Simplify and determine the coefficient of (-2/3x)(3y)(-2x). -4 1 4
How many solutions does this linear system have?
Solve for x. 9x = 3x -36
Find the exact circumference of a circle with the given radius. 5 inches C = 2.5 in. 10 in. 25 in.
Answer: The exact circumference of the circle is [tex]10\pi[\tex] in.
Step-by-step explanation:
Since, the circumference of a circle is,
[tex]C=2\pi r[/tex]
Where, r is the radius of the circle,
Here, r = 5 inches,
Hence, the circumference of the circle is,
[tex]C = 2\pi(5) = 10\pi\text{ in}[/tex]
Thus, The exact circumference of the circle is [tex]10\pi[\tex] in.
what is the absolute value of the complex number -4-sr2i
how many times greater is the value of the digit 2 in the 23.876 than the value of the digit 2 in 3.254?
drag and drop the correct numbers into the boxes to complete the table. amounts may be rounded to the nearest cent
1/4 of 12 bottles of water
write the following equation in standard form. x^5+2x^3+6x+1/5
The standard form is x⁵ + 2x³ + 6x + [tex]\frac{1}{5}[/tex].
To write the given equation x⁵ + 2x³ + 6x + [tex]\frac{1}{5} \\[/tex] in standard form, follow these steps:
Identify and list all terms in the polynomial: x⁵, 2x³, 6x, and [tex]\frac{1}{5}[/tex].Arrange the terms in descending order based on the exponent of x:x⁵ + 2x³ + 6x + [tex]\frac{1}{5}[/tex]Ensure all coefficients and constants are in standard form:The polynomial in standard form is: x⁵ + 2x³ + 6x + [tex]\frac{1}{5}[/tex].round to the nearest tenth 10.357
If the equation y = 15x + 2 is changed to y = 15x - 4, how will the graph of the line change?
The graph of the line change is, It will shift down 6 units.
The given function is,
y = 15x + 2
Now, We want to find how the graph of this function will change if the function is transformed to
y = 15x -4
We rewrite this function in terms of the first one to get:
y = 15x + 2 + (-6)
Hence, the function with shift down 6 units.
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Prove: the sum of four consecutive integers is never divisible by 4 g
[tex]n+n+1+n+2+n+3=4n+6[/tex]
4n is divisible by 4, but 6 is not, so the sum 4n+6 is not divisble by 4.
2.8y+6+0.2y=5y-4 what is the solution to the linear equation
If A game is played using one die. If the die is rolled and shows 2 the player wins 40. If the die shows any number other than 2 the player wins nothing
Planes Q and R are parallel. Lines a and b are shown on planes Q and R, respectively.
Which statement is true about lines a and b?
They are parallel lines.They are perpendicular lines.They are skew lines.They will intersect.(3x-3)° [6{x-10)]° what is the value of x
The actual answer to this equation is x=19 not x=1 or n=0
on a map 1 inch equals 18.4 miles. If two cities are 4.5 inches apart on the map, how far are they actually apart?
Prakrit bought a pack of paper for $5.69 and printer toner for $9.76. He paid with a $20 bill. What was his change?
An orchard has 864 orange trees. The number of rows exceeds the number of trees per row by 5 . How many trees are there in each row?
Final answer:
Using a quadratic equation, we found that there are 24 orange trees in each row of the orchard.
Explanation:
To determine how many orange trees are there in each row, we will set up an equation based on the information provided. Let's let x represent the number of trees per row. According to the problem, the number of rows is x + 5. Since the total number of trees in the orchard is 864, we can create the following equation:
x * (x + 5) = 864
To solve this quadratic equation, we need to find the value of x that satisfies the equation:
First, expand the left side of the equation: [tex]x^{2}[/tex] + 5x.
Write the equation in standard form: [tex]x^{2}[/tex] + 5x - 864 = 0.
Factor the quadratic equation: (x + 36)(x - 24) = 0.
Solve for x: x = -36 or x = 24.
Since we cannot have a negative number of trees per row, we disregard x = -36.
Therefore, there are 24 trees in each row.
What is 65 3/5 - 24 1/3
How many comparisons are required to merge these pairs of lists using algorithm 10?
a.1, 3, 5, 7, 9; 2, 4, 6, 8, 10
b.1, 2, 3, 4, 5; 6, 7, 8, 9, 10
c.1, 5, 6, 7, 8; 2, 3, 4, 9, 10?
Why would a bank charge a fee to noncustomers who use it’s ATM?
ANSWER: Charging a noncustomer helps pay for the cost of keeping the ATM running and supplied with cash. Customers of the bank already cover the ATM costs with regular fees or by allowing the bank to loan out their money.
Answer:
Bank charges fee to non customers while using ATM. ATM's frequently charge fees to users who are not account holders from that same bank whose ATM you are operating.
This fee goes towards the compensation for the costs associated with owning and operating the machine.
Same bank persons pay many types of fee yearly to their banks, so same bank ATM do not charge any fee.
When using other banks, your bank has to pay some interchange amount to that bank, this is also the reason why banks charge fee, basically they recoup the money that they will have to pay to other banks for interchange.
Question Help Find the dimensions of the open rectangular box of maximum volume that can be made from a sheet of cardboard 45 in. by 24 in. by cutting congruent squares from the corners and folding up the sides. Then find the volume.
Answer:
The dimensions are [tex]35\times 14\times 5[/tex] and the volume is 2450 inches³.
Step-by-step explanation:
Given : The open rectangular box of maximum volume that can be made from a sheet of cardboard 45 in. by 24 in. by cutting congruent squares from the corners and folding up the sides.
To find : The dimensions and the volume of the open rectangular box ?
Solution :
Let the height be 'x'.
The length of the box is '45-2x'.
The breadth of the box is '24-2x'.
The volume of the box is [tex]V=L\times B\times H[/tex]
[tex]V=(45-2x)\times (24-2x)\times x[/tex]
[tex]V(x)=4x^3-138x^2+108x[/tex]
Derivate w.r.t x,
[tex]V'(x)=4(3x^2)-138(2x)+108[/tex]
[tex]V'(x)=12x^2-276x+108[/tex]
[tex]V'(x)=12(x^2-23x+90)[/tex]
The critical point when V'(x)=0
[tex]12(x^2-23x+90)=0[/tex]
[tex]x^2-23x+90=0[/tex]
[tex](x-18)(x-5)=0[/tex]
[tex]x=18,5[/tex]
18 is not possible we reject.
So, the height is 5 inches.
Derivate again w.r.t x,
[tex]V''(x)=24x-276[/tex]
[tex]V''(5)=24(5)-276[/tex]
[tex]V''(5)=120-276[/tex]
[tex]V''(5)=-156<0[/tex]
i.e. V(x) is maximum at x=5.
The dimensions are
Height = 5 inches
Length = 45-2(5)=35 inches
Breadth = 24-2(5)=14 inches.
The maximum volume is
[tex]V=35\times 14\times 5[/tex]
[tex]V=2450[/tex]
So, The dimensions are [tex]35\times 14\times 5[/tex] and the volume is 2450 inches³.
A text message plan costs $3 per month pulse $0.32 per text. find the monthly cost for x text messages
Does anyone know a rule that work for all of these
Amira sells balloon animals. She uses the same number of balloons for each animal she makes. The table compares the number of balloon animals sold and the remaining number of balloons on a certain day.
Animals Balloons
15 200
24 164
33 128
How many balloons does Amira use for each balloon animal?
Answer:
4 balloons for each balloon animal.
Step-by-step explanation:
Amira sells balloon animals. The given table compares the number of balloon animals sold and the remaining number of balloons on a certain day.
Animals Balloons
15 200
24 164
33 128
When she sold 15 animals the leftover balloons were 200.
then she sold 24 animals the number of leftover balloons were 164.
The difference of the number of items = 24 - 15 = 9 more animals sold
The difference of the leftover balloons = 200 - 164 = 36 balloons used
Now the number of her sold animals was = 33
and the left over balloons = 128
The number of sale was increased by 24 to 33 = 33 - 24 = 9 more animals
and the leftover balloons now 164 to 128 = 164 - 128 = 36 used
Therefore, we can see each sale of 9 balloon animals she used 36 balloons.
so Amira used for each balloon animal = [tex]\frac{36}{9}[/tex]
= 4 balloons.
Amira used 4 balloons for each balloon animal.
Answer:
The most she can sell is 65
Step-by-step explanation:
"How many balloon animals at most can Amira sell?"
A painter made the table below to show the amount of paint it takes to cover a certain amount of square feet. The amount of paint varies directly with the area of each wall.
Answer:
Option A.
Step-by-step explanation:
The table made by the painter shows the amount of paint required to cover a certain amount of area of the wall.
Amount of paint is directly proportional to the area covered
In other words Amount of paint (y) ∝ Area covered (x)
y ∝ x
As we know when proportionality sign is removed, a constant known as proportionality constant is multiplied with the variable.
So y = k(x) where k is the proportionality constant
Now from the table to cover the area of 64 square feet, 4 pints of paint is required.
Now from the formula
4 = 64x
x = [tex]\frac{4}{64}=\frac{1}{16}[/tex]
Now we have to calculate the amount of paint required to cover the area of 256 square feet.
y = [tex]\frac{1}{16}\times 256[/tex]
y = 16 pints
Therefore, 16 pints of the paint will be required to cover 256 square feet.
Option A is correct.
Answer:
Just Pick 16 Pints
Step-by-step explanation:
The use of the normal probability distribution as an approximation of the sampling distribution of p̄ is based on the condition that both np and n(1 – p) equal or exceed _____.
a. .05
b. 5
c. 15
d. 30
The use of the normal distribution as an approximation for the sampling distribution of[tex]\( \bar{p} \)[/tex] requires both [tex]\( np \)[/tex] and [tex]\( n(1 - p) \)[/tex] to be at least 5. So, the answer is (b) 5.
The normal approximation for the sampling distribution of [tex]\( \bar{p} \),[/tex] the sample proportion, relies on the conditions that both[tex]\( np \)[/tex] and [tex]\( n(1 - p) \)[/tex] are greater than or equal to 5. Here, [tex]\( n \)[/tex] represents the sample size, and [tex]\( p \)[/tex] is the probability of success in a binary outcome. These conditions ensure that the distribution of[tex]\( \bar{p} \)[/tex] is approximately normal, allowing for the application of statistical techniques based on the normal distribution. When[tex]\( np \)[/tex]and [tex]\( n(1 - p) \)[/tex]are both at least 5, the central limit theorem asserts that the distribution of [tex]\( \bar{p} \)[/tex] is sufficiently close to normal, facilitating the use of standard normal tables and z-scores for making probability calculations and inferences about the population proportion. This approximation is pivotal in hypothesis testing and confidence interval construction for proportions in statistical analyses.
Find counter example to disprove the conjecture:
if the quotient of two numbers is positive, then the two numbers must be positive
The function f(x) = x2 + 5x – 6 is shifted 4 units to the left to create g(x). What is g(x)?
Answer:
g(x)=(x+4)^2+5(x+4)-6
5m-1=4m+5 what is m.
The correct answer is 6. In other words, the value of m that satisfies the solving linear equation is m = 6.
In the given equation, we are asked to find the value of m. The equation states that the quantity 5m minus 1 is equal to the quantity 4m plus 5.
To solve this equation, we can use algebraic methods. The goal is to isolate the variable m on one side of the equation.
First, we combine like terms. By subtracting 4m from both sides of the equation, we eliminate the term with m on the right side. This results in the equation m - 1 = 5.
Next, we isolate the variable m by adding 1 to both sides of the equation. This cancels out the -1 term on the left side and gives us m = 6.
Therefore, the correct answer is 6. In other words, the value of m that satisfies the solving linear equation is m = 6.
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