Answers
For 1st game, there can be either win (W), lose(L) or Tie (T).
For each of these outcome, there can be 3 possible outcomes in 2nd game i.e. either W, L or T
So, the tree diagram will have 3 branches, each further dividing into 3 more branches(nodes)
Thus option C gives the correct tree diagram.
Related Questions
help asap plz Me.Doyley can't explain it correctly
Answers
Jay stores hay in cubic stacks on his farm. If the length of each stack is 2/3 yards, what is the volume of hay in each stack? 1/3 cubic yards, 4/9 cubic yards, 1/9 cubic yards, 8/27 cubic yards
Answers
The 4th selection is appropriate.
Answer: The volume of hay in each stack is 8/27 yards
Step-by-step explanation:
Since, the volume of a cube = (side)³
Here, the side of the a cubic stack = [tex]\frac{2}{3}[/tex] yards,
Hence, the volume of a cubic stack,
[tex]V=(\frac{2}{3})^3[/tex]
[tex]=\frac{8}{27}[/tex] cube yard.
⇒ The volume of hay in each stack is 8/27 yards
Verify that the divergence theorem is true for the vector field f on the region
e. give the flux. f(x, y, z) = 4xi + xyj + 4xzk, e is the cube bounded by the planes x = 0, x = 2, y = 0, y = 2, z = 0, and z = 2.
Answers
Final answer:
To verify the divergence theorem for the given vector field and region e, we need to calculate the flux through each face of the cube and sum them up. By calculating the flux through each face and summing them, we can verify that the flux of the vector field through the region e is 0.
Explanation:
The divergence theorem states that the flux of a vector field through a closed surface is equal to the volume integral of the divergence of the vector field over the volume enclosed by the surface.
In this case, the vector field is given by f(x, y, z) = 4xi + xyj + 4xzk. The region e is a cube bounded by the planes x = 0, x = 2, y = 0, y = 2, z = 0, and z = 2.
To verify the divergence theorem, we need to calculate the flux of the vector field through each face of the cube and sum them up.
Let's go step by step to calculate the flux through each face:
Flux through the x = 0 plane: The unit normal vector of this plane is -i. The flux through this plane is given by the surface integral of f dot dS, where dS is the area element of the plane. Since f(x, y, z) = 4xi + xyj + 4xzk, the dot product is -4x. The integral becomes: integral[0 to 2] integral[0 to 2] -4x dy dz = -16.
Flux through the x = 2 plane: Similar to the previous case, the unit normal vector of this plane is i. The flux through this plane is given by the surface integral of f dot dS, where dS is the area element of the plane. Since f(x, y, z) = 4xi + xyj + 4xzk, the dot product is 4x. The integral becomes: integral[0 to 2] integral[0 to 2] 4x dy dz = 16.
Continue with steps 3-6, calculating the flux through the rest of the faces and summing them up.
Flux through the y = 0 plane: The unit normal vector of this plane is -j. The flux through this plane is given by the surface integral of f dot dS, where dS is the area element of the plane. Since f(x, y, z) = 4xi + xyj + 4xzk, the dot product is -xy. The integral becomes: integral[0 to 2] integral[0 to 2] -xy dx dz = -8.
Flux through the y = 2 plane: Similar to the previous case, the unit normal vector of this plane is j. The flux through this plane is given by the surface integral of f dot dS, where dS is the area element of the plane. Since f(x, y, z) = 4xi + xyj + 4xzk, the dot product is xy. The integral becomes: integral[0 to 2] integral[0 to 2] xy dx dz = 8.
Flux through the z = 0 plane: The unit normal vector of this plane is -k. The flux through this plane is given by the surface integral of f dot dS, where dS is the area element of the plane. Since f(x, y, z) = 4xi + xyj + 4xzk, the dot product is -4xz. The integral becomes: integral[0 to 2] integral[0 to 2] -4xz dx dy = -16.
Flux through the z = 2 plane: Similar to the previous case, the unit normal vector of this plane is k. The flux through this plane is given by the surface integral of f dot dS, where dS is the area element of the plane. Since f(x, y, z) = 4xi + xyj + 4xzk, the dot product is 4xz. The integral becomes: integral[0 to 2] integral[0 to 2] 4xz dx dy = 16.
Finally, to verify the divergence theorem, we sum up the flux through each face:
-16 + 16 + (-8) + 8 + (-16) + 16 = 0
The flux of the vector field f through the region e is 0
A tire rim has a diameter of 15 in. What is the circumference of the tire rim? Use 3.14 for pi
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Circumference = (3.14)(15) = 47.1 in
Answer: 47.1 in
A rectangle has a length of x inches and a width of 10 inches. Write an equation to represent the perimeter of the rectangle.
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So, we can write:
Perimeter = 2(Length + Width)
Length is given to be x inches and Width is given to be 10 inches. Using these values, we can write the perimeter as:
Perimeter = 2(x + 10) = 2x + 20 inches
Thus, the perimeter of the rectangle would be 2x + 20 inches or simply 2(x + 10) inches.
A jar holds 2 3/4 cups of water. How much is this in fluid ounces
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What is the distance to the earth’s horizon from point P?
Enter your answer as a decimal in the box. Round only your final answer to the nearest tenth.
Answers
Answer:
284.4
Step-by-step explanation:
Given is a picture of a circle as earth and radius = 3959 mi.
THe horizon is the tangent with length unknown x
The hypotenuse of the right triangle is 3959+10.2 = 3969.2 mi.
Hence we get
x using Pythagorean theorem
[tex]x^2+3959^2=3969.2^2\\x^2= 10.2(7928.2)\\x=284.37[/tex]
Round off to nearest 10th
Since ii digit after decimal is 7 >5 we add 1 to the digit after decimal
Answer is 284.4
Daniel is using match sticks to do a square an a triangle. he uses 41 match sticks to do 12 figuring altogether .how many square did he made
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Daniel made 5 squares.
Hey can you please help me posted picture of question
Answers
3 x 6 x 4 = 72
answer A. 72
Explanation:
There is 3 flavors
6 cookie add ins
4 flavors of syrup
We multiply these answers using multiplication and we get 72!
:D
Good Day!
Answer:72
Sally is making sun tea. Every hour, the concentration of the tea doubles. If it takes 6 hours for the tea to be ready, how long would it take for the tea to reach half of the final concentration (in hours)?
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If it double every hour, this means it would have to be at half the concentration the hour before the 6th hour in order to double to get the full concentration in the sixth hour.
X2 x 2 x 2 x 2 x 2 x 2
2, 4, 8, 16, 32, 64
32 is half of 64.
Tea reaches half concentration after 5 hours; at 4 hours, it's a quarter.
To solve this problem, we can use the fact that the cable between the towers forms a parabolic shape. Since the cable touches the sides of the road midway between the towers, the cable forms a parabola with its vertex at the midpoint between the towers and its axis of symmetry being parallel to the road.
Let's denote the midpoint between the towers as the origin (0, 0). Then, the vertex of the parabola is at (640, 160) since the towers are 1280 meters apart and rise 160 meters above the road.
The general equation of a parabola in vertex form is:
[tex]\[ y = a(x - h)^2 + k \][/tex]
Where:
- (h, k) is the vertex of the parabola.
- ( a ) determines the "width" of the parabola.
Since the parabola is symmetric, we know that it opens either upwards or downwards. Given the geometry of the situation (the cable hanging between the towers), we know it opens downwards. Therefore, ( a ) will be negative.
To find the equation of the parabola, we need to find the value of ( a ). We can use the point (640, 0). which is the midpoint between the towers.
Let's plug in the values:
[tex]\[ 0 = a(640 - 640)^2 + 160 \]\[ 0 = 160a \][/tex]
From this, we find that ( a = 0 ).
This indicates that the parabola is a horizontal line, which is not the shape of a cable between the towers. We made an error. The equation of a parabola is [tex]\( y = a(x - h)^2 + k \),[/tex] but for this problem, we should use the equation of a downward-opening parabola, which is [tex]\( y = ax^2 + bx + c \).[/tex]
Let's correct the approach and use the new equation to solve the problem. We'll find the coefficients [tex]\( a \), \( b \), and \( c \)[/tex] using the given information. Once we have the equation of the parabola, we can find the height of the cable at a distance of 200 meters from a tower. Let's do it step by step.
Is 78990 divisible by 9
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Chiara has 26 coins that equal 34 cents. All the coins are pennies, p, and nickels, n. How many nickels and pennies does Chiara have? Use the table to guess and check.
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Answer:
Chiara has 2 penny coins and 24 nickel coins
Step-by-step explanation:
Let
p ----> the number of penny coins
n ---> the number of nickel coins
Remember that
[tex]1\ penny=\$0.01[/tex]
[tex]1\ nickel=\$0.05[/tex]
Chiara has 26 coins that equal 34 cents
so
[tex]p+n=26[/tex]
isolate the variable x
[tex]p=26-n[/tex] ----> equation A
34 cents=$0.34
[tex]0.01p+0.05n=0.34[/tex]
Multiply by 100 both sides
[tex]p+5n=34[/tex]
isolate the variable x
[tex]p=34-5n[/tex] -----> equation B
Create a table to guess
assume different values of n and determine the value of p in equation A and equation B
The solution is when the value of p in the equation A must be equal to the value of p in equation B
1) For n=1
equation A
[tex]p=26-1=25[/tex]
equation B
[tex]p=34-5(1)=29[/tex]
[tex]29\neq 25[/tex]
2) For n=2
equation A
[tex]p=26-2=24[/tex]
equation B
[tex]p=34-5(2)=24\\24=24[/tex]
therefore
The solution is (2,24)
Chiara has 2 penny coins and 24 nickel coins
Answer:
Step-by-step explanation:
Sorry I'm late but the other person is wrong this is the answer
Identify any solutions to the system shown here. 2x+3y > 6 3x+2y < 6
Answers
The points that satisfy both inequalities are:
B) (0.5, 2)
D) (−2, 4)
To identify which points are solutions to the system of inequalities:
2x + 3y > 6
3x + 2y < 6
We need to check each point to see if it satisfies both inequalities.
2(1.5) + 3(1) = 3 + 3 = 6 - Not a solution
3(1.5) + 2(1) = 4.5 + 2 = 6.5 Not a solution
2(0.5) + 3(2) = 1 + 6 = 7 This a solution
3(0.5) + 2(2) = 1.5 + 4 = 5.5 - This a solution
2(-1) + 3(2.5) = -2 + 7.5 = 5.5 - Not a solution
3(-1) + 2(2.5) = -3 + 5 = 2 - Not a solution
2(-2) + 3(4) = -4 + 12 = 8 - This a solution
3(-2) + 2(4) = -6 + 8 = 2- This a solution
Complete question
Identify any solutions to the system shown here.
2x+3y>6
3x+2y<6
A) (1.5,1)
B) (0.5,2)
C) (−1,2.5)
D) (−2,4)
What value for s makes this equation true?
(6x10)+(6xs)=6x17
HELP ASAP
Answers
10 + s = 17
Subtract 10 from both sides of the equation to find the value of s.
s = 7
Lucy created a design with different shapes. Stars made up 1/4 of all the shapes in the design. Eight ninths of the stars are red. What fraction of all the shapes are red stars?
Answers
Red stars = 8/9
Multiply:
1/4 × 8/9 = 8/36 = 4/18 = 2/9
Answer = 2/9
Hope this helped☺☺
Final answer:
To find out what fraction of all shapes are red stars in Lucy's design, multiply the fraction of stars (1/4) by the fraction of red stars among them (8/9) to get 2/9 of all shapes being red stars.
Explanation:
The question asks us to determine what fraction of all the shapes in Lucy's design are red stars. To solve this, we need to multiply the fraction of shapes that are stars by the fraction of those stars that are red. Lucy has stars that make up 1/4 of all shapes, and 8/9 of these stars are red. By multiplying these two fractions, we can find the fraction of all the shapes that are red stars.
Here is the step-by-step calculation:
Multiply the fractions: (1/4) × (8/9) = 8/36.
Simplify the fraction: 8/36 can be simplified by dividing both the numerator and the denominator by the greatest common factor, which is 4. So, (8 ÷ 4)/(36 ÷ 4) = 2/9.
Therefore, 2/9 of all the shapes in Lucy's design are red stars.
Hey can you please help me posted picture of question
Answers
Explanation:
Since, rolling a die and tossing a coin are independent events, the sample space of both events is the product of the outcomes for each event, i.e 6 × 2 = 12.
You can check that here:
roll a die toss a coin
1 head
1 tail
2 head
2 tail
3 head
3 tail
4 head
4 tail
5 head
5 tail
6 head
6 tail
So, as you see for each outcome of the event roll a die there are two different possible different outcomes for the event toss a coin; since there are 6 different outcomes for the die, the total number of possibilities is 6 × 2 = 12
A tank contains 30 lb of salt dissolved in 300 gallons of water. a brine solution is pumped into the tank at a rate of 3 gal/min; it mixes with the solution there, and then the mixture is pumped out at a rate of 3 gal/min. determine a(t), the amount of salt in the tank at time t, if the concentration of salt in the inflow is variable and given by cin(t) = 2 + sin(t/4) lb/gal.
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[tex]\implies A'(t)=\dfrac{3\text{ gal}}{1\text{ min}}\cdot\left(2+\sin\dfrac t4\right)\dfrac{\text{lb}}{\text{gal}}-\dfrac{3\text{ gal}}{1\text{ min}}\cdot\dfrac{A(t)\text{ lb}}{300+(3-3)t\text{ gal}}[/tex]
[tex]A'(t)+\dfrac1{100}A(t)=6+3\sin\dfrac t4[/tex]
We're given that [tex]A(0)=30[/tex]. Multiply both sides by the integrating factor [tex]e^{t/100}[/tex], then
[tex]e^{t/100}A'(t)+\dfrac1{100}e^{t/100}A(t)=6e^{t/100}+3e^{t/100}\sin\dfrac t4[/tex]
[tex]\left(e^{t/100}A(t)\right)'=6e^{t/100}+3e^{t/100}\sin\dfrac t4[/tex]
[tex]e^{t/100}A(t)=600e^{t/100}-\dfrac{150}{313}e^{t/100}\left(25\cos\dfrac t4-\sin\dfrac t4\right)+C[/tex]
[tex]A(t)=600-\dfrac{150}{313}\left(25\cos\dfrac t4-\sin\dfrac t4\right)+Ce^{-t/100}[/tex]
Given that [tex]A(0)=30[/tex], we have
[tex]30=600-\dfrac{150}{313}\cdot25+C\implies C=-\dfrac{174660}{313}\approx-558.02[/tex]
so the amount of salt in the tank at time [tex]t[/tex] is
[tex]A(t)\approx600-\dfrac{150}{313}\left(25\cos\dfrac t4-\sin\dfrac t4\right)-558.02e^{-t/100}[/tex]
To determine the amount of salt in the tank at time t, we need to consider the inflow and outflow of the brine solution over time. The inflow rate is given as 3 gal/min, and the concentration of salt in the inflow varies with time according to the equation cin(t) = 2 + sin(t/4) lb/gal. The outflow rate is also 3 gal/min.
Explanation:To determine the amount of salt in the tank at time t, we need to consider the inflow and outflow of the brine solution over time. The inflow rate is given as 3 gal/min, and the concentration of salt in the inflow varies with time according to the equation cin(t) = 2 + sin(t/4) lb/gal. The outflow rate is also 3 gal/min.
To find the amount of salt in the tank at time t, we need to integrate the product of the inflow rate and the concentration of salt over the interval [0, t]. This will give us the total amount of salt that has entered the tank up to time t. We can then subtract the amount of salt that has been pumped out of the tank over the same interval to get the amount of salt remaining in the tank at time t.
a(t) = ∫[0,t] (3 gal/min * cin(t)) dt - 3 gal/min * t.
hey can you please help me posted picture of question
Answers
This means F(x) is obtained after vertical translation of G(x). This vertical translation can be expressed by adding 4 to G(x).
So,
F(x) = G(x) + 4
F(x) = x² + 4
So, the correct answer is option D
The diameter of a circle is 18 cm. What is its area in terms of π.
Answers
Answer:
Area, [tex]A=(81\pi )\ cm^2[/tex]
Step-by-step explanation:
Given that,
The diameter of the circle, d = 18 cm
The radius of a circle is half of its diameter, r = 9 cm
The formula to find the area of a circle is given by :
[tex]A=\pi r^2[/tex]
When r = 9 cm
[tex]A=\pi (9\ cm)^2[/tex]
[tex]A=(81\pi )\ cm^2[/tex]
So, the area of the circle is [tex](81\pi )\ cm^2[/tex]. Hence, this is the required solution.
Fresh raspberries contain 80% water. Dried raspberries contain only 20% water. How many pounds of dried raspberries do you get from 36 lb of fresh berries?
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36*0.2(20%)=7.2, this is how much water the berries obtain.
Now you do 7.2 divided by 0.8 which equals 9. You do this step to find out how much water and the rest of the stuff in the berries.
Happy to help! :)
The answer is 9
The answer is 9
The answer is 9
The answer is 9
An isosceles trapezoid has a perimeter of 40.9 feet. Its shorter base measures 3.5 feet and its longer base measures 4.4 feet. The two remaining sides have the same length; what is that length?
Answers
P= a + b + c + d
40.9 = 3.5 + 4.4
40.9 = 7.9
-7.9 -7.9
---------------
40.9-7.9=33 and since its calculating two equal sides, 33/2 = 16.5
Answer:
16.5 feet is the amount of the length
Every week Ben collects a few pounds of paper to recycle. The graph below shows the total number of pounds of paper (y) that Ben collected in a certain amount of time (x), in weeks:
(photo below)
What would most likely be the total amount of paper, in pounds, Ben would collect in 10 weeks?
230 pounds
270 pounds
300 pounds
330 pounds
Answers
30*11=330
Which expression represents "6 more than x"?
x - 6
6x
x + 6
6 - x
Answers
this is because + means more, so 6 more
The base is 34 ya and it’s height is 20.5. What is the area
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The formula for glue says to add 55mL of hardener to each container of resin. How much hardener should be added to 14 containers of resin?
Answers
To determine the amount of hardener needed for 14 containers of resin, multiply the amount of hardener needed for one container (55mL) by the number of containers (14), resulting in 770mL of hardener.
Explanation:To determine the amount of hardener needed for 14 containers of resin, we can use the given formula of adding 55mL of hardener to each container. We can multiply the amount of hardener needed for one container (55mL) by the number of containers (14).
Calculation:
Amount of hardener needed for 14 containers = 55mL/container × 14 containers= 770mLTherefore, 770mL of hardener should be added to 14 containers of resin.
To calculate the total amount of hardener needed for 14 containers of resin, multiply the 55 mL required per container by 14, resulting in 770 mL of hardener needed.
Explanation:You are asked to determine how much hardener should be added to 14 containers of resin if it is known that 55 mL of hardener is required for each container. To find the total amount of hardener needed for 14 containers, you would use multiplication:
Total hardener needed = Hardener per container × Number of containers
So, Total hardener needed = 55 mL/container × 14 containers
Now by multiplying 55 by 14, we get:
Total hardener needed = 770 mL
Therefore, 770 mL of hardener is needed for 14 containers of resin.
How do you determine if two probabilities are conditional to each other?
Please help
Answers
Final answer:
You can determine if two probabilities are conditional by checking if the occurrence of one affects the probability of the other. If it does, the probability is conditional, represented by P(A|B), otherwise, the events are independent.
Explanation:
Determining Conditional Probabilities
To determine if two probabilities are conditional to each other, you consider if the occurrence of one event affects the probability of the other event happening. The conditional probability of event A given event B is denoted by P(A|B). This is calculated by dividing the probability of both events A and B occurring together (P(A AND B)) by the probability of event B:
P(A|B) = P(A AND B) / P(B)
This formula is applicable only when P(B) is greater than zero, meaning event B must have a chance of occurring. If the probability of A happening does NOT change whether B occurs or not, then A and B are independent events. Conversely, if the probability of A does depend on the occurrence of B, then A and B are dependent, and the probability P(A|B) is a conditional probability.
Independence is defined as the situation where the probability of A and B occurring together is the product of their individual probabilities (P(A) * P(B)). If this is true, P(A|B) would simply be P(A), as B's occurrence doesn't affect A's probability.
The average value of y=v(x) equals 4 for 1≤x≤6, and equals 5 for 6≤x≤8. what is the average value of v(x) for 1≤x≤8 ?
Answers
Area = 4*(6 -1) +5(8 -6) = 30
Width = 8 - 1 = 7
Average value = 30/7 = 4 2/7
The average value of v(x) for the interval 1≤x≤8 is calculated by summing up the products of the average values each times their respective lengths of interval, and dividing by the total length of the interval, which results in 4.2857 approximately.
Explanation:The average value of v(x) for 1≤x≤8 can be calculated using the formula for the average of a function over an interval, which is the sum of the function values times their respective lengths of interval, divided by the total length of the interval. For the first interval, 1≤x≤6, the average value of y is 4, and the length of the interval is 6-1=5. Hence, the sum of the product of the average value times the length of the interval is 4*5=20.
For the second interval, 6≤x≤8, the average value of y is 5, and the length of the interval is 8-6=2. Hence, the sum of the product of the average value times the length of the interval is 5*2=10.
Summing up these two products, we get 20+10=30. The total length of the overall interval 1≤x≤8 is 8-1=7. Hence, the average value of v(x) for 1≤x≤8 is 30/7=4.2857, approximately.
Learn more about Average Value of Function here:https://brainly.com/question/35400296
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steph has 5 1/4 pounds of rice.she wants to place 1/4 pound of rice in each plastic bag.how many bags will she need?
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total amount of rice in one bag = 1/4
Number of bags needed = 5 1/4 ÷ 1/4 = 21/4 ÷ 1/4 = 21/4 x 4 = 21 bags
Answer: 21 bags.
The area of a triangle is 30 square feet. If the height of the triangle is 5 feet, what is the base of the triangle? 12 ft 6 ft 3 ft 24 ft
Answers
30=(1/2)*base*5
6=(1/2)*base
base=12 ft
To find the base of the triangle with a known area and height, apply the formula for the area of a triangle and solve for the base, resulting in 12 ft.
The base of the triangle can be found using the formula for the area of a triangle:
Area = 1/2 × base × heightGiven the area is 30 sq ft and height is 5 ftSubstitute the values: 30 = 1/2 × base × 5Solve for base: base = 30 / (1/2 × 5) = 30 / 2.5 = 12 ftA circle has a radius of 6x^9y^5 cm, what is the area of this circle in square centimeters
Answers
[tex]\text {Area of circle }= \pi (6x^9y^5)^2 \text{ cm}^2[/tex]
[tex]\text {Area of circle }= 12\pi x^{18}y^{10} \text{ cm}^2[/tex]
The area of the circle in square centimeters is [tex]\( 36\pi x^{18}y^{10} \)[/tex] cm².
The area of a circle is given by the formula [tex]\( A = \pi r^2 \)[/tex], where [tex]\( r \)[/tex] is the radius of the circle.
Given that the radius [tex]\( r \)[/tex] of the circle is [tex]\( 6x^9y^5 \)[/tex] cm, we can substitute this value into the formula to find the area.
[tex]\( A = \pi (6x^9y^5)^2 \)[/tex]
Now, we square the radius:
[tex]\( (6x^9y^5)^2 = (6x^9y^5)(6x^9y^5) \)[/tex]
[tex]\( = 36x^{18}y^{10} \)[/tex]
Substituting this back into the area formula:
[tex]\( A = \pi \cdot 36x^{18}y^{10} \)[/tex]
[tex]\( A = 36\pi x^{18}y^{10} \)[/tex]
Therefore, the area of the circle in square centimeters is [tex]\( 36\pi x^{18}y^{10} \)[/tex] cm².