sea level after 8 minutes.
Answer: A,
Step-by-step explanation:
it will be -170 feet after 8 min
A box contains three blue bulbs, four green bulbs and five red bulbs. Four bulbs were taken out of the box at random and without replacement. What is the probability that a. All the four bulbs are of the same colour
The probability of selecting all four bulbs of the same color is approximately 0.0061.
To calculate the probability that all four bulbs are of the same color, we need to consider the following cases,
1) The probability of selecting the first blue bulb is 3/12 (since there are 3 blue bulbs out of 12 total bulbs). After one blue bulb has been selected, there are 2 blue bulbs left out of 11 total bulbs, so the probability of selecting a second blue bulb is 2/11. Similarly, the probability of selecting the third blue bulb is 1/10, and the probability of selecting the fourth blue bulb is 0/9 (since there are no more blue bulbs left). Therefore, the probability of selecting all four blue bulbs is:
(3/12) × (2/11) × (1/10) × (0/9) = 0
2) Using the same logic as in Case 1, the probability of selecting all four green bulbs is:
(4/12) × (3/11) × (2/10) × (1/9) = 1/495
3) The probability of selecting all four red bulbs is:
(5/12) × (4/11) × (3/10) × (2/9) = 2/495
Therefore, the total probability of selecting all four bulbs of the same color is the sum of the probabilities from Cases 2 and 3
1/495 + 2/495 = 3/495
Simplifying this fraction, we get:
3/495 = 1/165
= 0.0061
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Determine the voltage dropped across
The answer of the given question based on the Voltage drop the answer is , the voltage dropped across R3 is 277.11 V.
What is Ohm's law?Ohm's law is fundamental principle in electrical engineering and physics that describes relationship between voltage, current, and resistance in electrical circuit. It states that current through conductor between two points is directly proportional to voltage across two points, and inversely proportional to resistance between them.
To determine the voltage dropped across R3, we need to use Ohm's law and Kirchhoff's circuit laws. First, we can calculate the total resistance in the circuit:
Rtotal = R1 + R2 || R3
R2 || R3 = (R2 * R3) / (R2 + R3) (parallel resistance formula)
Rtotal = R1 + (R2 || R3)
Rtotal = 152 + ((18 * 362) / (18 + 362))
Rtotal = 149.89 Ω (rounded to 2 decimal places)
Next, we can use Ohm's law to calculate the current flowing through the circuit:
I = ET / Rtotal
I = 120 / 149.89
I = 0.8004 A (rounded to 4 decimal places)
Finally, we can use Kirchhoff's voltage law to determine the voltage dropped across R3:
ET = IR1 + IR2 || IR3 + IR3
ET = I(R1 + R2 || R3) + IR3
ET - I(R1 + R2 || R3) = IR3
R3 = (ET - I(R1 + R2 || R3)) / I
R3 = (120 - (0.8004 * (152 + ((18 * 362) / (18 + 362))))) / 0.8004
R3 = 277.11 V (rounded to 2 decimal places)
Therefore, the voltage dropped across R3 is 277.11 V.
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A toy company is building dollhouse furniture. A rectangle door of a dollhouse has a height of 7 centimeters and a width of 3 centimeters. What is the perimeter of the door of a scale drawing that uses a scale factor of 3. 5?
If a rectangle door of a dollhouse has a height of 7 centimeters and a width of 3 centimeters, the perimeter of the door in the scale drawing is 70 centimeters.
To find the perimeter of the door in the scale drawing, we first need to determine the dimensions of the door in the scale drawing. To do this, we need to multiply the actual dimensions of the door by the scale factor of 3.5.
The height of the door in the scale drawing would be 7 cm x 3.5 = 24.5 cm, and the width would be 3 cm x 3.5 = 10.5 cm.
The perimeter of the door in the scale drawing can be calculated by adding up the lengths of all four sides. The two vertical sides have a length of 24.5 cm, and the two horizontal sides have a length of 10.5 cm. Therefore, the perimeter of the door in the scale drawing is:
P = 2(24.5 cm) + 2(10.5 cm) = 49 cm + 21 cm = 70 cm
Note that the scale drawing is a proportional representation of the actual door, where all corresponding dimensions are multiplied by the same factor of 3.5.
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due in 5 minutes 8-1/4n≥20
Answer:
n ≤ -48
Step-by-step explanation:
150 points please help
Answer:
150 isnt a thing but I will gladly take 5 :)
(2x+3)(2x−9)
Step-by-step explanation:
Hope this helps^^
Which is Greater? 5^100 or 3^150
It can be concluded that 3¹⁵⁰ is the greater among them.
How to get the solutionThis question can be solved if we use the numerical factorization concepts
Check itFirst, we do the factorization, looking for a number that is common between divisors 3 and 5
[tex]\begin{array}{r|l}\sf 100,150 & \sf 2\\\sf 50,75 & \sf 2\\\sf 25,75 & \sf 3\\\sf 25,25 & \sf 5\\\sf 5,5 & \sf 5\\\sf 1,1&\sf 1\end{array}[/tex]
With this, we can see that the number 25 is common between divisors 3 and 5.
It will be our main exponent, when factoring the exponents 100 and 150.
[tex]\begin{array}{cc}\sf 5^{100}&\sf 3^{150}\\\raisebox{5pt}{$\sf \Big(\big[5^{2}\big]^{2}\Big)^{25}$}&\raisebox{5pt}{$\sf \Big(\big[3^{2}\big]^{3}\Big)^{25}$}\\\raisebox{5pt}{$\sf \big(5^{4}\big)^{25}$}&\raisebox{5pt}{$\sf \big(3^{6}\big)^{25}$}\\\raisebox{5pt}{$\sf 625^{25}$}&\raisebox{5pt}{$\boxed{\bf729^{25}}$}\end{array}[/tex]
Since 729²⁵ > 625²⁵, it follows that 3¹⁵⁰ is the greater of the two
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A composite figure is represented in the image.
What is the total area of the figure?
75 m2
63 m2
61.5 m2
45 m2
Step-by-step explanation:
area of rectangle= 9×4=36m^2
9-3=6 which is the base of the triangle
6×3=18
18÷2=9m^2
36+9=45m^2
answer: 45m^2
(4-5z)(4+5z)
For multiplying Special cases.
Answer:
16 - 25z²
Step-by-step explanation:
(4 - 5z)(4 + 5z)
each term in the second factor is multiplied by each term in the first factor, that is
4(4 + 5z) - 5z(4 + 5z) ← distribute parenthesis
= 16 + 20z - 20z - 25z² ← collect like terms
= 16 - 25z²
Answer:
16-25z
Step-by-step explanation:
you will use the first term 4 to multiply the first which is (4+5z) then after that you will use the second term which is -5z to multiply the same (4+5z) to give you 16+20z-20z-25z then you will also simplify to give you 16-25z
Jon's parents invested $300 for his college tuition in a savings account when he
was born. The account pays 5% simple interest every year. How much would be
in the account after 18 years if no other money were invested? (1 = Prt)
Jon's parents invested $300 for his college tuition in a savings account when he was born. The account pays 5% simple interest every year. Consequently, if no additional money was invested, the account would be worth $570 after 18 years.
To answer the problem, we must employ the basic interest formula:
Principle x Interest Rate x Time = Simple Interest
where:
Principal = the initial amount invested
Interest Rate = the yearly interest rate expressed in decimal form.
Time = the amount of years the money has been invested for.
The principal in this scenario is $300, the interest rate is 5% (0.05 as a decimal), and the term is 18 years. Thus we may enter the following values into the formula:
Simple Interest = $300 x 0.05 x 18 = $270
As a result, after 18 years, the total money in the account would be:
Total amount = Principal + Simple Interest
=$300 + $270 = $570
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Can I get help with this question? I am lost!
Answer:
4x
Step-by-step explanation:
mark me hope it is a good answer
Answer:
The factors of 2x^2 are 2, x, and 2x.
the sidesof one of the pentagons are a, , 20,c and 30 respectively if the corresponding sides of hte other pentagon are 46, 50, d, 102 and 24 respectively. what are the mising measures
The missing measures of the pentagon are a = 18.4, c = 61.2, d = 75, and x = 22.08.
What are the missing measures of the pentagon?
Let's label the sides of the first pentagon as a, 20, c, 30, and x, and the sides of the second pentagon as 46, 50, d, 102, and 24.
Since both pentagons have the same shape, we know that the corresponding sides are proportional. This means we can set up the following equations:
a/46 = 20/50 = c/d = 30/102 = x/24
Solving for the missing variables:
a = 46(20)/50 = 18.4
c = 30(102)/50 = 61.2
d = 50(30)/20 = 75
x = 24(46)/50 = 22.08
Therefore, the missing measures are a = 18.4, c = 61.2, d = 75, and x = 22.08.
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The graph of the parent quadratic
function f(x) = x2 and that of a second function
of the form g(x) = ax2 are shown. What
conclusion can you make about the value of a in the equation of the second function?
The correct answer is D. The value of a in the equation of the second function is greater than 1.
Describe Quadratic Function?A quadratic function is a type of function in algebra that can be written in the form f(x) = ax² + bx + c, where a, b, and c are constants (coefficients) and x is the independent variable. The graph of a quadratic function is a parabola, which is a U-shaped curve.
The coefficient a determines whether the parabola opens upwards (if a > 0) or downwards (if a < 0). The point where the parabola changes direction is called the vertex, which is located at the point (-b/2a, f(-b/2a)).
The coefficient b determines the horizontal position of the vertex, and c determines the vertical position of the vertex.
We know that the parent quadratic function f(x) = x² is a U-shaped curve with its vertex at the origin (0,0).
If the graph of a second function g(x) = ax² intersects the graph of f(x) at exactly one point, then this point must be the vertex of g(x), since the vertex of f(x) is already fixed at the origin.
In order for g(x) to intersect f(x) at exactly one point, the vertex of g(x) must lie on the x-axis (since it cannot be above the x-axis, or else there would be two points of intersection). Therefore, the y-coordinate of the vertex of g(x) is 0.
The vertex of a quadratic function of the form ax² + bx + c has x-coordinate -b/2a and y-coordinate c - b²/4a. Since the y-coordinate must be 0 in this case, we have:
0 = c - b²/4a
Solving for c, we get:
c = b²/4a
Therefore, the vertex of g(x) is (0, b²/4a).
We can see from the graph that the vertex of g(x) is to the right of the origin, so its x-coordinate is positive. This means that the coefficient a must be positive, since otherwise the parabola would open downwards and the vertex would be below the x-axis.
We also know that the vertex of g(x) is above the x-axis, so its y-coordinate (which is b²/4a) must be positive. This means that b^2 and a have the same sign.
Putting this information together, we can conclude that:
If a > 0, then b²/4a > 0, which means that b² and a have the same sign. This means that the parabola opens upwards, and the vertex is above the x-axis. From the graph, we can see that this is the case, so we can eliminate options B and C.
If a < 1, then the parabola is narrower than the parent function f(x) = x², and the vertex is closer to the y-axis. This is not the case from the graph, so we can eliminate option A.
Therefore, the correct answer is D. The value of a in the equation of the second function is greater than 1.
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The complete question is:
A cylindrical candle has a mass of 200 grams. The candle has a diameter of 3 inches
and a height of 4 inches. What is the density of the candle? Round to the nearest
hundredth
Rounding to the nearest hundredth, the density of the candle is 22.46 grams per cubic inch.
The density of the candle can be found by dividing the mass by the volume of the candle.
The volume of a cylindrical candle can be found using the formula V = πr^2h,
where V is the volume, r is the radius, and h is the height.
First, we need to find the radius of the candle.
The diameter is 3 inches, so the radius is 1.5 inches.
Next, we can plug in the values for r and h into the formula for the volume of a cylinder:
V = π(1.5)^2(4) = 9π
Now, we can divide the mass of the candle by the volume to find the density:
Density = 200 grams / 9π
Density= 22.46 grams per cubic inch
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Given: ABCD pyramid All edges congruent AB = 4. 5 Find: V
The volume of the pyramid is found to be approximately 18.046 cubic units.
To find the volume (V) of the pyramid, we need to use the formula for the volume of a pyramid, which is V = (1/3) × Base Area × Height.
In this case, the base is a square, so we can find the area of the base by squaring one of the sides: Base Area = AB² = 4.5² = 20.25.
To find the height of the pyramid, we need to use the Pythagorean theorem to find the slant height, and then use that to find the height. Let h be the height of the pyramid and s be the slant height. We have:
s² = AB² + (1/2) DC² (Pythagorean theorem for triangle ABC)
s² = 4.5² + (1/2) DC²
Since all edges of the pyramid are congruent, we have DC = AB = 4.5. Substituting this into the equation above, we get:
s² = 4.5² + (1/2) × 4.5²
s² = 30.375
s ≈ 5.509
To find the height h, we can use the Pythagorean theorem again for triangle ABD:
h² = AB² - (1/4) s²
h² = 4.5² - (1/4) × 30.375
h² ≈ 7.875
h ≈ 2.807
Now that we have found the base area and the height, we can use the formula for the volume of a pyramid to find V:
V = (1/3) × Base Area × Height
V = (1/3) × 20.25 × 2.807
V ≈ 18.046
Therefore, the volume of the pyramid is approximately 18.046 cubic units.
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11. College women who play have had more success than others with using social media to benefit from their name, image, and likeness (NIL).
Cοllege wοmen whο play have had mοre success than οthers with using sοcial media tο benefit frοm their name, image, and likeness. (False)
Why is it false?Female cοllege athletes and their success in using sοcial media tο mοnetize their name, image, and likeness which is false.
This statement means that female cοllege athletes whο participate in spοrts have been mοre successful in leveraging their name, image, and likeness fοr financial gain thrοugh sοcial media platfοrms than their nοn-athlete peers.
In οther wοrds, female athletes whο engage in spοrts don't have an advantage in mοnetizing their sοcial media presence and using it tο prοmοte their persοnal brand, cοmpared tο female cοllege students whο dο nοt participate in spοrts.
Therefore, it is false that college women who play have had more success than others with using social media to benefit from their name, image, and likeness
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Complete question:
True or False:
11. College women who play have had more success than others with using social media to benefit from their name, image, and likeness (___).
Set A consists of all odd integers between 0 and 10. Set B consists of all prime numbers less than 16 . How many numbers do Set A and Set B have in common?
Set A and Set B have 2 numbers in common: 3 and 7. The intersection of both sets is the set of numbers that appear in both sets.
Set A consists of all odd integers between 0 and 10, which are 1, 3, 5, 7, and 9. Set B consists of all prime numbers less than 16, which are 2, 3, 5, 7, 11, and 13. There are two numbers that Set A and Set B have in common: 3 and 7.
Sets A and B are both subsets of the set of all integers between 0 and 16. Set A is a subset of the set of all odd integers between 0 and 16, while Set B is a subset of the set of all prime numbers between 0 and 16. While Set A and Set B have 2 numbers in common, they are not the same set. Set A includes the numbers 1, 3, 5, 7, and 9, while Set B includes the numbers 2, 3, 5, 7, 11, and 13.
Each set includes a unique set of numbers, and the intersection of Set A and Set B is the set of numbers that appear in both Set A and Set B. In this case, the intersection of Set A and Set B is the set of 2 numbers that both sets have in common: 3 and 7.
In conclusion, Set A and Set B have 2 numbers in common: 3 and 7. While both sets include a unique set of numbers, the intersection of Set A and Set B is the set of numbers that appear in both sets.
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