Answer:
To make 18 oz of furniture polish, 4.5 oz of vinegar and 13.5 oz of olive oil are needed.
Step-by-step explanation:
The ratio of ingredients is ...
oil : vinegar = 3 : 1
So vinegar is 1 of the 3+1 = 4 parts of the polish mix. The amount of vinegar required for 18 oz of polish is ...
(1/4)×(18 oz) = 4.5 oz
The remaining quantity is olive oil:
18 oz - 4.5 oz = 13.5 oz
To make 18oz of furniture polish, 4.5 oz of vinegar and 13.5 oz of olive oil are needed. These quantities are found by setting up an equation based on the problem's conditions and solving for x.
Explanation:To begin solving the problem we need to understand that both the vinegar and the olive oil are together making up the 18oz of furniture polish. Since the amount of olive oil is three times the amount of vinegar, we can denote the quantity of vinegar as 'x'. Thus, the quantity of olive oil will be '3x'.
Adding these together gives us the total ounces, thus, we have our equation: x + 3x = 18. Solving this, we get 4x = 18. Dividing by 4 gives us x = 18/4 = 4.5.
Therefore, to make 18oz of furniture polish, you will need 4.5 oz of vinegar and 13.5 oz (3 times 4.5) of olive oil.
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Which of the following is the rule for rotating the point with coordinates (x,y), 180° counterclockwise about the origin?
A. (x,y) → (y,x)
B. (x,y) → (y,-x)
C. (x,y) → (-y,-x)
D. (x,y) → (-x,-y)
Answer:
D. (x, y) → (-x, -y)
Step-by-step explanation:
A. (x,y) → (y,x) . . . . reflects across the line y=x
B. (x,y) → (y,-x) . . . . rotates 90° CCW
C. (x,y) → (-y,-x) . . . . reflects across the line y=-x
D. (x,y) → (-x,-y) . . . . rotates 180° about the origin
Answer:
The correct option is D.
Step-by-step explanation:
If a point rotating 180° counterclockwise about the origin, then the sign of each coordinate is changed.
Consider the coordinates of a point are (x,y).
If a (x,y) rotating 180° counterclockwise about the origin, then the rule of rotation is defined as
[tex](x,y)\rightarrow (-x,-y)[/tex]
In which (x,y) is the coordinate pair of preimage and (-x,-y) is the coordinate pair of image.
Therefore the correct option is D.
If a point reflects across the line y=x , then
[tex](x,y)\rightarrow (y,x)[/tex]
If a point rotated 90° clockwise, then
[tex](x,y)\rightarrow (y,-x)[/tex]
If a point reflects across the line y=-x, then
[tex](x,y)\rightarrow (-y,-x)[/tex]
A certain car travels at a constant speed of 40 miles per hour. At this speed, the car can travel a distance of 25 miles for each gallon of fuel used. How many gallon sof fuel ar used when the car travels at this speed for 75 mins?
Answer:
2 gallons
Step-by-step explanation:
At this speed, the car uses 1 gallon of fuel for a distance of 25 miles.
We need the number of miles the car travels in 75 minutes to find the amount of fuel it uses.
75 minutes * (1 hour)/(60 minutes) = 1.25 hours
speed = distance/time
distance = speed * time
distance = 40 miles/hour * 1.25 hours = 50 miles
In 75 minutes, at 40 mph, the car travels 50 miles.
(1 gal)/(25 miles) = x/(50 miles)
x = 2 gal
Answer: 2 gallons
The car will use 2 gallons of fuel when traveling at a constant speed of 40 miles per hour for 75 minutes.
Explanation:To find the number of gallons of fuel used when the car travels at a constant speed of 40 miles per hour for 75 minutes, we can use the formula:
Gallons of fuel used = (Distance traveled in miles) / (Miles per gallon)
Since the car travels at a constant speed of 40 miles per hour, it covers a distance of 40 miles in 1 hour. Therefore, in 75 minutes it will travel 40 miles * (75 minutes / 60 minutes per hour) = 50 miles.
Now, we can calculate the number of gallons of fuel used: Gallons of fuel used = 50 miles / 25 miles per gallon = 2 gallons.
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The clubhouse has a water tank from which hikers fill their water jugs before walking the trail. The tank is a 5-gallon cylindrical container with a height of 2 feet and a radius of 4 inches. Alex fills his 1-gallon jug from the clubhouse tank before going on a hike. If the 5-gallon tank was full, what was the height of the water in the tank after Alex filled the 1-gallon jug?(A) 1.6 inches(B) 4.8 inches(C) 19.2 inches(D) 964.6 inches
Answer: 19.2 inches would be the most reasonable answer, since the first two is too small, and the last answer would be too tall.
if there was 2 feet of water, it would be 24 inches full. taking 1 gallon out, wouldn't make the difference to make it go up or down much.
Answer:
c) 19.2 inches
Step-by-step explanation:
Height of water when full = 2 feet = 24 inches
Radius of cylinder = 4 inches
Volume of tank = 5 gallon
Gallon per inch height of tank = [tex]\frac{5}{24}[/tex]
Inch per gallon of height = [tex]\frac{24}{5}[/tex]
So, when 1 gallon is removed
[tex]24-1\times \frac{24}{5}=\frac{96}{5}=19.2\ inches[/tex]
∴ Height of the water in the tank after Alex filled the 1 gallon jug is 19.2 inches.
orVolume of cylinder after 1 gallon was removed
[tex]\pi r^2h=4\times 231\\\Rightarrow h=\frac{4\times 231}{\pi 4^2}\\\Rightarrow h=18.38\ inches[/tex]
∴Height of the water in the tank after Alex filled the 1 gallon jug is 18.38 inches
The different height arises due to the thickness of the rank which is not given.
The first method is more accurate
Scott poured a cup of hot coffee and let it cool. The temperature of the coffee after x minutes is given by the function f(x). The temperature is measured in degrees Fahrenheit. What does f(10)=120 tell you?
Answer:
Step-by-step explanation:
f(10) = 120 tells you that after x = 10 minutes, the coffee is 120 degrees
The statement f(10)=120 indicates that after 10 minutes, the coffee's temperature is 120 degrees Fahrenheit.
When we see an equation such as f(10)=120, it tells us that after 10 minutes, the temperature of the coffee has cooled down to 120 degrees Fahrenheit. The function f(x) describes the temperature of the coffee after x minutes, so the specific point f(10)=120 provides us with a snapshot of the temperature at that particular time.
Which equation represents a circle with the same radius as the circle shown but with a center (-1, 1)
Answer:
Option 4: (x+1)^2+(y-1)^2 = 16
Step-by-step explanation:
The radius of the given circle in attached picture is: 4 units
The center is denoted by (h,k) = (-1,1)
So,
The standard form of equation with center at (h,k) and radius r
(x-h)^2 + (y-k)^2 = r^2
Putting the values
(x-(-1))^2 + (y-1)^2 = 4^2
(x+1)^2+(y-1)^2 = 16
Hence option number 4 is correct ..
HELP ASAP Translate 6(4j+5+4j) in to a verbal expression w step by step. WILL MARK BRAINLIEST
In a set of five consecutive integers, the smallest integer is more than $\frac23$ the largest. What is the smallest possible value of the sum of the five integers?
Answer:
55
Step-by-step explanation:
Let x represent the middle integer. Then the smallest is x-2 and the largest is x+2. Your requirement is that ...
(x-2)/(x+2) > 2/3
3x -6 > 2x +4 . . . . cross multiply
x > 10 . . . . . . . . . . .add 6-2x
The smallest integer satisfying this requirement is x=11. The sum of the 5 integers is 5x = 55.
The smallest sum is 55.
Answer:
55
Step-by-step explanation:
Tom crossed the finish line 3.8 seconds after Steve. Steve finished the race in 45.1 seconds. If t represents Tom's race time, which of the following equations is true?
A. 45.1 – t = 3.8
B. 45.1 + t = 3.8
C. t – 3.8 = 45.1
D. t + 3.8 = 45.1
Answer:
C. t – 3.8 = 45.1
Step-by-step explanation:
Steve's time = 45.1 seconds
Tom finished 3.8 seconds later
So add 3.8 to steve's time to find tom's time (t)
t =s+3.8
t = 45.1 + 3.8
Subtract 3.8 from each side
t -3.8 =45.1 +3.8-3.8
t -3.8 = 45.1
Answer:
Its C.
Step-by-step explanation:
You better give the guy above me brainliest. I got the answer from the king above me
A large aquarium contains only two kinds of fish, guppies and swordtails. If 3/4 of the number of guppies is equal to 2/3 of the number of swordtails, then what fraction of fish in this aquarium are guppies?
Answer:
[tex]\frac{8}{17}[/tex] of fish in this aquarium are guppies.
Step-by-step explanation:
Let x be the number of guppies and y be the number of swordtails in the aquarium,
According to the question,
[tex]\frac{3}{4}\text{ of } x=\frac{2}{3}\text{ of }y[/tex]
[tex]\frac{3x}{4}=\frac{2y}{3}[/tex]
By cross multiplication,
[tex]9x=8y[/tex]
[tex]\implies \frac{x}{y}=\frac{8}{9}[/tex]
Thus, the ratio of guppies and swordtail fishes is 8 : 9
Let guppies = 8x, swordtail = 9x
Where, x is any number,
Since, the aquarium contains only two kinds of fish, guppies and swordtails,
So, the total fishes = 8x + 9x = 17x
Hence, the fraction of fish in the aquarium are guppies = [tex]\frac{\text{Guppies}}{\text{Total fishes}}[/tex]
[tex]=\frac{8x}{17x}[/tex]
[tex]=\frac{8}{17}[/tex]
To find what fraction of fish in the aquarium are guppies, you express the given relationship between the number of guppies and swordtails algebraically and solve for the number of guppies relative to the total number of fish, concluding that 8/17 of the fish in the aquarium are guppies.
If 3/4 of the number of guppies is equal to 2/3 of the number of swordtails, we can express this relationship using variables. Let G represent the number of guppies and S represent the number of swordtails in the aquarium. The given relationship can be written as (3/4)G = (2/3)S.
To find the fraction of fish that are guppies, we need to express G in terms of S first. By manipulating the equation, we multiply both sides by (4/3) to get G = (4/3)*(2/3)S = (8/9)S. This equation shows that the number of guppies is (8/9) times the number of swordtails.
Now, to find the total number of fish (T), we add the number of guppies and swordtails: T = G + S. Substituting the value of G from the equation above, we get T = (8/9)S + S = (17/9)S. The fraction of the total that are guppies is then G/T = [(8/9)S]/[(17/9)S] which simplifies to 8/17. Therefore, 8/17 of the fish in the aquarium are guppies.
Solve for x: 4(x + 2) = 3(x − 2)
A) −2
B)−4
C) −10
D) −14
4(x+2)=3(x-2)
Multiply the first bracket by 4
Multiply the second bracket by 3
4x+8=3x-6
Move 3x to the left hand side, whenever moving a number with a letter the sign changes ( positive 3x to negative 3x)
4x-3x+8=3x-3x-6
x+8=-6
Move positive 8 to the right hand side
x+8-8=-6-8
x=-14
Check answer by using substitution method
Use x=-14 into both of the equations
4(-14+2)=3(-14-2)
-56+8=-42-6
-48=-48
Answer is -14- D)
The algebraic equation 4(x + 2) = 3(x − 2) is solved by distribution, combining like terms, and isolating the variable x, which results in x = -14.
Explanation:This is a simple algebraic equation problem. We solve 4(x + 2) = 3(x − 2) by following these steps:
Distribute 4 on the left through both terms inside the parentheses to obtain 4x + 8. Do the same with 3 on the right side to get 3x - 6. Subtract 3x from both sides to get x + 8 = -6. Then subtract 8 from both sides of the equation to isolate x, which equals -14.
So, x = -14 is the solution.
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do these measurements create a triangle? true or false?
Answer:
Question 9: False
Question 10: False
Step-by-step explanation:
The third side is always greater than the other two sides.
Question 9
a = 6, b = 6, c = 5
Since the third side is the smallest, it would not create a triangle.
Question 10
a = 7, b = 2, c = 5
Since the third side is the smallest, it would not create a triangle.
Answer:
Question 9: True
Question 10: False
Step-by-step explanation:
The Triangle Inequality Theorem states that the sum of any two sides of a triangle must be greater than the last side.
To test if the three lengths create a triangle you would have to test the three combinations if the two numbers are greater than the last number.
Question 9:The three lengths 6, 6, 5 create a triangle.
First check the first two numbers.
6 + 6 = 1212 > 5, so this is valid.Next check the first and last number.
6 + 5 = 1111 > 6, this is also valid.Last check the second and last number.
6 + 5 = 1111 > 6, all three combinations are valid for creating a triangle.The answer for question 9 is TRUE.
Question 10:The three lengths 7, 2, 5 create a triangle.
Check the first two numbers.
7 + 2 = 99 > 5, this is valid.Check the first and last number.
7 + 5 = 1212 > 2, this is also valid.Finally, check the second and last number.
2 + 5 = 77 = 7, this is NOT valid because it MUST be greater than. Therefore these three lengths are not able to create a triangle.The answer for question 10 is FALSE.
The tree diagrams below show the sample space of choosing a cushion cover or a bedspread in silk or in cotton in red, orange, or green. Write the number of possible outcomes.
6
4
10
12
Answer:
Option D (12).
Step-by-step explanation:
The law of outcomes states that if there are m ways to do Event 1 and n ways to do Event 2, then if both Event 1 and Event 2 are combined, then the possible outcomes will be m*n. Similarly, in this case, there are 2 types of products, 2 types of materials, and 3 types of colours. So according to the law of outcomes, simply multiply the numbers to gain the total possible outcomes:
Possible outcomes = 2 * 2 * 3 = 4 * 3 = 12.
So Option D is the correct answer!!!
Answer:
12 is correct.
Step-by-step explanation:
A triangular field has sides of 218.5 m and 224.5 m, and the angle between them measures 58.20 . Find the area of the field.
Answer:
20,845 square meters
Step-by-step explanation:
We can use the formula for area of a triangle to figure this out easily.
Area = [tex]\frac{1}{2}abSinC[/tex]
Where
a and b are the two side lengths of the triangle given, and
C is the ANGLE BETWEEN the two sides
Clearly, we see that one side is 218.5 and other is 224.5 and the angle between them is given by 58.2 degrees. Now we simply substitute these values into the formula and get the area:
[tex]A=\frac{1}{2}abSinC\\A=\frac{1}{2}(218.5)(224.5)Sin(58.2)\\A=20,844.99[/tex]
Rounding, we get the area to be 20,845 square meters
Answer:
20,845 m2
Step-by-step explanation:
I got it correct on founders edtell
Given the two Fibonacci numbers below, which number would follow?
F(22) = 17,711 and F(23) = 28,657
A. 1.618
B. 46,368
C. 0.618
D. 10,946
I have been stuck on this for roughly 20 minutes now, Any help would be nice...
Answer:
B. 46,368
Step-by-step explanation:
Each Fibonacci number is the sum of the previous two. The next one is the sum of the two that are given.
F(24) = F(22) +F(23) = 17,711 +28,657 = 46,368
Use the Polynomial Identity below to help you create a list of 10 Pythagorean Triples:
(x²+y²)² = (x²-y²)² + (2xy)²
Hint #1: c² = a² + b²
Hint #2: pick 2 positive integers x and y, where x > y
Answer:
(3,4,5)
(6,8,10)
(5,12,13)
(8,15,17)
(12,16,20)
(7,24,25)
(10,24,26)
(20,21,29)
(16,30,34)
(9,40,41)
Just choose 2 numbers from {1,2,3,4,5,6,7,8,...} and make sure the one you input for x is larger.
Post the three in the comments and I will check them for you.
Step-by-step explanation:
We need to choose 2 positive integers for x and y where x>y.
Positive integers are {1,2,3,4,5,6,7,.....}.
I'm going to start with (x,y)=(2,1).
x=2 and y=1.
[tex](2^2+1^2)^2=(2^2-1^2)^2+(2\cdot2\cdot1)^2[/tex]
[tex](4+1)^2=(4-1)^2+(4)^2[/tex]
[tex](5)^2=(3)^2+(4)^2[/tex]
So one Pythagorean Triple is (3,4,5).
I'm going to choose (x,y)=(3,1).
x=3 and y=1.
[tex](3^2+1^2)^2=(3^2-1^2)^2+(2\cdot3\cdot1)^2[/tex]
[tex](9+1)^2=(9-1)^2+(6)^2[/tex]
[tex](10)^2=(8)^2+(6)^2[/tex]
So another Pythagorean Triple is (6,8,10).
I'm going to choose (x,y)=(3,2).
x=3 and y=2.
[tex](3^2+2^2)^2=(3^2-2^2)^2+(2\cdot3\cdot2)^2[/tex]
[tex](9+4)^2=(9-4)^2+(12)^2[/tex]
[tex](13)^2=(5)^2+(12)^2[/tex]
So another is (5,12,13).
I'm going to choose (x,y)=(4,1).
[tex](4^2+1^2)^2=(4^2-1^2)^2+(2\cdot4\cdot1)^2[/tex]
[tex](16+1)^2=(16-1)^2+(8)^2[/tex]
[tex](17)^2=(15)^2+(8)^2[/tex]
Another is (8,15,17).
I'm going to choose (x,y)=(4,2).
[tex](4^2+2^2)^2=(4^2-2^2)^2+(2\cdot4\cdot2)^2[/tex]
[tex](16+4)^2=(16-4)^2+(16)^2[/tex]
[tex](20)^2=(12)^2+(16)^2[/tex]
We have another which is (12,16,20).
I'm going to choose (x,y)=(4,3).
[tex](4^2+3^2)^2=(4^2-3^2)^2+(2\cdot4\cdot3)^2[/tex]
[tex](16+9)^2=(16-9)^2+(24)^2[/tex]
[tex](25)^2=(7)^2+(24)^2[/tex]
We have another is (7,24,25).
You are just choosing numbers from the positive integer set {1,2,3,4,... } and making sure the number you plug in for x is higher than the number for y.
I will do one more.
Let's choose (x,y)=(5,1).
[tex](5^2+1^2)^2=(5^2-1^2)^2+(2\cdot5\cdot1)^2[/tex]
[tex](25+1)^2=(25-1)^2+(10)^2[/tex]
[tex](26)^2=(24)^2+(10)^2[/tex]
So (10,24,26) is another.
Let (x,y)=(5,2).
[tex](5^2+2^2)^2=(5^2-2^2)^2+(2\cdot5\cdot2)^2[/tex]
[tex](25+4)^2=(25-4)^2+(20)^2[/tex]
[tex](29)^2=(21)^2+(20)^2[/tex]
So another Pythagorean Triple is (20,21,29).
Choose (x,y)=(5,3).
[tex](5^2+3^2)^2=(5^2-3^2)^2+(2\cdot5\cdot3)^2[/tex]
[tex](25+9)^2=(25-9)^2+(30)^2[/tex]
[tex](34)^2=(16)^2+(30)^2[/tex]
Another Pythagorean Triple is (16,30,34).
Let (x,y)=(5,4)
[tex](5^2+4^2)^2=(5^2-4^2)^2+(2\cdot5\cdot4)^2[/tex]
[tex](25+16)^2=(25-16)^2+(40)^2[/tex]
[tex](41)^2=(9)^2+(40)^2[/tex]
Another is (9,40,41).
Simplify the expression 2(x + 7)(x2 – 3x – 6).
Answer:
2x^3+8x^2-54x-84
Step-by-step explanation:
Answer:
2(x + 7)(x² - 3x - 6) = 2x³ + 8x² - 54x - 84
Step-by-step explanation:
Simplification is a method used to reduce the complexity or the component parts of an algebraic equation which makes it simpler and easier to understand.
The given equation is: 2(x + 7)(x² - 3x - 6).
Simplifying the given algebraic equation:
⇒ 2 (x + 7) (x² - 3x - 6)
⇒ (2x + 14) (x² - 3x - 6)
⇒ 2x³ + 14x² - 6x² - 42x - 12x - 84
⇒ 2x³ + 8x² - 54x - 84
x^2=6x/(5-x)
What is the sum of the roots of the above equation?
Answer:
x = 3 or x = 2 or x = 0 thus: 5
Step-by-step explanation:
Solve for x over the real numbers:
x^2 = (6 x)/(5 - x)
Cross multiply:
x^2 (5 - x) = 6 x
Expand out terms of the left hand side:
5 x^2 - x^3 = 6 x
Subtract 6 x from both sides:
-x^3 + 5 x^2 - 6 x = 0
The left hand side factors into a product with four terms:
-x (x - 3) (x - 2) = 0
Multiply both sides by -1:
x (x - 3) (x - 2) = 0
Split into three equations:
x - 3 = 0 or x - 2 = 0 or x = 0
Add 3 to both sides:
x = 3 or x - 2 = 0 or x = 0
Add 2 to both sides:
Answer: x = 3 or x = 2 or x = 0
B= [2 8] A= [3 0]
6 3 2 -1
What is the BA
Answer:
[tex]\text{C.}\quad\left[\begin{array}{cc}22&-8\\7.8&-3\end{array}\right][/tex]
Step-by-step explanation:
It is convenient to let a spreadsheet or calculator do the tedious sum of products. Term C22 will be B21·A12 +B22·A22 = 0.6·0 +3·(-1) = -3, for example. Other terms are similarly computed. In general Crc will be the sum of Brx·Axc, where x = 1 or 2.
[tex]BA=\begin{bmatrix}2 & 8 \\0.6 & 3\end{bmatrix}\cdot \begin{bmatrix}3 & 0 \\2 & -1\end{bmatrix}\\BA=\begin{bmatrix}2\cdot3+8\cdot2 & 2\cdot0+8\cdot(-1) \\0.6\cdot3+3\cdot2 & 0.6\cdot 0+3\cdot(-1)\end{bmatrix}\\BA=\begin{bmatrix}22 & -8 \\7.8 & -3\end{bmatrix}[/tex]
What is the missing step in solving the inequality 5 – 8x < 2x + 3? Add 2x to both sides of the inequality. Subtract 8x from both sides of the inequality. Subtract 2x from both sides of the inequality. Add 8x to both sides of the inequality.
Answer:
⇒ Add 8x to both sides of the inequality
⇒ x>1/5
Step-by-step explanation:
First, you subtract by 5 from both sides of equation.
5-8x-5<2x+3-5
Solve.
-8x<2x-2
Then subtract by 2x from both sides of equation.
-8x-2x<2x-2-2x
Solve.
-10x<-2
Multiply by -1 from both sides of equation.
(-10x)(-1)>(-2)(-1)
Solve.
10x>2
Divide by 10 from both sides of equation.
10x/10>2/10
Solve to find the answer.
2/10=10/2=5 2/2=1=1/5
x>1/5 is final answer.
Hope this helps!
Answer: Add 8x to both sides of the inequality
D) on e d g e n u i t y
A curve passes through the point (0, 5) and has the property that the slope of the curve at every point P is twice the y-coordinate of P. What is the equation of the curve? (Use x as the independent variable.
Answer:
[tex]y=5e^{2x}[/tex]
Step-by-step explanation:
Let (x,y) represents a point P on the curve,
So, the slope of the curve at point P = [tex]\frac{dy}{dx}[/tex]
According to the question,
[tex]\frac{dy}{dx}=2y[/tex]
[tex]\frac{1}{y}dy=2dx[/tex]
Integrating both sides,
[tex]\int \frac{dy}{y}=2dx[/tex]
[tex]ln y=2x+ln C[/tex]
[tex]ln y-ln C = 2x[/tex]
[tex]ln(\frac{y}{C})=2x[/tex]
[tex]\frac{y}{C}=e^{2x}[/tex]
[tex]\implies y=Ce^{2x}[/tex]
Since, the curve is passing through the point (0, 5),
[tex]5=Ce^{0}\implies C=5[/tex]
Hence, the required equation of the curve is,
[tex]y=5e^{2x}[/tex]
An equation is shown below: −2(4x − 1) − 7 = 5 Which statement shows a correct next step in solving the equation? The equation can become −2(4x − 1) = −2 by applying the distributive property. The equation can become −2(4x − 1) = 12 by applying the addition property of equality. The equation can become −2(4x − 1) = 12 by applying the commutative property of addition The equation can become −2(4x − 1) = −2 by applying the subtraction property of equality.
The first step is to add 7 to both sides, applying the addition property of equality:
[tex]-2(4x-1)-7+7=5+7 \iff -2(4x-1)=12[/tex]
Answer:
The equation can become −2(4x − 1) = 12 by applying the commutative property of addition
Step-by-step explanation:
Can someone help with this problem on literal equations to get variable A by itself? Will give lots of points
Answer:
Step-by-step explanation:
Part A
xf = xo + vo* t + 1/2 a*t^2 Subtract xo
xf - xo = 0*t + 1/2 a*t^2 multiply by 2
2(xf - xo) = at^2 divide by t^2
2(xf - xo ) / t^2 = a
Part B
Givens
xo =0
vo = 0
a = 10 m/s^2
xf = 120 m
Solution
xf = xo + vo* t + 1/2 a*t^2 Substitute the givens
120 = 0 + 0 + 1/2 * 10 * t^2 Multiply by 2
120*2 = 10* t^2
240 = 10*t^2 Divide by 10
240/10 = t^2
24 = t^2 take the square root of both sides.
√24 = √t^2
t = √24
t = √(2 * 2 * 2 * 3)
t = 2√6
Use the Distributive Property to rewrite the expression. 9(y + 4)
Answer:
Answer would be 9y+36
Step-by-step explanation:
Because if you distribute the 9 inside the parenthesis, you'd get
9*y=9y and 9*4=36
so 9y+36
Hope my answer was helpful to you!
Final answer:
The Distributive Property is used to rewrite the expression 9(y + 4) as 9y + 36 by multiplying 9 by each term inside the parentheses.
Explanation:
To use the Distributive Property to rewrite the expression 9(y + 4), we would distribute the number 9 to both y and 4 inside the parentheses. This means we multiply 9 by y and then multiply 9 by 4, combining the results with the addition operations between them.
Using the distributive property, we get:
9 times y = 9y
9 times 4 = 36
So, the expression will be rewritten as:
9y + 36
Therefore, by distributing the 9, we have turned the original expression into a sum of two terms, which are a number, variable, or a product/quotient of numbers and/or variables separated by + or - signs. In this case, the terms are 9y and 36.
Please help me with this problem.
bearing in mind that, we can always get the common ratio by simply dividing any term by the one before it, and if it's a geometric sequence, all divisions will yield the same "r" value.
Check the picture below.
From a group of 8 volunteers, including Andrew and Karen, 4 people are to be selected at random to organize a charity event. What is the probability that Andrew will be among the 4 volunteers selected and Karen will not?
Answer:
The probability that Andrew will be among the 4 volunteers selected and Karen will not is 2/7.
Step-by-step explanation:
From the given information it is clear that
The total number of volunteers, including Andrew and Karen = 8
The total number of volunteers, excluding Andrew and Karen = 8-2 = 6
We need to find the probability that Andrew will be among the 4 volunteers selected and Karen will not.
Total number of ways of selecting r volunteers from n volunteers is
[tex]^nC_r=\frac{n!}{r!(n-r)!}[/tex]
Total number of ways of selecting 4 volunteers from 8 volunteers is
[tex]\text{Total outcomes}=^8C_4=70[/tex]
Total number of ways of selecting 4 volunteers from 8 volunteers, so that Andrew will be among the 4 volunteers selected and Karen will not is
[tex]\text{Favorable outcomes}=^1C_1\times ^6C_3=1\times 20=20[/tex]
The probability that Andrew will be among the 4 volunteers selected and Karen will not is
[tex]P=\frac{\text{Favorable outcomes}}{\text{Total outcomes}}[/tex]
[tex]P=\frac{20}{70}[/tex]
[tex]P=\frac{2}{7}[/tex]
Therefore the probability that Andrew will be among the 4 volunteers selected and Karen will not is 2/7.
The probability that Andrew is selected and Karen is not from a group of 8 volunteers for a 4-person task is 2/7.
Explanation:The question is asking about the probability of a specific event happening when a group of volunteers is randomly selected. The key to solving this problem is knowing how to calculate combinations.
There are 8 volunteers in total and we know that 4 people are to be selected. The total number of ways 4 people can be selected from 8 is given by the combination formula C(n, r) = n! / (r!(n-r)!), where n is the total number of elements, r is the number of elements to choose, and ! represents the factorial operator.
So, total combinations = C(8, 4) = 8! / (4!(8-4)!) = 70.
Now, we need to find the combinations in which Andrew is chosen and Karen is not. This situation is equivalent to selecting 3 people from the remaining 6 people (excluding Andrew and Karen). Therefore, these combinations = C(6, 3) = 6! / (3!(6-3)!) = 20.
The probability that Andrew will be among the 4 volunteers selected and Karen will not is therefore 20/70 = 2/7.
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Suppose that a classroom has 8 light bulbs. The probability that each individual light bulb works is 0.8. Suppose that each light bulb works independently of the other light bulbs. What is the probability that all eight of the light bulbs work?
a.0.17
b.0.13
c.0.00001024
d.0.8
Answer:
a. 0.17
Step-by-step explanation:
Total number of light bulbs = 8
The probability that each individual light bulb works = 0.8
The working of light bulbs is independent of each other, this means one light bulb does not influence the other light bulbs.
We need to calculate the probability that all eight of the light bulbs work. Since the light bulbs work independently, the overall probability of independent events occurring together is the product of their individual probabilities. Therefore,
Probability that all eight of the light bulbs work = 0.8 x 0.8 x 0.8 x 0.8 x 0.8 x 0.8 x 0.8 x 0.8
= [tex](0.8)^{8}[/tex]
= 0.16777216
≈ 0.17
Thus, option a gives the correct probability that all eight of the light bulbs work
You can use binomial distribution, and thus, its probability function to find the needed probability.
The probability that all eight of the light bulbs work is 0.167
How to find that a given condition can be modeled by binomial distribution?Binomial distributions consists of n independent Bernoulli trials.
Bernoulli trials are those trials which end up randomly either on success (with probability p) or on failures( with probability 1- p = q (say))
Suppose we have random variable X pertaining binomial distribution with parameters n and p, then it is written as
[tex]X \sim B(n,p)[/tex]
The probability that out of n trials, there'd be x successes is given by
[tex]P(X =x) = \: ^nC_xp^x(1-p)^{n-x}[/tex]
Using the above method to find the needed probabilitySince all the light bulbs' working is independent, and each bulb's chance of working is 0.8 and there are 8 bulbs, thus,
n = 8
p = 0.8
and Let X be a random variable tracking how many out of 8 bulbs are working, then we have:
[tex]X \sim B(8, 0.8)[/tex]
Then, the needed probability is P(X = 8) (since we need to know probability that all 8 bulbs will work)
By using the probability mass function of binomial distribution, we get:
[tex]P(X =x) = \: ^nC_xp^x(1-p)^{n-x}\\P(X = 8) = \:^8C_8(0.8)^8(1-0.8)^{8-8} = 1 \times (0.8)^8 \times 1 \approx 0.167[/tex]
Thus,
The probability that all eight of the light bulbs work is 0.167
Learn more about binomial distribution here:
https://brainly.com/question/14446233
Fill in the blank.
100-10-30-10-_-30=20
Answer:
0
Step-by-step explanation:
100 - 10 = 90
90 - 30 = 60
60 - 10 = 40
40 - 10 = 30
5. To get to the library from his house, Robert biked 6 kilometers due east and then
8 kilometers due south. On the way back, he cut across a field, taking the shortest
possible route home.
How far did Robert bike on the round-trip?
Home
6 km
8 km
Library
Answer:
24 kilometers.
Step-by-step explanation:
The shortest path between two points is a straight segment that connects the two points.
Refer to the diagram attached. The 6-km segment and the 8-km segment are normal to each other. Together with the segment that joins the library and the house, the three segments now form a right triangle.
The two shorter segments are the two legs, and The longer segment that joins the library and the house is the hypotenuse.The length of the hypotenuse can be found with the Pythagorean Theorem.
[tex]\begin{aligned}\text{Hypotenuse} &= \sqrt{(\text{Leg 1})^{2} + (\text{Leg 2})^{2}}\\&= \sqrt{6^{2} + 8^{2}}\\&= \sqrt{36 + 64} \\&= \sqrt{100}\\&= \rm 10\;km\end{aligned}[/tex].
The length of the round-trip will equal to the sum of the length of the three segments: [tex]\rm 6\;km + 8\;km + 10\;km = 24\;km[/tex].
PLEASE HELP ME FIND THE LENGTH
Answer:
Length of arc AB is,
= 2πr (angle between AB) /360
=2×3.14×90/360
=1.57 cm
For this case we have that by definition, the arc length of a circle is given by:
[tex]AL = \frac {x * 2 \pi * r} {360}[/tex]
Where:
x: Represents the angle between AB. According to the figure we have that x = 90 degrees.
[tex]r = 7.9 \ cm[/tex]
So:
[tex]AL = \frac {90 * 2 \pi * 7.9} {360}\\AL = \frac {90 * 2 * 3.14 * 7.9} {360}\\AL = \frac {4465,08} {360}\\AL = 12.403[/tex]
Answer:
[tex]12.4\ cm[/tex]
Divide the following polynomial by 3.c.
27x²y – 15xy
Answer:
[tex]9x^2y-5xy[/tex]
Step-by-step explanation:
Split it up like this to make it easier to work with:
[tex]\frac{27x^2y}{3}-\frac{15xy}{3}[/tex]
Since the only thing in the denominator of those fractions is a 3, we can only divide the 27 by 3, not the x or y terms. Same thing with the second fraction. 27 divided by 3 is 9 and 15 divided by 3 is 5, so
[tex]9x^2y-5xy[/tex]
is the solution. It is not completely simplified, but that isn't what you asked for, so this should suffice as the answer.