Answer:
a. The fare for a 9-mile journey = £ 10.6
Step-by-step explanation:
Fare = £2.50 + £0.90 x miles
Fare(9) = £2.50 + £0.90 x ( 9 miles) = £2.50 + £ 8.1 = £ 10.6
a. The fare for a 9-mile journey = £ 10.6
(-2, 5) and (-4,-5).
Answer: the distance between the points (-2, 5) and (-4, -5) is approximately 10.198 units.
Step-by-step explanation:
(-2, 5) and (-4,-5) are two points in the coordinate plane.
The first point (-2, 5) has an x-coordinate of -2 and a y-coordinate of 5. This point is 2 units to the left of the y-axis and 5 units above the x-axis.
The second point (-4, -5) has an x-coordinate of -4 and a y-coordinate of -5. This point is 4 units to the left of the y-axis and 5 units below the x-axis.
To find the distance between these two points, we can use the distance formula:
distance = sqrt[(x2 - x1)^2 + (y2 - y1)^2]
Plugging in the coordinates of the two points, we get:
distance = sqrt[(-4 - (-2))^2 + (-5 - 5)^2] = sqrt[(-2)^2 + (-10)^2] = sqrt[104]
So the distance between the points (-2, 5) and (-4, -5) is approximately 10.198 units.
1) Ryan buys a sofa for £2500 plus VAT at 20%
a) What is the total price of the sofa?
The total price of the sofa is £3000.
Step-by-step explanation:1. Calculate the amount to pay for VAT.To calculate this, multiply the given amount by "0.2", which equals "20%".
[tex]2500*0.2=500[/tex]
2. Add up the two number to find the total amount due.[tex]2500+500=3000[/tex]
3. Conclude.The total price of the sofa is £3000.
-------------------------------------------------------------------------------------------------------
Alternative (and also easier) method.So if we want to add 20% of any amount to said amount, we may multiply it by (1+0.2), which equals "1.20", and it'll give us the result immediately:
[tex]2500*(1+0.2)\\ \\2500*1.2=3000[/tex]
Now, working on the opposite way, let's say we want to reduce that same number (2500) by 25%, maybe because there's a discount on the product. In that case, we must multiply by (1-0.25), which equals 0.75:
[tex]2500*(1-0.25)\\ \\2500*(0.75)=1875.[/tex]
Given :-
Ryan buys a sofa for £2500 .VAT is 20% .To Find:-
Total price of the sofa.Solution:-
Here we are given that Ryan purchases a sofa for £2500 . In order to find the cost of sofa after VAT , find 20% of the price of the sofa,
20% of £2500
20/100 * £2500
£500
Now add this to the original price of the sofa,
£2500 + £500
£3000
Hence the cost of the sofa after VAT is £3000 .
My teacher gave me an extra credit assignment with 25 minutes left of class. It is extra credit, not a timed assessment.
need done as soon as possible
Answer: it will be square or rhombus
Step-by-step explanation:
Many fire stations handle emergency calls for medical assistance as well as calls requesting firefighting equipment. A particular station says that the probability that an incoming call is for medical assistance is 0.63. This can be expressed as
P(call is for medical assistance) = 0.63.
(b) What is the probability that a call is not for medical assistance?
(c) Assuming that successive calls are independent of one another, calculate the probability that two successive calls will both be for medical assistance.
(d) Still assuming independence, calculate the probability that for two successive calls, the first is for medical assistance and the second is not for medical assistance.
(e) Still assuming independence, calculate the probability that exactly one of the next two calls will be for medical assistance. (Hint: There are two different possibilities. The one call for medical assistance might be the first call, or it might be the second call.)
(b) The probability that the call is not for medical assistance = 0.37
(c) The probability that two successive calls will both be for medical assistance = 0.3969
(d) The probability that the first is for medical assistance and the second is not for medical assistance = 0.2331
(e) The probability that exactly one of the next two calls is going to be for medical assistance = 0.4662
Define Probability.The probability of an event is the proportion of favourable outcomes to all other possible outcomes. The symbol x can be used to denote how many successful outcomes there were in an experiment with 'n' outcomes. The formula below can be used to determine a given event's probability:
Probability (Event) = Positive Results/Total Results
= x/n
Given P (call for medical assistance) = 0.63
This means that out of all incoming calls to the fire station, the probability that the call is for medical assistance is 0.63 or 63%. The complement of this event, which is the probability that an incoming call is NOT for medical assistance, is:
P (Not Medical Assistance) = 1 - P (Medical Assistance)
= 1 - 0.63
= 0.37
Now, assuming that successive calls are independent of one another, the probability that two successive calls will both be for medical assistance will be:
P (2 calls for medical assistance)
= 0.63 × 0.63
= 0.3969
The probability that the first is for medical assistance and the second is not for medical assistance will be:
P (1st for medical assistance × 2nd for not medical assistance)
= 0.63 × 0.37
= 0.2331
The probability that exactly one of the next two calls is going to be for medical assistance will be:
P (Exactly 1 call for medical assistance)
= (0.63×0.37) + (0.63×0.37)
= 0.2331 + 0.2331
= 0.4662
To know more about probability, visit:
https://brainly.com/question/30034780
#SPJ1
let $pqr$ be an equilateral triangle, centered at $o.$ a point $x$ is chosen at random inside the triangle. find the probability that $x$ is closer to $o$ than to any of the vertices. (in other words, find the probability that $xo$ is shorter than $xp,$ $xq,$ and $xr.$)
The probability that $xo$ is shorter than $xp,$ $xq,$ and $xr.$ is,
⇒ 1/3
What is mean by Probability?The term probability refers to the likelihood of an event occurring. Probability means possibility. It is a branch of mathematics that deals with the occurrence of a random event. The value is expressed from zero to one.
Given that;
Let $pqr$ be an equilateral triangle, centered at $o$ a point $x$ is chosen at random inside the triangle.
Hence, The probability that $xo$ is shorter than $xp,$ $xq,$ and $xr.$ is,
⇒ 1/3
Learn more about the probability visit:
https://brainly.com/question/13604758
#SPJ1
Find the area of the blue-shaded region. Please help I need it asap. The answer is 20.0m squared I cannot figure out the work for it
The area of the blue-shaded region is 19.95 m²
What is area?Area is defined as the total space taken up by a flat (2-D) surface or shape of an object.
Given that, a rectangle with length 14 m, and diagonal 15.5 m, a parallelogram has been cut out of it, we need to find the area remaining,
Using the Pythagoras theorem,
15.5² = 14²+w² [width]
w² = 240.25-196
w² = 44.25
w = 6.65
Therefore, the width of the rectangle is 6.65 m
That mean, the height of the parallelogram is 6.65 m,
The area of the blue-shaded region, is calculated by subtracting the area of the parallelogram by the area of the rectangle,
Area of the remaining region = 14×6.65-11×6.65
= 6.65(14-11) = 6.65×3
= 19.95 m²
Hence, the area of the blue-shaded region is 19.95 m²
Learn more about area, click;
https://brainly.com/question/27683633
#SPJ1
Use a definition, postulate, or theorem to find the value of x in this figure described.
Y is the midpoint of XZ. If XZ = 6x-2 and YZ = 2x + 2, find x.
Select each definition, postulate, or theorem you will use.
A Segment Addition Postulate
B definition of segment bisector
C Linear Pair Theorem
D definition of a midpoint
The solution is x =__?
Thus, the value of x is 1.
What is midpoint ?The description that will be used to break this problem is D description of a midpoint.
By description, a midpoint is a point on a line member that divides it into two equal corridor. thus, Y is the midpoint of XZ, which means that XY is equal in length to YZ.
Using the Member Addition hypothetical( A), we can write
XZ = XY YZ
Substituting the values given in the problem, we get
x- 2 = XY 2x 2
Simplifying this equation, we get
x- 2 = XY 2x 2
4x = 4
x = 1
To learn more about equation:
https://brainly.com/question/2965799
#SPJ1
GROUP 'D' (4×5=20) A person purchases a piece of land in Rs.80, 00,000 in 2075 B.S. At the same time of 2075 B.S. a house is constructed on a piece of land in Rs. 2,70,00,000. If the price of land increases at the rate of 20% per annum and the price of house depreciates at the rate 20% per annum. After how many years the price of land and the price of house will be equal? Find it. combined solid is formed with the combination of hemisphere and cone having radius
After 2.5 years the price of land and the price of house will be equal.
What is Simple interest?A quick and easy method of calculating the interest charge on a loan is called a Simple interest.
Given that;
A person purchases a piece of land in Rs.80, 00,000 in 2075 B.S.
And, At the same time of 2075 B.S. a house is constructed on a piece of land in Rs. 2,70,00,000.
Since, The price of land increases at the rate of 20% per annum.
Hence, We get;
A = 80,00,000 (1 + 20/100)ⁿ
And, The price of house depreciates at the rate 20% per annum.
Hence, We get;
A = 2,70,00,000 (1 - 20/100)ⁿ
Let after n years the price of land and the price of house will be equal.
Thus, We get;
80,00,000 (1 + 20/100)ⁿ = 2,70,00,000 (1 - 20/100)ⁿ
8 (120/100)ⁿ = 27 (80/100)ⁿ
8 (6/5)ⁿ = 27 (4/5)ⁿ
Take log both side,
log 8 + n (log 6 - log 5) = log 27 + n (log 4 - log 5)
0.9 + n × 0.8 = 1.4 + n × 0.6
0.9 + 0.8n = 1.4 + 0.6n
0.2n = 0.5
n = 2.5 years
Therefore, After 2.5 years the price of land and the price of house will be equal.
Learn more about the simple interest visit;
brainly.com/question/2294792
#SPJ9
Zachary invests $400 into an account that earns 3.5% simple interest for 5 years. He does not make any other deposits or withdrawals.
At the end of 5 years, Zachary invests the entire account balance into a different account that earns 5% simple interest. He leaves the money in the account for 2 years without making any additional deposits or withdrawals.
What is the new account balance at the end of 2 years?
The new account balance at the end of 2 years is $517.
Simple interest
5 yearsUsing this formula I= (P+r×t)
Where: I=Interest=?
P=Principal=$400
r=Interest rate=3.5%
t=Time=5 years
Hence: I= ($400×0.035 x 5) which makes I= $70
2 years
I=Interest=?
P=Principal=$470
r=Interest rate=5%
t=Time=2 years
I=($470+0.05×2) which makes I=$47
New balance:
New balance=$400+$70+$47
New balance=$517
Inconclusion the new account balance at the end of 2 years is $517.
Diameter(a) is 20 cm and diameter(b) is 5. What is the ratio of circumference(a) to circumference(b)?.
Answer:
5:1
Step-by-step explanation:
d_a = 20
d_b = 5
Equation for the circumference of a circle:
C = pi*d
C_a = pi * d_a
C_a = pi*20
C_b = pi * d_b
C_b = pi * 5
Ratio of C_a to C_b = C_a/C_b
C_a/C_b = (pi * 20)/(pi * 4) = 5:1
Mrs. Grady surveyed 30 students, 13 of which said they liked basketball, 18 of which said they liked hockey, and 4 of which said they liked both sports.
(a) How many students did not like either sport?
(b) How many students liked exactly one of the sports?
Answer:
Step-by-step explanation:
(a) To find the number of students who did not like either sport, we can use the formula:
Total students = Students who like basketball + Students who like hockey - Students who like both sports + Students who like neither sport
We know that the total number of students surveyed is 30, and we also know the number of students who like basketball, hockey, and both sports. We can use this information to solve for the number of students who like neither sport:
30 = 13 + 18 - 4 + Students who like neither sport
Simplifying this equation, we get:
3 = Students who like neither sport
Therefore, there were 3 students who did not like either sport.
(b) To find the number of students who liked exactly one of the sports, we can subtract the number of students who liked both sports from the total number of students who liked at least one of the sports. We know that 13 students liked basketball, 18 students liked hockey, and 4 students liked both sports. To find the number of students who liked at least one sport, we can add the number of students who liked basketball and the number of students who liked hockey, but we need to make sure we don't count the 4 students who liked both sports twice:
Number of students who liked at least one sport = Students who like basketball + Students who like hockey - Students who like both sports
Number of students who liked at least one sport = 13 + 18 - 4 = 27
Therefore, the number of students who liked exactly one sport is:
Number of students who liked exactly one sport = Number of students who liked at least one sport - Number of students who liked both sports
Number of students who liked exactly one sport = 27 - 4 = 23
So there were 23 students who liked exactly one of the sports.
point slope form holt mcdougal practice B lesson 5-8 answer key??
The point slope form of a linear equation is an equation that describes the relationship between two variables, x and y, in terms of their linear relationship.
What is the point slope form?It takes the form:.y - y₁ = m(x - x₁)
where (x₁, y₁) is a point on the line and m is the slope of the line.
In this form, you can find the equation of a line if you know a point on the line and the slope of the line. You can also use this form to find the equation of a line if you are given two points on the line, by first finding the slope using the two points, and then plugging in one of the points and the slope into the equation.
The point slope form can be useful in a variety of contexts, such as in graphing and in solving problems involving rates of change.
Learn more about slope on:
https://brainly.com/question/3493733
#SPJ1
let x be a random variable taking values [0, 1, 2, 3] with respective probabilities [0.2, 0.5, 0.2, 0.1] (a) determine the expectation of x. (show work)
A total of 23800 cubes can fit inside the box of the given dimensions.
What is the volume of cube?The volume of a cube is given by -
Volume = a x a x a = a³
Given is that a box has a length of 10 inches, a width of 8[tex]\frac{3}{4}[/tex] inches, and a height of 4[tex]\frac{1}{4}[/tex] inches.
The volume of the box would be -
V = 10 x 8[tex]\frac{3}{4}[/tex] x 4[tex]\frac{1}{4}[/tex]
V = 10 x 35/4 x 17/4
V = 371.875 inches³
The volume of cube -
v = 1/4 x 1/4 x 1/4
v = 0.015625 inches³
Number of cubes that will fill the box would be -
n = V/v
n = 371.875/0.015625
n = 23800
Therefore, a total of 23800 cubes can fit inside the box of the given dimensions.
To solve more questions on volumes, visit the link below -
https://brainly.com/question/10498558
#SPJ1
6/cm
4 cm
Find the value of x.
X
x = [?]up
The measurement of x, in the given circle, is 5 cm.
What is a circle?A circle is a round-shaped figure that has no corners or edges. In geometry, a circle can be defined as a closed, two-dimensional curved shape.
Given is a circle with a tangent of 6 cm and a secant of length 4+x, we need to find the measurement of x,
Using properties of circle,
6² = 4·(4+x)
36/4 = 4+x
9 = 4+x
x = 5
Hence, the measurement of x, in the given circle, is 5 cm.
Learn more about circle, click;
https://brainly.com/question/29142813
#SPJ1
In a research study on multitasking, 8 students were
asked to play a video game. They were then asked to
record the number of minutes they played the video
game. Could this be a graph of the results? Explain
how you know.
Step-by-step explanation:
study by the University of London found that participants who multitasked during cognitive tasks, experienced an IQ score decline similar to those who have stayed up all night. Some of the multitasking men had their IQ drop 15 points, leaving them with the average IQ of an 8-year-old chil
PLEASE HELP!
Over the course of 24 hours, the tides on Earth complete one full cycle from low tide to high tide and back down again. On one particular beach, the tide drops to 2 feet below sea level for low tide and reaches 4 feet above sea level for high tide. Write a possible trigonometric function that would model the tide situation for
this beach.
Answer:picture is not clear on my side, please re-upload thx!
Step-by-step explanation:
Somebody help me please!!!!
Point F is on the line segment EG. Given EG=5x+7, EF=5x, and FG=2x-7, determine the numerical length of FG.
Answer:
[tex]\text{Numerical length of $\overline{FG}$ = 7}[/tex]
Step-by-step explanation:
We are given the following data:
[tex]EG = 5x + 7\\EF = 5x\\FG=2x-7\\[/tex]
Point F is the line segment [tex]\overline{EG}[/tex]
So F is between E and G
We get the relationship
EG = EF + FG
→ 5x + 7 = 5x + (2x - 7)
→ 5x + 7 = 5x + 2x - 7
→ 5x + 7 = 7x - 7
Moving x terms to the left and the constant 7 from left to the right gives
→ 5x - 7x = -7 +(-7)
→ -2x = -14
→ x = -14/-2 = 7
Therefore length of FG = 2x - 7
= 2(7) - 7
= 14 - 7
= 7
Follow these steps to graph this parabola:
y = x
Plot the y-intercept
2
1. Find/Plot the vertex
2.
3. Find/plot one more point
4. Reflect #2 and #3 over the axis of symmetry
-10-9-8-7 -6 -5 -4 -3 -2
7
10
9
8
7
6
54
3
2
1
0 1 2 3 4 5 6 7 8 9 10
-1
2
4x + 4
-3
-4
-5
-6
-7
-8
-9
X
Please find attached the graph of the parabola, y = x² - 4·x + 4, created with MS Excel, showing the points;
The vertex, (2, 0)Y-intercept; (0, 4)One more point; (1, 1)What is a parabola?A parabola is the locus of a point that moves such that its distance from a point (known as the focus) and a line (known as the directrix), are the same.
1. The quadratic function is; y = x² - 4·x + 4
The x-coordinates of the vertex of the quadratic function, f(x) = a·x² + b·x + c, can be found using the formula;
x = -b/(2·a)
The x-coordinates of the graph of the equation, y = x² - 4·x + 4, is the point;
x = -(-4)/(2 × 1) = 2
The y-value of the vertex is therefore;
y = 2² - 4 × 2 + 4 = 0
The coordinates of the vertex is therefore; (2, 0)
2. The y-intercept is the point the graph intersects the y-axis, which is the point the x-value is zero, therefore;
The coordinate of the y-value of the y-intercept is therefore;
y = 0² - 4 × 0 + 4 = 4
The y-intercept is therefore; (0, 4)
3. A point on a function can be plugging a value of the input as follows;
The point at x = 1 is; y = 1² - 4×1 + 4 = 1
Therefore, another point on the graph is; (1, 1)
4. The axis of symmetry is the vertical line passing through the vertex, with an equation which is the x-value of the vertex
The x-value of the vertex is; x = 2, therefore, the axis of symmetry is the line; x = 2
The reflection of a point (x, y) about the vertical y-axis is the point (-x, y)
Therefore, the image of the reflection of the y-intercept, (0, 4) about the line x = 2 will be the point (4, 4)
The reflection of the point (1, 1), about the line x = 2 is the point (3, 1)
The above points can be used to graph the parabola, y = x² - 4·x + 4.
Please find attached the graph of the parabola created with MS Excel.
Learn more about quadratic functions here: https://brainly.com/question/27920694
#SPJ1
PLEASE HELPPP!!!! DUE IN 2 HOURSS!!!!!
The current population of Algeria is 38 million
How to determine the current population of AlgeriaFrom the question, we have the following parameters that can be used in our computation:
P = 38(1 + r)^t
In the initial year, we have
t = 0
Substitute the known values in the above equation, so, we have the following representation
P = 38(1 + r)^0
Evaluate
P = 38
Hence, the population is 38 million
Read more about exponential function at
https://brainly.com/question/11464095
#SPJ1
You insure your home for $125,000. You want to be safe and add coverage on the contents, so you take 55% on the contents. How much coverage will you have on the contents of your home?
The amount of coverage that you will have on the contents of your home would be = $68,750
How to calculate the amount of coverage for contents of your home?The total amount of money that was insured for the house = $125,000
The percentage of insurance that was left for the contents of the house = 55% of insurance.
That is;
= 55/100 × $125,000
= 6875000/100
= $68,750.
Learn more about percentage here:
https://brainly.com/question/24304697
#SPJ1
Can you please solve and see which one is a function and which one is not a function
For each relation, we would determine whether or not it is a function as follows;
Relation 1 is: B. not a function
Relation 2 is: B. not a function.
Relation 3 is: B. not a function
Relation 4 is: A. a function.
How to determine the relations that represent functions?In Mathematics, a function is generally used for uniquely mapping an independent value (domain or input variable) to a dependent value (range or output variable).
This ultimately implies that, an independent value (domain) represents the value on the x-coordinate of a cartesian coordinate while a dependent value (range) represents the value on the y-coordinate of a cartesian coordinate.
Based on relations 1, 2, and 3, we can logically deduce that they do not represent a function because their independent value (domain) has more than one dependent value (range).
Read more on function here: brainly.com/question/3632175
#SPJ1
Use the diagram to complete the statement.
The length of CF is solved to be 12
How to find CFIn the figure the value of CF is solved using the vertical angle theorem and sum of angles in a triangle
In triangle GBC
angle C = 180 - 90 - 45
angle C = 45
Using vertical angle theorem
angle DCB = angle DCF
Using trigonometry relation we have
cos 45 = CF / 12√2
CF = cos 45 * 12√2
CF = 12
Learn more about vertical angle at:
https://brainly.com/question/18450499
#SPJ1
Just need help with this question..
Graph appears to intersect the X axis in between 20 and 22 and algebraically the estimate of zero is 21.
What are Linear Equations?Linear equations are equation involving one or more expressions including variables and constants and the variables are having no exponents or the exponent of the variable is 1.
Given a linear function which represents the profit of Bethany, y after x hours of dog walking.
(a) From the graph, we have to estimate the zero.
The graph seems to intersect the X axis in between 20 and 22, approximately 21.
(b) To solve this algebraically, we have the profit function,
y = 23x - 480
When y = 0,
23x - 480 = 0
23x = 480
x = 20.87 ≈ 21
Hence the graphical method gives the same estimate as the algebraic method.
Learn more about Linear Equations here :
https://brainly.com/question/19770987
#SPJ1
If you invest $9,500 per period for the following number of periods, how much would you have?
13 years at 10 percent.
50 years at 9 percent.
The accrued amounts are $32,796.58 and $706,396.44.
Compound interest is computed as interest on the principle of an account plus any accrued interest.
Compound interest can be calculated using the following formula:
x = P (1+r/n[tex])^{rt}[/tex]
,where x = compound interest
P = principal (the initial deposit or loan amount)
r = annual interest rate
n = the number of compounding periods per unit of time
t = the number of time units the money is invested or borrowed for
(a) If you invest $9,500 per period for 13 years at 10 percent.
First, convert R as a percent to r as a decimal
r = R/100
r = 10/100
r = 0.1 rate per year,
Then solve the equation for A
A = P(1 + r/n)nt
A = 9,500.00(1 + 0.1/1[tex])^{13}[/tex]
A = 9,500.00(1 + 0.1[tex])^{13}[/tex]
A = $32,796.58
(b). If you invest $9,500 per period for 50 years at 9 percent,
First, convert R as a percent to r as a decimal
r = R/100
r = 9/100
r = 0.09 rate per year,
Then solve the equation for A
A = P(1 + r/n)nt
A = 9,500.00(1 + 0.09/1[tex])^{50}[/tex]
A = $706,396.44
Therefore, the amounts are$32,796.58 and $706,396.44.
To learn more about the compound interest rate;
https://brainly.com/question/13307568
#SPJ1
A central angle is an angle whose vertex is at the center of a circle. Find the AOC
I. The correct statement is: m<AOB = m<BOC
The measures of the angles are:
II. m<BOC = 53 degrees.
III. m<AOC = 106 degrees.
How to Find the Measure of a Central Angle?When a segment bisects an angle, it forms two equal angles. Therefore, we have following which explains how to find the measure of the given central angle.
I. <AOC is bisected by segment OB into: AOB and BOC, which are equal. Therefore:
m<AOB = m<BOC
II. m<AOB = 53 degrees, therefore,
m<BOC = 53 degrees.
III. m<AOC = 2(53)
m<AOC = 106 degrees.
Learn more about the central angle on:
https://brainly.com/question/10945528
#SPJ1
In a population of 6000 cave-dwelling fish, eyesight is under selection. Fish that are homozygous for allele A1 have good eyesight, fish that are homozygous for A2 are blind and fish that are heterozygous have poor eyesight. In the dark caves that these fish live in, the cost of good eyesight is higher than the benefits and having good eyesight is thus deleterious. Blind fish have a selective advantage of 0.25, fish with poor eyesight have a selection coefficient of 0.05. Which statement is true?
I. Fish with good eyesight have a fitness W = 0
II. The trait blindness is likely to increase in this population
I
II
Both are false
Both are true
Answer: I am in high school so this may not be the best answer, but I would say that eventually eye sight would simply become useless to the fish because they live in a cave and don’t really need to see, there for I would say that the second answer is correct.
The quotient of a number and 7 is 8. Use n to represent “a number”.
Answer:
Step-by-step explanation:
n+7=8
n=1
Morgan has 46 m of fencing to build a four-sided fence around a rectangular plot of land. The area of the land is 130 square meters. Solve for the dimensions (length and width) of the field.
Answer:
So we have two possible values for the width: W = 16 or W = 7.5.
If W = 16, then L = 130/16 ≈ 8.125. This gives us a perimeter of 2(8.125) + 2(16) = 48.25, which is too much fencing.
If W = 7.5, then L = 130/7.5 ≈ 17.333. This gives us a perimeter of 2(17.333) + 2(7.5) ≈ 46.666, which is close enough to 46. Therefore, the dimensions of the field are approximately L = 17.333 m and W = 7.5 m.
Step-by-step explanation:
Let the length of the rectangular plot be L, and let the width be W. Then we have:
The perimeter of the plot is 2L + 2W, and this must equal the length of fencing that Morgan has, which is 46 m. So we have the equation:
2L + 2W = 46
The area of the plot is LW, and we know that this equals 130 square meters. So we have the equation:
LW = 130
We can solve for one variable in terms of the other from the second equation, so let's solve for L:
L = 130/W
Now we can substitute this expression for L into the first equation:
2(130/W) + 2W = 46
Simplifying this equation, we get:
260/W + 2W = 46
260 + 2W^2 = 46W
2W^2 - 46W + 260 = 0
Dividing by 2, we get:
W^2 - 23W + 130 = 0
This is a quadratic equation that we can solve using the quadratic formula:
W = [23 ± √(23^2 - 4(1)(130))] / (2(1))
W = [23 ± 9] / 2
So we have two possible values for the width: W = 16 or W = 7.5.
If W = 16, then L = 130/16 ≈ 8.125. This gives us a perimeter of 2(8.125) + 2(16) = 48.25, which is too much fencing.
If W = 7.5, then L = 130/7.5 ≈ 17.333. This gives us a perimeter of 2(17.333) + 2(7.5) ≈ 46.666, which is close enough to 46. Therefore, the dimensions of the field are approximately L = 17.333 m and W = 7.5 m.
Answer:
Length = 13
Width = 10
Step-by-step explanation:
Let L = length and W = width of the plot
The area is given by LW and is given as 130 square meters
LW = 130 (1)
The perimeter = 2(L + W) and given as 46 meters(length of fencing)
2(L + W) = 46
L+W = 23 (2)
In equation 1, isolate L by dividing both sides by W
LW/W = 130/W
L = 130/W
Substitute this value for L in equation (2)
L + W = 23
130/W + W = 23
Multiply throughout by W:
130/W x W + W x W = 23x W
130 + W² = 23W
Subtract 130W from both sides:
130 + W² - 23W= 0
Rewrite as
W² - 23W + 130 = 0
This is a quadratic equation which can be solved by factoring
Factoring W² - 23W + 130 = 0
(W - 13)(W-10) = 0
This means W = 13 or W = 10
If W = 13, L = 130/W = 120/13 = 10
If W = 10, L = 130/W= 130/10 = 13
So the possible values for L, W are
L = 13, W = 10
or
L = 10, W =13
Choosing the larger value for L gives us:
L = 13, W = 10
The point (7,-9) lies on a circle. What is the length of the radius of this circle if the center is located at (5,-7)
I think the radius would be 2
To find the volume of a prism, Frank multiplies the area of the base by the height. Frank finds the area of the base of a rectangular prism is 24 square inches.
How many inch cubes are needed to fill the bottom layer of the prism?
Answer:
24 inch cubes are needed to fill the bottom layer of the prism.