The domain of the function is Dοmain = [0, 25218]
Range = [0, 45, 90, .....,1134810]
What is domain?In mathematics, the domain of a function is the set of all possible input values (often referred to as the independent variable).
In this case, the maximum capacity of the stadium is 25218 people, so the domain of the function is [0, 25218], including 0 for the case of no attendance.
As we knοw fοr the given questiοn :
• Dοmain will be the number οf peοple whο will be frοm 0 tο 25218
• Range will be the amοunt οf mοney οr revenue which will be [45×0, 45×1, 45×2, ........45×25218]
Sο,
Dοmain = [0, 25218]
Range = [0, 45, 90, .....,1134810]
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Solve the following inequality.
Negative one-half p less-than negative 16
Which graph shows the correct solution?
A number line going from 27 to 37. An open circle is at 32. Everything to the right of the circle is shaded.
A number line going from 27 to 37. An open circle is at 32. Everything to the left of the circle is shaded.
A number line going from 3 to 13. An open circle is at 8. Everything to the left of the circle is shaded.
A number line going from 3 to 13. An open circle is at 8. Everything to the right of the circle is shaded.
After answering the prοvided questiοn, we can cοnclude that As a result, the sοlutiοn tο the inequality is p greater than 32.
What is inequality?In mathematics, an inequality is a nοn-equal relatiοnship between twο expressiοns οr values. As a result, imbalance leads tο inequality. In mathematics, an inequality cοnnects twο values that are nοt equal. Inequality is nοt the same as equality. When twο values are nοt equal, the nοt equal sign is cοmmοnly used ().
Different inequalities, nο matter hοw small οr large, are used tο cοntrast values. Many simple inequalities can be sοlved by mοdifying the twο sides until οnly the variables remain. Hοwever, a number οf factοrs cοntribute tο inequality: Negative values are divided οr added οn bοth sides. Exchange left and right.
We must isοlate the variable p οn οne side οf the inequality sign in οrder tο sοlve it.
-16 negative οne-half p
When bοth sides οf the inequality are multiplied by -2 (and the inequality sign is reversed because we are multiplying by a negative number), we get:
p > 32
As a result, the sοlutiοn tο the inequality is p greater than 32.
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The Question is in the picture
Using compound interest, we can find that at age 59 retirement option 1 will be better than retirement option 2.
Define compound interest?Compound interest is computed on the principal and the accrued interest for a given time period. The interest that has accumulated on the principal over time is added to it, and the combined amount acts as the new principal for the subsequent time period. Once more, the interest for the following period is calculated using the total cumulative principal amount.
Compound interest is the term used to describe the method of computing interest employed in all financial and business transactions globally. The benefit of compounding is that it is consistently better than or comparable to other strategies, such simple interest.
At age 59,
Option 1 = 30000 × 34
= $1020000
Option 2 = 15000 (1+12/408) ^34
= 15000 × (1.02) ^34
= 15000 × 1.9606
= $29409.
So, when you retire at 59, option 1 is better than option 2.
At age 69,
Option 1 = 30000 × 44
= $1,320,000
Option 2 = 15000 (1+12/528) ^44
= 15000 × (1.02) ^44
= 15000 × 2.390
= $35,850.
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At age 59, retirement option 1 will outperform retirement option 2, according to compound interest.
Define compound interest?On the principal and the interest that has accrued over a specific length of time, compound interest is calculated. The principal is increased by the interest that has accrued on it over time, and the combined sum serves as the new principal for the term that follows. Once more, the entire cumulative principal amount is used to determine the interest for the upcoming period.
The term "compound interest" refers to the technique of calculating interest used in all financial and commercial transactions worldwide. Compounding has the advantage of constantly outperforming or being on par with other approaches, like simple interest.
At age 59,
Option 1:
= 30000 × 34
= $1020000
Option 2:
[tex]=15000(\frac{1+12}{408} )^{34} \\\\=15000\times 1.02^{34}[/tex]
= 15000 × 1.9606
= $29409.
So, when you retire at 59, option 1 is better than option 2.
At age 69,
Option 1:
= 30000 × 44
= $1,320,000
Option 2:
[tex]=15000(\frac{1+12}{528} )^{44} \\\\=15000\times 1.02^{44}[/tex]
= 15000 × 2.390
= $35,850.
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(13 points)
A gardener would like to add to their existing garden to make more flowers available for the butterflies that visit the garden. Her current garden is 45 square feet. If she added another rectangular piece with vertices located at (−21, 7), (−23, 7), (−21, 12), and (−23, 12), what is the total area of the garden?
A: 10 ft2
B: 55 ft2
C: 225 ft2
D: 450 ft2
no image
Total area of garden after adding rectangular piece will be 55 ft² i.e. B.
What exactly is a rectangle?
A rectangle is a two-dimensional geometric shape that is characterized by having four sides and four right angles. Opposite sides of a rectangle are parallel and equal in length, while opposite angles are equal. The area of a rectangle can be calculated by multiplying its length by its width, while its perimeter is the sum of the lengths of all its sides. Rectangles are commonly used in many fields, such as architecture, engineering, and mathematics.
Now,
The rectangle has a length of |-21 - (-23)| = 2 and a width of |7 - 12| = 5. Therefore, the area of the new rectangular piece is 2 x 5 = 10 square feet.
Adding this to the area of the existing garden gives a total area of 45 + 10 = 55 square feet.
Therefore, the answer is (B) 55 ft².
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Consider the three sets: A = {2, 4, 6, 8}, B = {1, 3, 5, 7}, and C = {2, 3, 6, 7}. What is the intersection D of these sets? If the intersection is null, then what changes to the set will make the intersection set D = {2}
The new set B = {1, 2, 3, 5, 7}, and the intersection of A, B, and C would be D = {2}.
What is intersection?Intersection is the point at which two sets of data meet. It is the common point or element that exists in both sets.
The intersection of the three sets A, B, and C is the set of elements that are common to all three sets.
In this case, the intersection of A, B, and C is the null set, denoted as ∅. This means that there are no elements that are common to all three sets.
To make the intersection set D = {2}, one of the sets must contain the element 2.
In this case, set A already contains the element 2, so it is sufficient to add the element 2 to one of the other sets, either set B or set C.
Let's say we add the element 2 to set B. The new set would be B = {1, 2, 3, 5, 7}, and the intersection of A, B, and C would be D = {2}.
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Fran and Jill made a new years resolution to ride bikes. Fran rode 40 miles last week
and plans to ride 55 miles per week. Jill rode 70 miles last week and plans to ride 45
miles per week. Predict the week in which Fran and Jill will have ridden the same
number of miles.
A.) 4 weeks
B.) 3 weeks
C.)They will never ride the same number
D.) 5 weeks
If Fran and Jill made a new years resolution to ride bikes. it will take 3 weeks for Fran and Jill to have ridden the same number of miles..
How to find the number of weeks?Let's assume that it takes "x" number of weeks for Fran and Jill to ride the same number of miles.
In the first week, Fran rides 40 miles, and Jill rides 70 miles.
In the "x"th week, Fran will have ridden a total of 40 + 55x miles.
In the "x"th week, Jill will have ridden a total of 70 + 45x miles.
For Fran and Jill to ride the same number of miles in "x" weeks, we need to solve the following equation:
40 + 55x = 70 + 45x
Simplifying this equation, we get:
10x = 30
x = 3
Therefore, it will take 3 weeks for Fran and Jill to have ridden the same number of miles.
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The volume of a cone is equal to the volume of a sphere.
The radius of the cone is four times the radius of the sphere.
Write down an expression for h
in terms of r.
You must simplify your answer.
h=
an expression for height h in terms of radius r, h=r/4
Definition of VolumeThe quantity of space a three-dimensional solid shape takes up is measured by its volume. Although it is hard to conceive in any shape, it may be likened to shapes. A compass box, for instance, has a bigger volume than an eraser inserted inside of it.
Volume of Sphere=4/3πr³
Volume of Cone=1/3πR²h
Given:
A cone's volume is equal to a sphere's volume. The cone's radius is four times greater than the sphere's radius.R=4r
4/3πr³=1/3πR²h
4r³=R²h
4r³=(4r)²h
r=4h
an expression for height h in terms of radius r, h=r/4.
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A randomized comparative experiment tests whether a cholesterol medication lowers the overall blood pressure for male patients. The control group has ten male patients and the treatment group, which receives the medication, has 10 male patients. All patients started with a cholesterol level of 245 mg/dL. Cholesterol in mg/dL Control 241 243 242 245 250 248 246 245 242 247 Treatment 230 225 220 218 224 240 232 221 235 224 What is the difference in the treatment mean and control mean
Therefore, we can't calculate the difference in blood pressure between the control and treatment groups. Difference in means: 244.9 - 226.5 = 18.4 mg/dL.
by the question.
The question appears to be incomplete. It asks for the "difference," but it doesn't specify what difference it's referring to. Based on the information provided, I can provide some possible interpretations and calculations:
Difference in cholesterol levels before and after treatment:
Since all patients started with a cholesterol level of 245 mg/dL, we can't calculate the difference in cholesterol levels before and after treatment. We don't have any data on the patients' cholesterol levels after treatment.
Difference in average cholesterol levels between the control and treatment groups:
Control group mean: (241+243+242+245+250+248+246+245+242+247)/10 = 244.9 mg/dL
Treatment group mean: (230+225+220+218+224+240+232+221+235+224)/10 = 226.5 mg/dL
Difference in means: 244.9 - 226.5 = 18.4 mg/dL
Difference in average blood pressure between the control and treatment groups:
The prompt states that the experiment tested whether the cholesterol medication lowers the overall blood pressure for male patients, but it doesn't provide any data on blood pressure.
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calculo del incremento %
se tiene 5430 y se gasto 1150
¿que porcentaje de dinero se gasto?
Solve. (Easy 10 points)
Answer:
A) -3
Step-by-step explanation:
To remove the radical on the left side of the equation, cube both sides of the equation.
[tex]\sqrt[3]{4x + 4}^{3}[/tex] = (-2)³
Simplify each side of the equation.
4x + 4 = -8
4x = -12
x = -3
So, the answer is A) -3
Rewrite each equation without absolute value for the given conditions.
y = |x3| + x +2|-|x - 5| if 3
Rewriting the absolute value problems gives us: y = |x − 3| + |x + 2| − |x − 5| = 3 - x + x + 2 - (5 - x) = x
How to write Absolute Value equations?The absolute value is simply defined as the distance from zero.
The equation we are to rewrite is:
y = |x − 3| + |x + 2| − |x − 5|, if -2 < x < 3
Modulus value means that it always gives positive value. Thus:
if x < a, then |x - a| is positive when |x - a | = a -x, which is positive as a is larger than x.
and if x >a, then |x-a| is positive when |x-a| = x - a, which is positive as a is smaller than x.
Applying the same,
For -2 < x < 3,
|x - 3 | = 3 - x, as x <3
| x + 2 | = | x - (-2)| = x - (-2) = x+2 as x> -2
| x - 5 | = 5 -x , as x < 5
Therefore, y = |x − 3| + |x + 2| − |x − 5| = 3 - x + x + 2 - (5 - x) = x
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-8^2÷(-2)^3 without using a calculator
Answer:
Step-by-step explanation:
-8^2 and (-2)^3 are exponents so it should be solved first
-8^2 = -64 and (-2)^3 = -8
(-64)/(-8)
64/8
8
8
EXPLANATION:To solve this expression, we need to follow the order of operations, which is PEMDAS (Parentheses, Exponents, Multiplication and Division, and Addition and Subtraction) from left to right:
First, we need to simplify the exponents: -8^2 means -1 times 8 squared, which is -1 times 64 or -64. (-2)^3 means -2 multiplied by itself three times, which is -2 x -2 x -2 or -8.
Next, we need to perform the division and multiplication, again from left to right: -64 ÷ -8 equals 8.
Therefore, the final answer to the expression -8^2÷(-2)^3 is 8.
how did they get this answer
Step-by-step explanation:
r = 250 ( thousand) and r = 180 + 35 log4 (x) <====base 4 LOG
sooooo 250 = 180 + 35 log4(x) find 'x' thousands
(250 -180)/35 = log4 (x)
2 = log4(x) these are exponents of 4 ...anti log base 4:
4^2 = 4^(log4 x)
16 = x
But x is thousands of $ (per the question info)
so $ 16 000
PLS SOMEONE HELP MEEEEE
In conclusion MN is approximately 8.73.
How to solve?
In triangle MNK, we know that MN = NK and the angle between them is 110 degrees. Let's call the third angle in this triangle A.
We also know that MK = 5.
Since the sum of the angles in a triangle is always 180 degrees, we can find angle A:
A + 110 + A = 180
2A = 70
A = 35
Now we can use the Law of Sines to find MN:
MN/sin(110) = MK/sin(A)
MN/sin(110) = 5/sin(35)
MN = 5×sin(110)/sin(35)
MN ≈ 8.73
Therefore, MN is approximately 8.73.
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Complete Quedtion:
In triangle AMNK, we have MN = NK, angle M/N = 110 degrees, and MK = 5. What is the length of MN?
A scientist has two solutions, which she has labeled Solution A and Solution B. Each contains salt. She knows that Solution A is 70% salt and Solution B is 95% salt. She wants to obtain 120 ounces of a mixture that is 75% salt. How many ounces of each solution should she use?
The number of ounces in solution A= 16, and the number of ounces in the solution B = 104
let x be the number of ounces of solution A
let y be the number of ounces of solution B
x+y=120
Substitute the value of y,
y=120-x
Solution A is 70% salt and B is 95% salt,
then
0.7x+.95y=.75(120)
0.7x+.95y=90
multiply both sides of the equation by 100 to remove the decimal points,
70x+95y=900
70x+95(120-x)=900
70x+1140-95x=900
-15x=900-1140
15x=240
x=16
and y=120-16
y=104
The number of ounces in solution A= 16
and the number of ounces in solution B = 104
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will give brainliest if both questions are answered
Answer:
17) x = 23;18) x = 30.------------------------------
Question 17Angle with the measure of 130° forms a vertical angle pair with the sum of x and 107° angle.
Since vertical angles are congruent we have:
x + 107 = 130x = 23Question 18The two angles, x and 2x together form a right angle, since they form a linear pair with another angle, marked as right angle. Therefore, x and 2x are complementary angles:
x + 2x = 903x = 90x = 30A 56° B D M E What is the value of y? needs an answer asap
Step-by-step explanation:
The inscribed angle BAD = 1/2 arc BD
56° = 1/2 BD
arc BD = 112°
and arc BAD would then be 360 - 112 = 248°
For the EXTERNAL angle y
y = 1/2 ( difference of intercepted arcs ) = 1/2 ( 248 -112)° = 68°
A street that is 186 m long is covered in snow. City workers are using a snowplow to clear the street. A tire on the snowplow has to turn 31 times in traveling the length of the street. What is the diameter of the tire? Use the value 3.14 for PI . Round your answer to the nearest tenth. Do not round any intermediate steps.
Answer:
The number of times the tire will have to turn in travelling the length of the street is 30.9 times.
To determine the number of times the tire will have to turn in travelling the length of the street, we will first calculate the circumference of the tire.
Since the tire is circular, the circumference of the tire can be calculated from the formula for calculating the circumference of a circle.
The circumference of a circle is given by
C = πd
Where C is the circumference and d is the diameter
From the question d = 1.7m and π = 3.14
∴ C = 3.14 × 1.7
C = 5.338 m
Therefore, the circumference of the tire is 5.338 m
Now, for the number of times the tire will have to turn in travelling the length of the street, we will divide the length of the street by the circumference of the tire.
Number of times the tire will have to turn = Length of the street ÷ Circumference of the tire
Number of times the tire will have to turn = 165 m ÷ 5.338 m
Number of times the tire will have to turn = 30.91045 times
Number of times the tire will have to turn ≅ 30.9 times
Hence, the number of times the tire will have to turn in travelling the length of the street is 30.9 times
rational functions v and w both have a point of discontinuity at x=7 which equation could represent function w ?
Answer: The answer is C.
Step-by-step explanation:
The equation that could represent a rational function is answer C.
I hope this helped! A brainilist would be amazing! <3
Is 5:10 and 15:30 equivalent
Yes, 5:10 and 15:30 are equivalent ratios because they simplify to the same ratio of 1:2.
Ratios represent the relationship between two or more quantities or values. When two ratios have the same simplified form, they are considered equivalent because they represent the same relationship between the quantities being compared.
In the given example, the ratios 5:10 and 15:30 can be simplified to the same ratio of 1:2. This means that both ratios represent the same relationship between the quantities being compared. Specifically, both ratios represent a comparison between two quantities where the second quantity is twice as large as the first quantity.
To simplify a ratio, we divide both the numerator and denominator by their greatest common factor (GCF). The GCF is the largest number that divides evenly into both the numerator and denominator. In this case, the GCF of 5 and 10 is 5, and the GCF of 15 and 30 is 15. Dividing both ratios by their respective GCFs results in a simplified ratio of 1:2 for both ratios.
Therefore, 5:10 and 15:30 are equivalent ratios because they represent the same relationship between quantities, and have the same simplified form.
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All AABC is reflected across the x-axis, then rotated 90° clockwise about the origin, and finally reflected across the line y = The coordinates of vertex A' are (1, 1) v V The coordinates of vertex B' are (2, 3) The coordinates of vertex C' are|| (2, 1) ********* showing answers i got off here ughh in pic wrong ones
The coordinates of vertex A' are (1, 1)
The coordinates of vertex B' are (2, 3).
The coordinates of vertex C' are (2, 1).
What is a reflection over the x-axis?In Geometry, a reflection over or across the x-axis is represented or modeled by the following transformation rule (x, y) → (x, -y). This ultimately implies that, a reflection over or across the x-axis would maintain the same x-coordinate (x-value) while the sign of the y-coordinate (y-value) changes from positive to negative or negative to positive as the case may be.
In this exercise, you are required to apply a reflection over the x-axis, a rotation of 90° clockwise about the origin, and finally reflected across the line y = x as shown in the transformation table below;
Original vertex Reflection (x-axis) Rotated 90° clockwise Line y = x
A (1, 1) → (1, -1) → (-1, -1) → (1, 1)
B (2, 3) → (2, -3) → (-3, -2) → (2, 3)
C (2, 1) → (2, -1) → (-1, -2) → (2, 1)
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Explain how you would organize your step-by-step calculations in evaluating the order of operations problem below. (Remember PEMDAS!) There should be five steps in this calculation. For full credit you must provide a step-by-step explanation as well as computation for the correct answer.
8÷2 (1+3) - 2^3
The steps that should be taken to evaluate the order of operations given are:
Solve for the brackets Solve for the exponents Solve the division Multiply by the result of the bracket Subtract the result of the exponents How to solve with PEMDAS ?To solve with PEMDAS, you first need to solve what is in the brackets in the order of operations given which is 8÷2 (1+3) - 2^3.
= 8÷2 (1+3) - 2^3
= 8÷2 x 4 - 2^3
Then solve for the exponents :
= 8÷2 x 4 - 2^3
= 8÷2 x 4 - 8
Then because the division comes first, you solve for that:
= 8÷2 x 4 - 8
= 4 x 4 - 8
You then solve for the multiplication as this takes precedence over subtraction:
= 4 x 4 - 8
= 16 - 8
Then solve the subtraction:
= 16 - 8
= 8
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help pls show ur work
21. The trainer raised the end of the treadmill from the floor by 0.62 ft or 7.4 in.
22. The ramp needs to be 1.19 ft tall at the highest point.
23. The springboard is 6.21 in long.
What is trigonometric ratio?Trigonometric ratio is the ratio of two sides of a right triangle to each other, or the ratio of the sine, cosine, or tangent of an angle in a right triangle.
21: Incline = 7°
Length of walking surface = 5 ft
We need to calculate the change in height of the treadmill.
Let x be the height of the end of the treadmill from the floor.
We can use the trigonometric ratio, tangent (tan), to solve the problem.
tan(7°) = Opposite/Adjacent
=> x/5 = tan(7°)
=> x = 5tan(7°)
=> x = 5×0.124
=> x = 0.62 ft
22: Angle = 20°
Length of board = 3.5 ft
We need to calculate the height of the ramp at the highest point.
Let y be the height of the ramp at the highest point.
We can use the trigonometric ratio, sine (sin), to solve the problem.
sin(20°) = Opposite/Hypotenuse
=> y/3.5 = sin(20°)
=> y = 3.5sin(20°)
=> y = 3.5×0.342
=> y = 1.19 ft
23: Angle = 14.5°
Length of springboard coils = 6 in
We need to calculate the length of the springboard.
Let z be the length of the springboard.
We can use the trigonometric ratio, cosine (cos), to solve the problem.
cos(14.5°) = Adjacent/Hypotenuse
=> 6/z = cos(14.5°)
=> z = 6/cos(14.5°)
=> z = 6/0.966
=> z = 6.21 in
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r=-0.49 and the margin of error for 95% confidence is 0.10
Answer:
Step-by-step explanation:
um
Please Help Solve this Useing the Solve Method, or read what it says and you'll know how to awnser it.
The ratio means that for every 2 motor boats, there are 3 sail boats. 6 sail boats must also enter so that the ratio remains the same. A possible missing information will be the total number of ships in the armada.
What is a ratio?A ratio is a mathematical expression that represents the relationship between two quantities or numbers. It is a comparison of two numbers, often written in the form of a fraction or with a colon. Ratios are used to express how much of one thing there is in relation to another.
1. a. The ratio of motor boats to sail boats can be written in three ways:
As a fraction: 2/3
With a colon: 2:3
With the word "to": 2 to 3
This ratio means that for every 2 motor boats, there are 3 sail boats. Alternatively, it can be interpreted as for every 3 sail boats, there are 2 motor boats. The ratio does not specify the total number of boats, only the relative proportion of motor boats to sail boats.
b. To keep the ratio between motor boats and sail boats the same, we need to maintain the same ratio of motor boats to sail boats.
Currently, the ratio of motor boats to sail boats is 2:3.
Let x be the number of sail boats needed to maintain the ratio.
After x sail boats enter, the total number of boats will be 2 + x motor boats and 3 + x sail boats.
The ratio of motor boats to sail boats will still be 2:3, so we can write,
[tex]\frac{(2 + x)}{(3 + x)}[/tex] = [tex]\frac{2}{3}[/tex]
Cross-multiplying, we get,
2(3 + x) = 3(2 + x)
6 + 2x = 6 + 3x
x = 6
Therefore, 6 sail boats must also enter so that the ratio remains the same.
2. To find the total number of galleons and galleys in the Spanish armada, we need at least one additional piece of information. The ratio of 5:1 tells us that for every 5 galleons, there is 1 galley. However, we don't know the total number of galleons and galleys in the armada.
One possible missing information that could help us find the total number of galleons and galleys is the total number of ships in the armada. If we knew the total number of ships, we could find the number of galleons and galleys in the armada.
For example, let's say the total number of ships in the armada is 100. And let number of galleons = a and number of galleys = b. Then,
a + b = 100
[tex]\frac{a}{b}[/tex] = 5/1
b = a/5
Substituting this expression into the first equation, we get:
a+ (a/5) = 100
(6a/5) = 100
a = 500/6 ≈ 83.33
Then b = (1/5)(83.33) = 16.67
However, since we cannot have a fractional part of a ship, we can round up or down to get whole numbers. Therefore, we can conclude that the Spanish armada had approximately 83 galleons and 17 galleys, based on the given ratio of 5:1.
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Joanne will plant 40 flowers per sq metre of space she will plant 4 x as many red flowers than white
Answer:
7s
Step-by-step explanation:
Joanne ate the flowers and the red flowers toothere us 40 pens 9 out of 10 r black wats the fraction an the percentage
Answer:
White
Step-by-step explanation:
Number of favorable outcomes/Number of trails =4/20 or 1/5
A regular tube of toothpaste costs $2.50 for 3.2 ounces. A travel-size tube costs $1.00 for 1.2 ounces. Compare the prices and weights using percent to decide which is the better buy.
Answer: The regular tube is the better buy
Step-by-step explanation: $2.50/3.2 ounces equals $.78 per ounce. $1.00/1.2 ounces equals $.83 per ounce. Therefore, the regular tube is the better buy.
D
Question 3
A mobile home company is new homes with the property of each home
measuring 30 feet wide. If the length of the street is 345 feet, how many
houses can be placed on the street?
1
The maximum number of homes that can be placed on the street is 11.
To calculate the number of houses that can be placed on the streetfirst we need to divide the total length of the street by the width of each home.
The length of the street is 345 feet and the width of each home is 30 feet. Therefore, the number of homes that can be placed on the street is:
345 feet / 30 feet per home = 11.5 homes
Since we cannot have a fraction of a home, we need to round down to the nearest whole number.
Therefore, the maximum number of homes that can be placed on the street is 11.
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Find the area of a rectangular park whose perimeter is 320m and length is 90m.
First, 90 + 90 = 180
Second, 320 - 180 = 140
Third, 140 / 2 = 70.
| 90 * 70 = 6,300
|
|
| 90
|
|____________
70
What is the probability of Meikel wearing khakis and sandals?Help.
3/21
1/4
4/8
1/2
Step-by-step explanation:
The probability of Meikel wearing khakis and sandals is
3 ÷ 12 which will give us
1/4