3) In general, a dilation is an enlargement of the sides of a shape, even if it is a 3D shape.
Furthermore, the volume of a prism is given by the formula
[tex]V=A_{\text{base}}\cdot h=l\cdot w\cdot h[/tex]Then,
[tex]V_{\text{new}}=3l\cdot3w\cdot3w=3^3(l\cdot w\cdot h)=27V_{initial}[/tex]Therefore,
[tex]\Rightarrow V_{\text{new}}=27\cdot(270)=7290[/tex]The answer to part 3) is 7290 m^3
4) Due to similar reasoning, in general, the area of a shape is given by
[tex]A=l\cdot w[/tex]If we apply a dilation to that area,
[tex]\Rightarrow A_{\text{new}}=kl\cdot kw=k^2A_{original}[/tex]Where k is the dilation factor.
Thus, in our case,
[tex]\begin{gathered} \Rightarrow A_{\text{new}}=(54)^2\cdot8=23328 \\ \text{and} \\ h_{\text{new}}=54\cdot6=324 \end{gathered}[/tex]Therefore,
[tex]\Rightarrow V_{\text{new}}=A_{\text{new}}\cdot h_{\text{new}}=23328\cdot324=7558272[/tex]The answer to part 4) is 7558272 cm^3
5) From the answer to question 3)
[tex]V_{\text{new}}=k^3\cdot V_{original}_{}[/tex]Thus,
[tex]\begin{gathered} \Rightarrow3125=k^3\cdot200 \\ \Rightarrow k^3=\frac{3125}{200}=\frac{125}{8} \\ \Rightarrow k=\frac{5}{2}=2.5 \\ \Rightarrow k=2.5 \end{gathered}[/tex]The answer to part 5) is 2.5
Mr. Braid asks every 6th person entering the auditorium for the spring concert at school if they would approve of taking money from the school sports budget to pay for a school play.
a) State the objective
b) population
c) and sample of the survey.
d) Then share if there is any bias in the sample.5
a. The objective is to know if they will approve of taking money from the school sports budget to pay for a school play.
b. The population is the students entering the auditorium.
c. The sample of the survey is this 6th person entering the auditorium.
d. There is no bias.
What is population?It should be noted that population simply means the people that the researcher makes research on.
The sample are those selected.
It should be noted that the objective is the reason why the research is carried out.
In conclusion, there's no bias as it's not preferential but a random selection.
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multi step inequalities translate the following into an algebraic inequality: 14 less than twice a number is greater than or equal to 16
Let the unknown number be x
14 less than twice a number is greater than or equal to 16
14 < 2x ≥ 16Done with the solution
A flagpole 95.2 ft. Tall is on top of a building. From a point on level ground, the angle of elevation of the top of the flagpole is 34.1° , while the angle of elevation of the bottom of the flagpole is 25.8° . Find the height of the building.
Let x be the height of the building
We will first make a sketch
[tex]\tan \theta=\frac{opposite}{\text{adjacent}}[/tex][tex]\tan 25.8=\frac{x}{y}[/tex][tex]y=\frac{x}{\tan 25.8}[/tex][tex]\tan 34.1=\frac{95.2+x}{y}[/tex]substitute the y-value in the above
[tex]\tan 34.1=\frac{95.2+x}{\frac{x}{\tan 25.8}}[/tex][tex]\tan 34.1=(95.2+x)\text{.}\frac{tan25.8}{x}[/tex][tex]x\tan 34.1=(95.2+x)\tan 25.8[/tex]x (0.677) = (95.2 + x)0.4834
open the parenthesis
0.677x = 46.01968 + 0.4834x
subtract 0.4834x from both-side of the equation
0.677x - 0.4834x = 46.01968
0.1936x = 46.01968
Divide both-side by 0.1936
x≈ 237.7 ft
[tex]x\approx238\text{ f}eet[/tex]Just number three. 12/13-12/17 I can do the total
After doing some mathematical operations, we can conclude that Randall will earn an extra $15 a week working in an amusement park as compared to a restaurant.
What do we mean by mathematical operations?A mathematical function known as an operation converts zero or more input values into a precisely defined output value.The quantity of operands affects the operation's arity.The order of operations refers to the rules that define the sequence in which we should perform the operations necessary to solve an expression.Parentheses, Exponents, Multiplication, Division, Addition, and Subtraction are all referred to as PEMDAS (from left to right).So, more money that Randall can earn in the amusement park:
Randall can work in an amusement park for $8.75 an hour, for 20 hours a week.
8.75 × 20 = $175Randall can work in a restaurant for $8.00 an hour, for 20 hours a week.
8.00 × 20 = $160Then, more money that Randall can earn in the amusement park:
$175 - $160 = $15Therefore, after doing some mathematical operations, we can conclude that Randall will earn an extra $15 a week working in an amusement park as compared to a restaurant.
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Find an equation for the line with slope
m=5 and which goes through the point (8,−9).
Write your answer in the form y=mx+b
An equation of line with slope m = 5 and which goes through the point (8, -9) is y = 5x - 49
In this question, we have been given a slope of the line and a point (8, -9)
We need to find an equation of the line with slope m = 5 and which goes through the point (8, -9)
Let (x1, y1) = (8, -9)
Using the slope-point form of the line,
y - y1 = m(x - x1)
y - (-9) = 5(x - 8)
y + 9= 5x - 40
y = 5x - 40 - 9
y = 5x - 49
Therefore, an equation of line with slope m = 5 and which goes through the point (8, -9) is y = 5x - 49
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a restaurant customer left a $1.95 as a tip. the tax was 5%, and the tip was 15% of the after-tax cost. which information is not needed to compute the bill after tax and tip? what is the total bill?
Given :
a restaurant customer left a $1.95 as a tip.
The tax = 5%
the tip was 15% of the after-tax cost
So, the information that not needed is the tax
Let the total bill = x
so, 15% of x = 1.95
[tex]\begin{gathered} 0.15\cdot x=1.95 \\ \\ x=\frac{1.95}{0.15}=13 \end{gathered}[/tex]so, the total bill = $13
7)Ella started exercising. Which division expression means she lost 5 pounds every 2 weeks?
According to the given data we have the following:
she lost 5 pounds every 2 weeks
Therefore, the division expression would be the following:
she lost 5 pounds every 2 weeks would be represented as the following fraction. 5/2.
Therefore, the division expression would be 5/2 that means she lost 5 pounds every 2 weeks.
I'm having trouble answering this Simplifying Variable Expressions question I will have two pictures. One will be for the actual question and the other one is for the steps
Given the expression:
[tex]-7(-15w+21)+3(18-27w)[/tex]We will simplify the expression as follows:
1) using the distributive property to expand the expression:
[tex](-7)\cdot(-15w)+(-7)\cdot21+3\cdot18+3\cdot(-27w)[/tex]2) using the commutative property:
[tex]\begin{gathered} 105w-147+54-81w \\ =105w-81w-147+54 \end{gathered}[/tex]3) Combine the like terms:
[tex]=24w-93[/tex]So, the answer will be 24w - 93
17#The producer of a weight-loss pill advertises that people who use the pill lose, after one week, an average (mean) of 1.75 pounds with a standard deviation of 0.95 pounds. In a recent study, a group of 60 people who used this pill were interviewed. The study revealed that these people lost a mean of 1.73 pounds after one week.If the producer's claim is correct, what is the probability that the mean weight loss after one week on this pill for a random sample of 60 individuals will be 1.73 pounds or less?Carry your intermediate computations to at least four decimal places. Round your answer to at least three decimal places.AGAIN Carry your intermediate computations to at least four decimal places. Round your answer to at least three decimal places.
Mean (μ) = 1.75 pounds
Standard deviation (σ) = 0.95 pounds
Sample size (n) = 60
First, we define the z-score for the sample mean distribution:
[tex]Z=\frac{\bar{X}-\mu}{\sigma/\sqrt{n}}[/tex]If the mean of a sample of 60 people is 1.73 pounds, the corresponding z-score is:
[tex]Z=\frac{1.73-1.75}{0.95/\sqrt{60}}=-0.163073[/tex]Then, the probability that the mean weight loss after one week on the pill for a random sample of 60 individuals will be 1.73 pounds or less is equivalent to:
[tex]P(\bar{X}\le1.73\text{ pounds})=P(Z\le-0.163073)[/tex]Finally, using the standard normal distribution:
[tex]P(Z\leqslant-0.163073)=0.4352[/tex]Options for the first time:increases, remains the same, decreases Options for the second box: increases, remains the same, decreases Options for the third box: reflects over the x-axis, remains the same, reflects over the y-axis
The general form of a trigonometric function is:
[tex]A\sin (B(x-C))+D[/tex]Where B is the frequency of the function.
In our problem, A=1, C=D=0.
Then, as the value of B increases, so the frequency does. The answer to the second gap is 'increases'.
On the other hand, let P be the period and f the frequency. Those two quantities are related by the formula:
[tex]f=\frac{1}{P}[/tex]Then, if the frequency increases, the period decreases. The answer to the first gap is 'decreases'.
Finally, if B is negative we have that:
[tex]\begin{gathered} B<0,A=-B,A>0 \\ \Rightarrow\tan (Bx)=\frac{\sin(Bx)}{\cos(Bx)}=\frac{\sin(-Ax)}{\cos(-Ax)}=-\frac{\sin(Ax)}{\cos(Ax)}=-\tan (-Bx) \end{gathered}[/tex]Therefore, the function is reflected over the x-axis.
Use the Law of Sines to solve the triangle. Round your answers to two decimal places.A = 8° 40', B = 13° 15', b = 4.8
Given
[tex]A=8°40^{\prime},B=13°15^{\prime},b=4.8[/tex]To find the value of a, c, C.
Explanation:
It is given that,
[tex]A=8°40^{\prime},B=13°15^{\prime},b=4.8[/tex]Since,
[tex]A=8°40^{\prime},B=13°15^{\prime}[/tex]Then,
[tex]\begin{gathered} A+B+C=180 \\ 8\degree40^{\prime}+13\degree15^{\prime}+C=180\degree \\ C=180\degree-21\degree55^{\prime} \\ C=(179-21)\degree(60^-55^)^{\prime} \\ C=158\degree5^{\prime} \end{gathered}[/tex]Therefore, by using Sine law,
[tex]\begin{gathered} \frac{\sin A}{a}=\frac{\sin B}{b}=\frac{\sin C}{c} \\ \frac{\sin8\degree40^{\prime}}{a}=\frac{\sin13\degree15^{\prime}}{4.8}=\frac{\sin158\degree5^{\prime}}{c} \\ \Rightarrow\frac{\sin8\degree40^{\prime}}{a}=\frac{\sin13\degree15^{\prime}}{4.8} \\ \Rightarrow\frac{\sin13\degree15^{\prime}}{4.8}=\frac{\sin158\degree5^{\prime}}{c} \end{gathered}[/tex]Therefore,
[tex]\begin{gathered} \begin{equation*} \frac{\sin8\degree40^{\prime}}{a}=\frac{\sin13\degree15^{\prime}}{4.8} \end{equation*} \\ \frac{0.14608}{a}=\frac{0.227501}{4.8} \\ a=\frac{0.14608}{0.047396} \\ a=3.08211 \\ a=3.1 \end{gathered}[/tex]Also,
[tex]\begin{gathered} \begin{equation*} \frac{\sin13\degree15^{\prime}}{4.8}=\frac{\sin158\degree5^{\prime}}{c} \end{equation*} \\ 0.047396=\frac{0.366501}{c} \\ c=\frac{0.366501}{0.047396} \\ c=7.73274 \\ c=7.7 \end{gathered}[/tex]Hence, the answer is
[tex]C=158\degree5^{\prime},a=3.1,c=7.7[/tex]1) how many mg are equal are in 64 hectometers?2) 52000 micrometers (um) to Gm (giga)
1) 64 * 10^5 mg 2) 5.2 * 10^-11gm
Explanation:
There is no direct conversion from mg to hectometers
The conversions available:
1 m³ = 10^-6 hm³
where hm = hectometer
Also 1 hm³ = 1 * 10 ^15 mg
64 hm³ = 64 * 1 * 10 ^15 mg
= 64 * 10 ^15 mg
1 hm³ = 1hm * 1hm * 1hm
To get 1 hm, we will find the cube root of the value in mg:
[tex]\begin{gathered} 1hm\text{ = }\sqrt[3]{10^{15}mg} \\ 1\text{ hm = }10^5mg \\ 64\text{ hm = 64}\times10^{^5}mg \end{gathered}[/tex]64 hectometers = 64 * 10^5 mg
2) 1 µm = 10^-15gm
52000 µm = 52000 * 10^-15gm
= 5.2 * 10 ^4 * 10^-15gm = 5.2 * 10^(4-15) gm
= 5.2 * 10^-11gm
A computer program found that the line c = 2t - 89 is a good fit for the data, Use this equation to predict how many cups of lemonade Lin might sell on a day when the high temperature is 74 degrees. Enter your answer in the box below. Answer:Ocups. The high temperature this Sunday is expected to be 5 degrees warmer than the high temperature this Saturday. Using the line c = 2t - 89. how many more cups of lemonade should Lin expect to sell on Sunday than Saturday? Explain or show your reasoning. Enter your response here
Part 1. Find how many cups will Lin sell when the high temperature is 74°.
We are given the expression:
[tex]c=2t-89[/tex]Where is c is the number of cups that Lin might sell and t is the high temperature.
We have the value of the high temperature:
[tex]t=74[/tex]And to solve this problem we need to substitute t=74 into the given expression:
[tex]\begin{gathered} c=2t-89 \\ \text{Substituting t=74} \\ c=2(74)-89 \end{gathered}[/tex]Solving the operations:
[tex]\begin{gathered} c=148-89 \\ c=59 \end{gathered}[/tex]Answer (for part 1): 59 cups.
Part 2. Find how many more cups of lemonade Lin should sell on Sunday than Saturday.
We will call the high temperature on Saturday "x". The number of cups that Lin Might sell for x temperature is:
[tex]c=2x-89[/tex]Now, we are told that the temperature on Sunday is expected to be 5° warmer, so we represent the high temperature on Sunday as 5 more than the temperature on Saturday (which we called x).
Thus, the temperature on Sunday is:
[tex]t=x+5[/tex]And we substitute this into the expression:
[tex]\begin{gathered} c=2t-89 \\ \text{Substituting t=x+5} \\ c=2(x+5)-89 \end{gathered}[/tex]Using the distributive property on the right-hand side of the equation:
[tex]\begin{gathered} c=2x+2\cdot5-89 \\ c=2x+10-89 \end{gathered}[/tex]Re-arranging the expression:
[tex]c=(2x-89)+10[/tex]Comparing this with the expression we got for Saturday:
[tex]\begin{gathered} \text{Saturday:} \\ c=2x-89 \\ \text{Sunday:} \\ c=(2x-89)+10 \end{gathered}[/tex]As you can see, 10 more cups were sold on Sunday than on Saturday.
Answer (for part 2): 10 more cups
How is solving a multistep inequality the same as solving a multistep equation? How is it different?
You utilize PEMDAS (parentheses, exponents, multiplication, division, add, subtract) to solve a multi-step equation, and you use the same to solve a multi-step inequality. But inequalities are tough since you have to reverse the sign when multiplying or dividing by a negative integer. And although though a multi-step equation often has 1 or 2 solutions, if you write it as x= #, you'll get the same result but with an inequality sign (or signs).
Hence the above is the difference between solving a multistep inequality and multistep equation.
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two number cubes are rolled for two separate events event A is the event that the sum of the numbers on both cubes is less than 10 event B is the event that the sum of the numbers on both cubes is a multiple of 3 find the conditional probability of B given A occurs first enter your answer as a simplified fraction
We have two events:
A: sum of the numbers is less than 10.
B: sum of the numbers is a multiple of 3.
We can calculate the probabilities as a quotient of the "success" events and all the possible events.
The conditional probability P(B | A) is equal to the probability of P(A intersection B) divided by P(A). That is because, if A is given, then if B happens, A had also happen.
The "success" events for intersection A and B are:
{1,2}, {2,1}, {1,5}, {5,1}, {2,4}, {4,2}, {3,3}, {3,6}, {6,3}, {4,5}, {5,4}
There are a total of 11 results that belong to the intersection of A and B (sum less than 10 and multiples of 3).
Now, we calculate the results that correspond to event A:
{1,1}, {1,2}, {2,1}, {1,3}, {3,1}, {1,4}, {4,1}, {1,5}, {5,1}, {1,6}, {6,1}
{2,2}, {2,3}, {3,2}, {2,4}, {4,2}, {2,5}, {5,2}, {2,6}, {6,2}
{3,3}, {3,4}, {4,3}, {3,5}, {5,3}, {3,6}, {6,3}
{4,4}, {4,5}, {5,4}
There are 30 results that correspond to event A (sum is less than 10).
Then we can calculate P(B | A) as:
[tex]P(B|A)=\frac{P(A\cap B)}{P(A)}=\frac{11}{30}[/tex]The conditional probability of B given A is P(B|A) = 11/30.
Help meeee quickly, I will mark brainliest!
Answer:
adjacent and corrasopnding
Step-by-step explanation:
how do i find the zeros of y=6x^2-6
The given quadratic equation y = 6x² - 6 contains two zeros :
(x - 1) and (x + 1)
Solution:Steps to solve quadratic equation:
Transform the equation into standard form, with one side set to zero. Take into account the non-zero side. Make each factor equal to zero (Remember: a product of factors is zero if and only if one or more of the factors is zero). Solve each of the resulting equations.Given quadratic equation ,
y = 6x² - 6
To find the zeros we have to solve the equation ,
y = 6x² - 6
= 6( x² -1 )
= 6( x² + x - x -1)
= 6(x ( x + 1) - 1( x + 1 ))
= 6 ( x - 1) ( x + 1 )
The equation y = 6x² - 6 contains two zeroes
= (x-1) and (x + 1)
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Suppose 30% of Americans will take the flu shot this season. Consider a random sample of 50 people. Let X be the number of the people who will take the flu shot. What the average number of X? (Round your answer to the nearest whole number)
Using percentages we can conclude that the average number is x is 15.
What is the percentage?A percentage is a number or ratio expressed as a fraction of 100 in mathematics. Although the abbreviations "pct.", "pct.", and occasionally "pc" is also used, the percent sign, "%," is frequently used to indicate it. A percentage is a number without dimensions and without a standard measurement. By dividing the value by the total value and multiplying the result by 100, one can determine the percentage. The percentage calculation formula is (value/total value)100%.So, an average number of x:
A random sample is 50 people and 30% will get the flu shot.So, get 30% of 50 as follows:50/100 × 30 = 15Therefore, using percentages we can conclude that the average number is x is 15.
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John connected three resistors in series. The equivalent resistance of series resistors is the sum of the values of the individual resistors. If John used resistors which were 2.2 × 102 ohms, 3.3 × 103 ohms, and 4.7 × 104 ohms, what was the equivalent resistance? Choice 'A'5.052 × 104 ohmsChoice 'B'50.52 × 103 ohmsChoice 'C'505.2 × 105 ohmsChoice 'D'5.052 × 103 ohms
Given resistors are:
[tex]\begin{gathered} 2.2\times10^2ohms \\ 3.3\times10^3ohms \\ 4.7\times10^4ohms \end{gathered}[/tex]The equivalent resistance is the sum which is obtained below
We can re-write the values given as follow
[tex]2.2\times10^2+33\times10^2+470\times10^2[/tex]=>
[tex]505.2\times10^2\text{ohms}[/tex]We can then convert this
We will get
[tex]\begin{gathered} 505.2\times10^2\text{ohms=}5.052\times10^4ohms=50.52\times10^3ohms \\ \end{gathered}[/tex]Simple interest earned on an investment of $1200 at 9% for 4 years
Given that P= $1200 at an interest rate r= 9% per annum and for t= 4 years, we have:
E =Prt
[tex]E=1200\cdot\:0.09\cdot\:4=432[/tex]Thus, the earnings are: E = $432.
cos^2x(1+tan^2x)=1 simplify
After simplifying cos^2x(1+tan^2x)=1, we get LHS = RHS.
The given equation is a trigonometric equation, that includes trigonometric ratios which basically are the ratios of sides or lengths of a right angle triangle.
To simplify the given equation, we use the identity (sec^2 x - tan^2 x = 1)
that is further (sec^2 x = 1+tan^2 x)
Lets take LHS (left hand side) first,
cos^2x(1+tan^2x)
By putting the identity in LHS equation, we get
cos^2 x (1 + tan^2 x )
cos^2 x (sec^2 x)
As we know that sec^2 = 1/cos^2
Hence, cos^2 x *(1/cos^2 x)
cos^2 is eliminated by division,
= 1 which is equal to RHS
Hence, simplified and LHS = RHS
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After simplification, the trigonometric function becomes equal to each other i.e. LHS = RHS.
What are Trigonometric Functions ?
The trigonometric functions are real functions which relate an angle of a right-angled triangle to ratios of two side lengths.
What are Trigonometric Ratios used for ?In trigonometry, sin, cos and tan values are the primary functions we consider while solving trigonometric problems. These trigonometry values are used to measure the angles and sides of a right-angle triangle. Apart from sine, cosine and tangent values, the other three major values are cotangent, secant and cosecant.
To simplify the given equation, we would use the identity (sec^2x - tan^2x=1) which is (sec^2x = 1 + tan^2x)
Firstly we will solve the LHS side
cos^2x(1+tan^2x)
By inserting the identity in LHS equation, we get
cos^2x(1+tan^2x)
cos^2x(sec^2x)
As sec^2 = 1/cos^2
Therefore, cos^2x *( 1/cos^2x)
cos^2 is eliminated by division,
= 1
which is equal to RHS
Hence solved and LHS = RHS
After simplification, the trigonometric function becomes equal to each other i.e. LHS = RHS.
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What is the value of n?
Answer:
[tex]n = { \boxed{ - \frac{2}{3} }}[/tex]
Step-by-step explanation:
[tex] \frac{1}{( {\sqrt[3]{5}})^{2} } = {5}^{n} \\ [/tex]
- Change or convert the cube root into an index form; ³√x = x^⅓
[tex] \frac{1}{( {5}^{ \frac{1}{3} }) {}^{2} } = {5}^{n} \\ [/tex]
- Open the brackets by multiplying the powers; (a²)² = a²×²
[tex] \frac{1}{ {5}^{( \frac{1}{3} \times 2)} } = {5}^{n} \\ \\ \frac{1}{ {5}^{ \frac{2}{3} } } = {5}^{n} [/tex]
- Following the law of indices below;
[tex]{ \boxed{ \blue{ \pmb{( \frac{1}{ {x}^{a} } ) = {x}^{ - a} }}}}[/tex]
- Therefore;
[tex] {5}^{ - \frac{2}{3} } = {5}^{n} \\ [/tex]
- Since the bases (5) are the same, the powers are equal;
[tex]n = - \frac{2}{3} [/tex]
A company wants to decrease their energy bill by 14%. If their electric bill is currently $2,900 a month, what will their bill be if they are successful? Round your answer to the nearest dollar.$______
To solve this problem, first, we will determine the 14% of $2,900 and then we will subtract that amount from $2,900.
Recall that to compute the x% of y we can use the following expression:
[tex]y\cdot\frac{x}{100}\text{.}[/tex]Using the above expression, we get that the 14% of 2,900 is:
[tex]406.[/tex]Therefore, if they succeed the next month they should receive a bill for
[tex]2900-406=2494[/tex]dollars.
Now, if they pay less than the above amount they can consider it a success.
Answer:
$2494.
Yes, that is a success.
[tex] \sqrt{20} \times \sqrt{15} \times \sqrt{3} [/tex]
can you help me solve it
The table shows a proportional relationship.
x 1 2 3
y 12 24 36
Write an equation that represents the proportional relationship.
y equals 1 over 12 times x
y equals 1 over 2 times x
y = 12x
y = 2x
The equation that represents the proportional relationship of the given table of values is expressed as: y = 12x.
How to Write the Equation that Represents a Proportional Relationship?The equation, y = kx, models a proportional relationship, where:
k is represented as the constant of proportionalityx and y are the variables of the proportional relationship.First, find the constant of proportionality, k, using one point from the table, (1, 12):
Constant of Proportionality (k) = 12/1
Constant of Proportionality (k) = 12.
To write the equation of the proportional relationship, substitute k = 12 into y = kx:
y = 12x
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The countries with the most widgets in the world are the United States and France. If the United States has 2006 more widgets than France and the total number of widgets is 8306. Find the number of widgets for each country.
Given:
a.) The United States has 2006 more widgets than France.
b.) The total number of widgets is 8306.
Let,
x = The number of widgets the United States has
y = The number of widgets France have
x = y + 2006 ; Since the United States has 2006 more widgets than France.
From the given scenario, we generate the following equation:
[tex]\text{ x + y = 8306}[/tex]Let's determine the value of x and y.
[tex]\text{ x + y = 8306}[/tex][tex]\text{ (}y+2006)\text{ + y =8306}[/tex][tex]\text{ }y+2006\text{ + y =8306}[/tex][tex]\text{ }y+\text{ y =8306 - }2006[/tex][tex]\text{ 2y = }6,300[/tex][tex]\text{ }\frac{\text{2y}}{2}\text{ = }\frac{6,300}{2}[/tex][tex]\text{ y = }3150[/tex]Therefore, France has 3150 Widgets.
Let's determine the number of fidgets the United States has. Use y = 3150 in the equation x + y = 8306.
[tex]x+y=8306[/tex][tex]x+3150=8306[/tex][tex]x=8306\text{ - }3150[/tex][tex]x=5156[/tex]Therefore, the United States has 5156 Widgets.
: Converting fractions to decimals using long division.
Consider a fraction
[tex]\frac{3}{7}[/tex]PLS HELP FAST!! Question due in 5 minutes!!!
Answer:
Leg 1: 4
Leg 2: 3
Hypotenuse: 5
Step-by-step explanation:
Pythagorean Theorem
a^2+b^2=c^2
4^2+3^2=c^2
16+9=c^2
25=c^2
5=c
Hope this helps :)
Answer: side c =5
Step-by-step explanation:
We can use Pythagorean Theorem.
a squared + b squared = c squared
We know leg a is 4 units and leg b is 3 units.
4^2+3^2=16+9=25
We square root both c and 25 to get our answer.
sqr 25= sqr c squared
5=c
Given f(x) = 1 - 2x with the range {-3, -5, -7}, find the domain.ОООО{2,3,4}{7, 11, 15){2, 15){-7,8}
Here is the answer: {2,3,4}
option A
Cosh x = 25/7, x > 0
we have
cosh(x)=25/7 and x>0
Remember that
[tex]\cos h^2(x)-\sinh ^2(x)=1[/tex]
substitute the given function
[tex](\frac{25}{7})^2-\sinh ^2(x)=1[/tex][tex]\sinh ^2(x)=\frac{625}{49}-1[/tex][tex]\sinh ^2(x)=\frac{576}{49}[/tex]therefore
sinh(x)=24/7