Answer:
The dimensions that would create the garden of maximum area are 30 feet and 15 feet
The maximum area is 450 feet²
Step-by-step explanation:
The garden is fencing for three sides only, That means the length of the fencing is equal to the sum of the length of the three sides
Assume that garden is y feet long and x feet wide and the fencing will cover on side of y feet and two sides of x feet
∵ The sum of the length of the 3 sides = y + x + x
∴ The sum of the length of the 3 sides = y + 2x
- The length of the fencing is equal to the sum of the sides
∵ The fencing is 60 feet
- Equate y + 2x by 60
∴ y + 2x = 60
- Find y in terms of x by subtracting 2x from both sides
∴ y = 60 - 2x
To find the dimensions which make the maximum area, find the area of the garden, then substitute y by x, and differentiate it with respect to x, then equate the differentiation by 0 to find the value of x, and substitute this value in the equation of y to find y and in the equation of the area to find the maximum area
∵ The formula of the area of a rectangle is A = l × w
∵ l = y and w = x
∴ A = x y
- Substitute the value of y above in A
∵ A = x(60 - 2x)
- Multiply bracket by x
∴ A = 60x - 2x²
Now differentiate x with respect to x
∵ A' = 60(1) - 2(2)x
∴ A' = 60 - 4x
- Equate A' by 0 to find x
∴ 0 = 60 - 4x
- Add 4x to both sides
∴ 4x = 60
- Divide both sides by 4
∴ x = 15
- Substitute the value of x in the equation of y to find it
∵ y = 60 - 2(15)
∴ y = 30
The dimensions that would create the garden of maximum area are 30 feet and 15 feet
To find the maximum area substitute x by 15 in the equation of the area
∵ A = 60(15) - 2(15)²
∴ A = 900 - 450
∴ A = 450
The maximum area is 450 feet²
A maximum area for the rectangular garden is achieved when the rectangle is a square, having side lengths of 15 and 30 feet. This yields an area of 450 square feet.
Explanation:The question is a classic problem of optimization in Mathematics, where we want to maximize the area of the garden given a constraint, which in this case, is the total length of fence available. We consider the garden to have sides of lengths x and y, where y is the side against the building, and we don't need fencing there. Because we're working with a total of 60 feet of fencing, the length of the other three sides of the rectangle (two sides of length x, one side of length y) give us the equation 2x + y = 60.
We want to maximize the area of the rectangle, which is given by A = x*y. We can substitute y from the above equation into this to give A = x*(60-2x) = 60x - 2x^2. This is a quadratic function and it attains its maximum when x = -b/2a. Here, a = -2, b = -60, so x is 15 feet. The maximum area occurs when x and y are equal, which is when the rectangle is a square.
So, the corresponding value of y = 60 - 2*15 = 30 feet. Therefore, we have a maximum area of 15*30 = 450 square feet.
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what is 4p−5(p+6) simplified
Answer:
-p - 30
Step-by-step explanation:
4p−5(p+6)
Distribute:
=4p+(−5)(p)+(−5)(6)
=4p+−5p+−30
Combine Like Terms
=4p+−5p+−30
=(4p+−5p)+(−30)
=−p+−30
=−p−30
I need help graphing on this number line
Answer:
1 is c
2 is b
3 is d
4 is a
Step-by-step explanation:
Open circle is 'less than' or 'greater than'.
Closed (shaded) circle is 'less than or equal to' or 'greater than or equal to'.
A 3 cm x 10 cm rectangle sits inside a circle with radius of 12 cm.
What is the area of the shaded region?
Round your final answer to the nearest hundredth.
Answer:
422.389 cm
Step-by-step explanation:
First you have to find the area of the circle then subtract it by the area of the rectangle. To find the area of the circle you have to square the radius then multiply it by 3.14.(12×12=144, 144× 3.14=452.389) Therefore 452.389 cm is the area of the circle. Area of the rectangle 30cm.
452.389 -30=422.389
Two sides of a triangle measure 8 cm and 15 cm. Which could be the length of the third side?
6 cm
18 cm
24 cm
28 cm
Answer:
Option 2 is correct
Since only 18 is less than 23 and greater than 7, therefore the possible length of third sides is 18 cm and option 2 is correct.
Which type(s) of equation can have infinite solutions?
A. linear-linear
B. linear-quadratic
C. quadratic-quadratic
Answer:
A and C
Step-by-step explanation:
I did the assignment
Harry Potter is at Ollivanders Wand Shop. As we all know, the wand must choose the wizard, so Harry cannot make the choice himself. He interprets the wand selection as a random process so he can determine the probabilities of different outcomes.
The wood types available are holly, elm, maple, and wenge. The core materials on offer are phoenix feather, unicorn hair, dragon scale, raven feather, and thestral tail.
Let A be the event that Harry is chosen by a wand made of holly and B be the event that he is chosen by a wand with a dragon scale core.
Answer: The probability of being chosen by a wand made of holly or a wand made of dragon scale core is 0.4 or 40%
Step-by-step explanation: What we have are probabilities of two events. The first is the probability that Harry Potter is chosen by a wand made of Holly which is P(A). The other event is the probability that Harry is chosen by a wand with a dragon scale which is P(B).
In other to calculate P(A), there is a total of four possibilities, (that is holly, elm, maple and wenge). Therefore, the probability is derived as;
P(A) = Number of required outcomes/Number of all possible outcomes
P(A) = 1/4 or (0.25)
To calculate P(B), there is a total of five possibilities (that is phoenix feather, unicorn hair, dragon scale, raven feather and thestral tail). Therefore the probability is derived as;
P(B) = Number of required outcomes/Number of all possible outcomes
P(B) = 1/5 or (0.20)
However, the question requires the probability of P(A or B).
First we derive the probability of being chosen by a wand made of holly AND one made of a dragon scale core. In other words we shall calculate the probability of P(A and B) which is derived as;
P(A and B) = P(A) x P(B)
P(A and ) = 1/4 x 1/5
P(A and B) = 1/20 (0.05)
The probability of P(A or B) can now be calculated as follows;
P(A or B) = P(A) + P(B) - P(A and B)
P(A or B) = (0.25 +0.20) - 0.05
P(A or B) = 0.45 - 0.05
P(A or B) = 0.40
Therefore the probability that Harry Potter is chosen by a wand made of Holly or a wand with Dragon scale core is 0.4 or 40%
Answer: P( A or B) = 2/5
Step-by-step explanation:
In a scale drawing of a law office, 1/4 inch represents 4 1/2 feet. If the actual length of the conference room is 30 3 5 feet, what is the length of the conference room, in inches, on the scale drawing?
Answer:
tbh im not sure but i think the answer is 30 ft
Step-by-step explanation:
If the mean of the data set is
4 bubbles, find the number of bubbles Hannah blew. khan academy
Answer: Hannah blew 1 bubble
Step-by-step explanation:
Mean * number of gum chewers= total bubbles
4*4=16
Let’s add up the numbers of bubbles that we do know.
4+5+6=15
16-15=1
Hannah blew 1 bubble
The number of bubbles Hannah blew can be expressed as 1
How can the number of bubbles Hannah blew be calculated?The study of variables and the formula manipulation principles is known as algebra. Its roots lie in the computation methods of ancient Babylonia, but now it is a mode of thinking that permeates practically all branches of mathematics.
Let number of bubbles Hannah blew =x
Then we can set up the equation as
[tex]\frac{1}{4} (4+5+6+x)=4[/tex]
15+x=16
x=16-15
x=1
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25 points no I need help with math
Answer:
1. 23.55 in
2. 102.36 mm
Step-by-step explanation:
First, the circumference of a circle is written as: [tex]C=\pi d=2\pi r[/tex], where either equivalence works and d = diameter and r = radius.
1. We know that d = 7.5, so we just plug this into the equation:
[tex]C=\pi *7.5=3.14*7.5=23.55[/tex]
Thus, the circumference is 23.55 inches.
2. We know here that r = 16.3, so we can plug this into the other equivalence:
[tex]C=2*\pi *16.3=2*3.14*16.3=102.364[/tex] ≈ [tex]102.36[/tex]
Thus, the circumference is 102.36 millimeters.
Hope this helps!
Answer:
1. 23.55 inches
2. 102.36 millimeters
Step-by-step explanation:
1. Circumference = pi × d
3.14 × 7.5
= 23.55 in
2. Circumference = 2pi × r
2 × 3.15 × 16.3 = 102.364 mm
Can someone pls help me
Answer:
behaviour
Step-by-step explanation:
1 4/9 + 2 6/9 is equal to 4 1/9, true or false?
Answer: True
Explanation: To add mixed numbers, first add the fractions.
So here, we have 4/9 + 6/9 which is 10/9.
Then add the whole numbers.
So we have 1 + 2 which is 3.
So our answer is 3 and 10/9.
But notice, that since 10/9 is an improper fraction,
our answer is not in lowest terms.
10/9 can be rewritten as the mixed number 1 and 1/9.
So 3 and 10/9 is the same as 3 + 1 and 1/9 which is 4 and 1/9.
Since 4 and 1/9 is in lowest terms, this is our final answer.
So we can say that 1 and 4/9 + 2 and 6/9 is 4 and 1/9.
A teacher allows her students to decide whether to use the mean, median, or mode to determine their test averages. One student determined that he will receive the highest average if he uses the mean. Which test scores are his?
A. 95, 82, 76, 95, 96B. 79, 80, 91, 83, 80C. 65, 84, 75, 74, 65D. 100, 87, 94, 94, 81
Final answer:
Option D, with scores of 100, 87, 94, 94, and 81, yields the highest average when calculated using the mean, making it the best choice for the student seeking the highest test average.
Explanation:
The question asks which set of test scores will give the highest average if calculated using the mean. To find the answer, we calculate the mean of each set of scores:
A: (95+82+76+95+96)/5 = 88.8
B: (79+80+91+83+80)/5 = 82.6
C: (65+84+75+74+65)/5 = 72.6
D: (100+87+94+94+81)/5 = 91.2
Among the options, option D has the highest mean.
Therefore, the student with test scores of 100, 87, 94, 94, and 81 will have the highest average when using the mean to calculate.
True or false: y=x3−4 is a linear equation. A true B false
false because it is formed wrong
Final answer:
The equation y = x^3 - 4 is not a linear equation because it contains a cubic term (x^3), which means the graph is a curve, not a straight line. Therefore, the correct answer is false.
Explanation:
The equation y = x3 − 4 is not a linear equation. A linear equation is one in which every term is either a constant or the product of a constant and the first power of a variable. In the given equation, the term x3 indicates that it is a cubic term because the value of x is raised to the power of three, suggesting that the graph of this equation would be a curve, not a straight line. Therefore, the correct answer is false.
Linear equations have the general form y = mx + b, where 'm' is the slope and 'b' is the y-intercept. Examples of linear equations include y = −3x, y = 0.2 + 0.74x, and y = −9.4 − 2x, which can all be graphed as straight lines. In contrast, an equation like y = x3 − 4 does not fit this form and therefore is not considered linear.
From an airplane at an altitude of 1400 meters, the angle of depression to a rock on the ground measures 31°. Find the direct line distance from the plane to the rock. Round to the nearest tenth of a meter.
Answer:
1633.3 meters
Step-by-step explanation:
-Given the angle of depression is 31°, and the plane's height above the ground is 1400m.
-We use the Law of Sines to determine the distance between the plane and the rock.
-The angle of elevation from the rock to the plane is(corresponds to the plane's altitude):
[tex]\angle elevation=90-31\\=51\textdegree[/tex]
#Now, using Sine Law;
[tex]\frac{a}{Sin \A}=\frac{b}{Sin \ B}\\\\\\\frac{1400}{Sin \ 59}=\frac{d}{Sin \ 90}\\\\\\\\=1633.287\approx 1633.3\ m[/tex]
Hence, the direct distance between the plane and the rock is 1633.3 meters
What is the value of cosθ given that (−2, −3) is a point on the terminal side of θ ?
Answer:
-0.555
Step-by-step explanation:
The terminal point of the vector in this problem is
(-2,-3)
So, it is in the 3rd quadrant.
We want to find the angle [tex]\theta[/tex] that gives the direction of this vector.
We can write the components of the vector along the x- and y- direction as:
[tex]v_x = -2\\v_y = -3[/tex]
The tangent of the angle will be equal to the ratio between the y-component and the x-component, so:
[tex]tan \theta = \frac{v_y}{v_x}=\frac{-3}{-2}=1.5\\\theta=tan^{-1}(1.5)=56.3^{\circ}[/tex]
However, since we are in the 3rd quadrant, the actual angle is:
[tex]\theta=180^{\circ} + 56.3^{\circ} = 236.3^{\circ}[/tex]
So now we can find the cosine of the angle, which will be negative:
[tex]cos \theta = cos(236.3^{\circ})=-0.555[/tex]
Which three statements are true as they relate to supply and demand? As supply rises, prices generally decrease. As demand decreases, costs generally increase. As supply decreases, prices increase. The average rate of change describes how much a quantity changes as price increases. As demand rises, the price of the product decreases.
As supply rises, prices decrease.
And The average rate of change describes how much a quantity changes as prices increases
As supply decreases, prices increase. It seems logical but I'm not 100% positive on the last one. I know the first 2 are right.
The statements that are true as they relate to supply and demand are: as supply rises, prices generally decrease; as demand decreases, prices generally increase; as supply decreases, prices increase.
Explanation:Supply and demand are fundamental concepts in economics. The law of supply states that as supply increases, prices generally decrease. This is because when there is a higher quantity supplied, producers compete to sell their products, leading to lower prices. On the other hand, the law of demand states that as demand decreases, prices generally decrease. When there is lower demand for a product, sellers may lower prices to attract more buyers.
Additionally, the statement that as supply decreases, prices increase is also true. When the quantity supplied decreases, the scarcity of the product can drive up prices as buyers are willing to pay more for limited supply. The average rate of change refers to how much a quantity changes as the price increases. It is not directly related to supply and demand dynamics, but rather focuses on the relationship between quantity and price. As demand rises, the price of a product generally increases. This is because as more people want to buy a product, sellers can charge higher prices since there is higher demand.
Suppose you drop a ball from a height of 10 feet. After the ball hits the floor, it rebounds to a height defined by the recursive formula an = 0.85an – 1. What is a1?
Answer:
10 feet
Step-by-step explanation:
The height of the ball after it hits the floor and rebound is defined by the recursive formula:
[tex]a_n = 0.85a_{n-1}[/tex]
This is an example of a geometric sequence in which the next term is gotten by multiplication of the previous term by 0.85.
If the ball is dropped from a height of 10 feet, the first term is 10.
Its Initial height, [tex]a_1=10 \:feet[/tex]
△BCD is a right triangle. The length of the hypotenuse is 18 centimeters. The length of one of the legs is 14 centimeters. What is the length of the other leg?
Answer:
The answer to your question is b = 11.31 cm or 8[tex]\sqrt{2}[/tex] cm
Step-by-step explanation:
Data
hypotenuse = 18 cm
one leg = 14 cm
second leg = ?
Process
1.- Use the Pythagorean Theorem to solve this problem
c² = a² + b²
c = hypotenuse
a = longer leg
b= shorter leg
2.- Substitution
18² = 14² + b²
-Solve for b
b² = 18² - 14²
-Simplify
b² = 324 - 196
b² = 128
-Find the prime factors of 128
128 2
64 2
32 2
16 2
8 2
4 2
2 2
1
128 = 2⁶2¹
-Result
b = 11.31 or 8[tex]\sqrt{2}[/tex]
Answer:
21.32 Cm
Step-by-step explanation:
Add up the centiminer
Takumi started studying how the number of branches on his tree changes over time.
The relationship between the elapsed time, t, in years, since Takumi started studying his tree, and the total
number of its branches, N(t), is modeled by the following function:
N(t) = 63. 2
Complete the following sentence about the yearly rate of change in the number of branches.
Every year, the number of branches
grows/shrinks
by a factor of
Answer:
Grows, Factor of 2
Step-by-step explanation:
The relationship between the elapsed time, t, in years, since Takumi started studying his tree, and the total number of its branches, N(t), is modeled by the function:
[tex]N(t) = 63. 2^t[/tex]
For illustration, let us take the growth for the first three years after he started studying the number of branches.
[tex]When \:t=1, N(1) = 63. 2^1=126\\When \:t=2, N(2) = 63. 2^2=252\\When \:t=3, N(3) = 63. 2^3=504\\504\div 252=252\div 126=2[/tex]
We notice that for each subsequent year, the number of branches doubles.
Therefore:
Every year, the number of branches grows by a factor of 2.
PLEASE HELP ITS URGENT
Tickets to the school dance cost $3.00 in advance or $5.00 at the
door. There were a total of 184 tickets sold, raising $688. How many tickets
were sold at the door?
Answer:
68 tickets
Step-by-step explanation:
This is a problem that involves a system of equations, the first step is to define your variables and write equations to represent the situation.
x = number of advance tickets
y = number of door tickets
x + y = 184
3x + 5y = 688
Next, you need to solve for one variable, based on how these equations are written, the best method would be to solve by multiplication.
-3(x + y = 184) (multiply equation by -3)
-3x - 3y = -552
Now we need to combine the two equations together
3x + 5y = 688
-3x - 3y = -552
From here we can eliminate the x variable when subtracting the equations, this results in:
2 y = 136
y = 68
Therefore, 68 tickets were sold at the door.
can someone please help !!!
Answer:
s=-8
Step-by-step explanation:
Find: P (Red and Small)
Answer:
3/10
Step-by-step explanation:
Please help me now please
Answer:
0.4444444
Step-by-step explanation:
2/3 x 2/3 = 0.4444 repeating!
Hope this helps!
To factor a trinomial you must find the product of "a" and "b" and find the sum of "c"
True
False
Answer:
true
Step-by-step explanation:
Ortega is trying to fill three bags equally with sand. He wants the bags to weigh the same. If the bags currently weigh 55 pounds, 51 pounds, and 48 pounds. Can Ortega get each bag to weigh the same by moving the weight around?
Answer:
yes
Step-by-step explanation:
The average weight of the three bags is ...
(55 +51 +48)/3 = 154/3 = 51 1/3 . . . pounds
By removing 3 2/3 pounds of sand from the heaviest bag, adding 1/3 pound to the middle-weight bag, and the remaining 3 1/3 pounds to the lightest bag, Ortega can make all of the bags weigh the same: 51 1/3 pounds.
Help me! 17 points to help me
Answer:
this is to much work for me to do.
Step-by-step explanation:
It took a skydiver 5 seconds to drop 400 feet. What is the
rate (in feet per/second) of the skydiver's drop?
80 feet per second
Step-by-step explanation:
just divide the amount he fell by the amount of time it took so you would take 400/5 and get the answer
Answer:
80
Step-by-step explanation:
If it took him 5 seconds to drop 400 feet then you have to divide it by 5 to determine the rate he can drop a certain amount of feet per second.
How many different combinations of 3 books can Erika take on a trip if she has 5 books
Answer:
10 combinations
Step-by-step explanation:
What we have to do is calculate the number of combinations of 3 in 5.
The formula for the combinations is:
nCr = n!/r!(n-r)!
in this case n = 5 and r = 3
replacing
5C3 = 5!/3!(5-3)! = 5!/(3!*2!)
5C3 = 10
So there are 10 combinations in which Erika can enjoy the books on her trip
Answer:
The number of different combinations of 3 books that Erika can take on a trip if she has 5 books is 10
Step-by-step explanation:
Here we have the formula for combination given as follows;
[tex]\binom{n}{r} = \frac{n!}{r!(n-r)!}[/tex]
Where n is the number of set elements = 5 and
r = Number of subset elements = 3
Therefore, plugging the values, we have;
[tex]\binom{5}{3} = \frac{5!}{3!(5-3)!} = \frac{120}{6(2)} = 10[/tex]
Therefore, the number of different combinations of 3 books that Erika can take on a trip if she has 5 books = 10.
In a computer catalog, a computer monitor is listed as being 27 inches. This distance is
the diagonal distance across the screen. If the screen measures 15 inches in height, what
is the actual width of the screen to the nearest inch?
The width of the computer monitor is 22 inches
What is a Rectangle?
In a Rectangle
It is a four sided shape where every angle is a right angleThe alternative sides are equalTwo axes of symmetry bisect each otherDiagonals are equal in lengthThe diagonal equals the square root of the width squared plus the height squared
Given data ,
Let the Width of the rectangle be W
Diagonal of the rectangle = 27 inches
Height of the rectangle = 15 inches
D² = L² + W²
W² = D² - L²
W² = ( 27 )² - ( 15 )²
= 729 - 225
= 504
Therefore , Width W = √504
≈ 22.45 inches
≈ 22 inches
Hence , the width of the computer monitor is 22 inches
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