Alien is an extraterrestrial species or a hypothetical species that lives beyond the planet Earth. They are beings from other planets that can travel in spacecraft. They are often depicted as having unique or supernatural powers that are beyond those of humans. The question given is about an alien species that leaves its planet to explore other planets. We are given the information that 120 aliens have left planet zenith over the past 3 years. We need to write an expression to model the change in aliens per year on planet zenith. We can write the following expression:Change in aliens per year = Total number of aliens left / Number of yearsThe total number of aliens left in the past 3 years is 120. Therefore,Total number of aliens left = 120Number of years = 3Substituting the values in the above expression, we get:Change in aliens per year = 120 / 3Change in aliens per year = 40 aliens per yearThe expression to model the change in aliens per year on planet zenith is 40 aliens per year. This means that 40 aliens are leaving planet zenith each year to explore other planets in the universe.
The average change in aliens per year can be calculated using the above expression. The change in aliens per year is 40 aliens. Hence, every year 40 aliens are leaving planet Zenith to explore other planets in the universe.
To model the change in aliens per year on planet Zenith, an expression can be formed from the given data. Let's look into the steps to model the change in aliens per year on planet zenith.
Step 1: We are given that 120 aliens have left planet zenith over the past 3 years.
Step 2: To find the change in aliens per year, we can divide the total number of aliens who left the planet over the past 3 years by the number of years.
Change in aliens per year = (120 aliens) / (3 years)
Step 3: Simplifying the above expression we get,Change in aliens per year = 40 aliens per year
Therefore, the expression to model the change in aliens per year on planet Zenith is 40 aliens per year. This implies that every year 40 aliens are leaving planet Zenith to explore other planets in the universe.
Evaluation: As per the given problem, 120 aliens have left planet Zenith over the past 3 years.
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What numbers fill the boxes in this equation?
By algebra properties, the complete algebraic equation is now described:
a · x · (x + 3) + 7 · x · (2 · x + 1) = 5 · x · (a · x + 5), where a = 7 / 2.
How to complete an algebraic equation by comparing the terms
An algebraic equation is shown herein, this expression must completed by filling the blanks. This can be done by clearing a variable through algebra properties:
a · x · (x + 3) + 7 · x · (2 · x + 1) = 5 · x · (a · x + 5)
a · x² + 3 · a + 14 · x² + 7 · x = 5 · a · x² + 25 · x
(a + 14) · x² + 7 · x + 3 · a = 5 · a · x² + 25 · x
Then, by comparing terms:
a + 14 = 5 · a
14 = 4 · a
a = 14 / 4
a = 7 / 2
The complete expression is introduced below:
(7 / 2) · x · (x + 3) + 7 · x · (2 · x + 1) = 5 · x · [(7 / 2) · x + 5]
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Square both sides of this: √2-x = x
Answer:
[tex]2 - x = x^2[/tex]
Step-by-step explanation:
Assuming the form is:
[tex]\sqrt{2 - x} = x \\(\sqrt{2-x})^2 = (x)^2\\2 - x = x^2\\[/tex]
Further solving:
[tex]0 = x^2 +x - 2\\0 = (x+2)(x-1)\\x = -2, 1\\x = 1[/tex]
x is only 1 because of the domain of the original equaiton.
Write the equation of a line parrallel to y=1/3x+4 and goes through -6,1
The equation of the line parallel to y = (1/3)x + 4 and passing through (-6, 1) is y = (1/3)x + 3.
To find the equation of a line parallel to y = (1/3)x + 4 and pass through the point (-6, 1), we can use the fact that parallel lines have the same slope. The slope of the given line is 1/3, so the slope of the parallel line must also be 1/3.
Now we have the slope (m = 1/3) and a point on the line (-6, 1), so we can use the point-slope form of the equation of a line:
y - y1 = m(x - x1)
Plugging in the values, we get:
y - 1 = (1/3)(x - (-6))
Simplifying, we get:
y - 1 = (1/3)x + 2
Adding 1 to both sides, we get the final equation:
y = (1/3)x + 3
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10) A thermometer showed a temperature of 28° C. 9C = 5 (F32) can be used to find the in degrees Fahrenheit, F, given the in degrees Celsius, C. What was the in degrees Fahrenheit? temperature temperature temperature
Step-by-step explanation:
Using the formula F = (9/5)*C + 32, where C is the temperature in Celsius and F is the temperature in Fahrenheit, we can find the temperature in Fahrenheit:
F = (9/5)*C + 32
F = (9/5)*28 + 32
F = 82.4
Therefore, the temperature in degrees Fahrenheit is 82.4°F.
Your home security system requires a six character code for activation. It contains two letters followed by four digits, 0 - 9. The first character can be any letter and the second cannot be a vowel. The first digit cannot be zero and the last three characters can be any digits. Repetitions are allowed for letters and digits. How many security codes are possible? Show work.
Therefore , the solution of the given problem of probability comes out to be there are 54,540,000 different security number combinations.
What precisely is probability?A procedure's criteria-based systems' main objective is to ascertain the likelihood that an assertion is accurate or that a particular event will take place. Chance can be represented by any number range between 0 and 1, where 0 is commonly used to indicate the possibility of something may be and 1 is usually employed to indicate a degree of confidence. A probability diagram shows the likelihood that a particular occurrence will occur.
Here,
The alphabet consists of 26 characters, and 5 of them are vowels.
(A, E, I, O, U).
Consequently, there are 21 vowels available for the second letter.
Any one of the 26 letters can be used as the first word.
Therefore, there are 21 options for the second character and 26 options for the first letter.
Consequently, there are 9 options for the first number.
There are 10 options for each of the last three numbers since they can be any of the digits from 0 to 9.
Consequently, there are a total of the following protection codes:
=> 26 x 21 x 9 x 10 x 10 x 10 = 54,540,000
Thus, there are 54,540,000 different security number combinations.
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according to the myplate analysis report, empty calories should exceed no more than 362 calories for someone like miya. how many empty calories did miya consume on this 1-day menu? a. 793.34 empty calories b. 693.74 empty calories c. 593.54 empty calories d. 352.74 empty calories
352.74 empty calories did miya consume on this 1-day menu.
Hence option d. 352.74 empty calories is correct.
According to the my plate analysis report, how many empty calories did Miya consume on this 1-day menu.
Empty calories refer to those calories that are devoid of any nutrient and provide only energy.
Miya's 1-day menu needs to be analyzed to determine the empty calories count.
The options provided are:
a. 793.34 empty calories
b. 693.74 empty calories
c. 593.54 empty calories
d. 352.74 empty calories.
Let us understand the concept of empty calories in detail.
Empty calories refer to the calories provided by foods that contain little to no nutrients, like vitamins and minerals. Common sources of empty calories are sugary snacks and alcohol.
Though these foods provide energy, they lack the essential vitamins, minerals, and fiber that the body requires for optimal health.
Therefore, empty calories should be limited in the diet.
To determine the empty calories consumed by Miya, we need to know the nutrient content of her 1-day menu.
Once the nutrient content is known, we can subtract the total calories from empty calories to determine the number of calories that are not empty.
Let us assume that Miya's total calorie intake for the day is 1500 calories. Out of this, the my plate analysis report says that empty calories should not exceed 362 calories.
Therefore, the non-empty calories will be: 1500 - 362 = 1138 calories
From this, we can determine the correct option.
Let us substitute the values given in the options :
a. 793.34 empty calories: 1500 - 793.34 = 706.66
non-empty calories, which is less than 1138.
Therefore, this option is incorrect.
b. 693.74 empty calories: 1500 - 693.74 = 806.26 non-empty calories, which is less than 1138.
Therefore, this option is incorrect.
c. 593.54 empty calories: 1500 - 593.54 = 906.46 non-empty calories, which is less than 1138.
Therefore, this option is incorrect.
d. 352.74 empty calories: 1500 - 352.74 = 1147.26 non-empty calories, which is greater than 1138.
Therefore, this option is the correct answer.
So, the number of empty calories consumed by Miya on this 1-day menu is 352.74 empty calories.
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Part 1: Use the picture below to find the ratio for each given the trig. function.
The value of the trigonometric function for the given ratio are Sin X= 12/20. Cos L = 16/34. Tan X = 12/16. Tan Z = 16/12. Tan L = 30/16. Cos M = 16/34.
What are trigonometric functions?The fundamental six functions of trigonometry have a range of numbers as their result and a domain input value that is the angle of a right triangle. The ratio of sides of a right-angled triangle is the basis for trigonometric functions and identities. Using trigonometric formulae, the sine, cosine, tangent, secant, and cotangent values are calculated for the perpendicular side, hypotenuse, and base of a right triangle.
Using the relationship of a right triangle and different trigonometric identities we have the values of the following as:
Sin X= opposite side to X / Hypotenuse = 12/20.
Cos L = adjacent side to L / Hypotenuse = 16/34.
Tan X = Opposite side to X / adjacent side to X = 12/16.
Tan Z = Opposite side to Z / adjacent side to Z = 16/12.
Tan L = 30/16.
Cos M = 16/34.
Hence, the value of the trigonometric function for the given ratio are Sin X= 12/20. Cos L = 16/34. Tan X = 12/16. Tan Z = 16/12. Tan L = 30/16. Cos M = 16/34.
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How many solutions does the nonlinear system of equations graphed below have? O OB. Two O C. Four A. One D. Zero -10 10 -10- y 10
pls hurry
Answer: c
Step-by-step explanation:
The number of solutions on the graph is zero.
What is graph?In mathematics, the graph of a function f is the set of ordered pairs, where {\displaystyle f(x)=y.} In the common case where x and f(x) are real numbers, these pairs are Cartesian coordinates of points in two-dimensional space and thus form a subset of this plane.
here, we have,
to determine the number of solutions:
The graph shows a linear equation (the straight line) and a non linear equation (the curve)
From the graph, we can see that the straight line and the curve do not intersect
This means that the graph do not have any solution
Hence, the number of solutions on the graph is zero
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ezra is redrawing the blueprint shown of a stage he is planning to build for his band. by what percentage should he multiply the dimensions of the stage so that the dimensions of the image are 12 the size of the original blueprint? what will be the perimeter of the updated blueprint?
The perimeter of the updated blueprint will be 24 times the sum of the original length and width.
If Ezra wants to multiply the dimensions of the stage by a certain percentage to make the image 12 times larger than the original, he needs to find out what percentage that is.
To do this, he can divide the desired size of the new stage by the original size of the stage, and then multiply by 100 to get the percentage increase. So, if the original blueprint dimensions are x by y, and he wants to make the image 12 times larger, the new dimensions will be 12x by 12y.
To find the percentage increase, he can use the following formula:
Percentage increase = [(new size - original size) / original size] x 100
In this case, the new size is 12 times the original size, so the formula becomes:
Percentage increase = [(12x * 12y - x * y) / (x * y)] x 100
Simplifying this expression gives:
Percentage increase = [(144xy - x * y) / (x * y)] x 100 = 14300%
Therefore, Ezra needs to multiply the dimensions of the stage by 14300% to make the image 12 times larger than the original blueprint.
To find the perimeter of the updated blueprint, he can use the formula for the perimeter of a rectangle, which is: Perimeter = 2(length + width)
In this case, the length and width have been multiplied by 12, so the new perimeter becomes:
Perimeter = 2(12x + 12y) = 24(x + y)
Therefore, the perimeter of the updated blueprint will be 24 times the sum of the original length and width.
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use excel to find the critical value of z for each hypothesis test. (negative values should be indicated by a minus sign. round your answers to 3 decimal places.) (a) 2 percent level of significance, two-tailed test.
The critical value of z for each hypothesis test is 2.326
In this question, we are asked to use Excel to find the critical value of z for each hypothesis test. We are given a 2 percent level of significance for a two-tailed test. To find the critical value, we can use the NORM.S.INV function in Excel. The syntax for this function is =NORM.S.INV(probability).
We can enter the probability as 1 - (alpha / 2) for a two-tailed test, where alpha is the level of significance. We can then round the result to three decimal places.
To find the critical value for a 2 percent level of significance, two-tailed test, we can follow these steps:
Step 1: Calculate the value of alpha
Alpha = 2% = 0.02
Step 2: Calculate
1 - (alpha / 2)1 - (alpha / 2)
= 1 - (0.02 / 2)
= 0.99
Step 3: Use the NORM.S.INV function in Excel=NORM.S.INV(0.99)
This gives us a critical value of z = 2.326.
Therefore, the critical value of z for the hypothesis test with a 2 percent level of significance and a two-tailed test is 2.326.
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The median is greater than the mean, and the majority of the data points are to the left of the mean. the median is greater than the mean, and the majority of the data points are to the right of the mean. the mean is greater than the median, and the majority of the data points are to the left of the mean. the mean is greater than the median, and the majority of the data points are to the right of the mean.
The option that describes the probability distribution is option (A) The mean is greater than the median, and the majority of the data points are to the left of the mean.
To find the mean of the probability distribution, we can use the formula:
mean = Σ(xi × pi)
where xi is the value of the random variable and pi is the corresponding probability.
Using this formula, we get:
mean = (1 × 0.75) + (2 × 0.1) + (3 × 0.1) + (4 × 0.05) + (5 × 0)
= 0.75 + 0.2 + 0.15 + 0.2
= 1.3
To find the median, we need to arrange the values in increasing order of x and then find the middle value.
Arranging the values in increasing order of x, we get:
x = 1, 2, 3, 4, 5
p(x) = 0.75, 0.1, 0.1, 0.05, 0
The median is the middle value, which is 3 in this case.
Therefore, the mean is 1.3 and the median is 3.
Since the mean is greater than the median, we can eliminate options C and D.
To determine whether the majority of the data points are to the left or right of the mean, we can examine the shape of the distribution.
Since the probability of x=1 is much higher than the other values, the distribution is skewed to the left. This means that the majority of the data points are to the left of the mean.
Therefore, the correct option is (A) The mean is greater than the median, and the majority of the data points are to the left of the mean.
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The given question is incomplete, the complete question is:
Which of the following describes the probability distribution below?
A.) The mean is greater than the median, and the majority of the data points are to the left of the mean.
B.) The mean is greater than the median, and the majority of the data points are to the right of the mean.
C.) The median is greater than the mean, and the majority of the data points are to the left of the mean.
D.) The median is greater than the mean, and the majority of the data points are to the right of the mean.
Sin^2(45+A)+sin^2(45-A)=1
Prove it
Answer:
Step-by-step explanation:
Setting A=45, we see that it is not true. However, you might find the following revealing:
sin2(45+A)=(sin45cosA+cos45sinA)2=12(1+2cosAsinA)
sin2(45−A)=(sin45cosA−cos45sinA)2=12(1−2cosAsinA)
Now, stare.
Small pizzas at Ponnie's Pizza are cut into 6 pieces. The circumference of a small pizza is 12π inches. A large pizza is cut into 8 pieces. The diameter of a large pizza is 16 inches.
Joannie eats 2 slices of a small pizza. Mark eats 5 slices of a large pizza.
How many times greater are the square inches of pizza that Mark ate than the square inches of pizza that Joannie ate?
Enter your answer, rounded to the nearest tenth, in the box.
Answer:
Mark ate 3.3 times the square inches of pizza than Joannie ate.
Step-by-step explanation:
Small pizzaThe formula for the circumference of a circle is C = 2πr (where r is the radius). If the circumference of a small pizza is 12π inches, then its radius is:
[tex]\implies \sf Radius_{small\;pizza}=\dfrac{circumference}{2\pi}=\dfrac{12\pi}{2\pi}=6\;inches[/tex]
The formula for the area of a circle is A = πr² (where r is the radius).
Therefore, the area of a small pizza is:
[tex]\implies \sf Area_{small\;pizza}=\pi \cdot 6^2=36\pi \; in^2[/tex]
If the small pizzas are cut into 6 congruent pieces, the area of one slice of small pizza is:
[tex]\begin{aligned}\implies \sf Area_{small\;slice}&=\sf \dfrac{Area_{small\;pizza}}{6}\\\\&=\dfrac{36 \pi}{6}\\\\&=6 \pi \; \sf in^2\end{aligned}[/tex]
Therefore, the area of one slice of small pizza is 6π square inches.
[tex]\hrulefill[/tex]
Large pizzaThe diameter of a circle is twice its radius.
If the diameter of a large pizza is 16 inches then its radius is:
[tex]\implies \sf Radius_{large\;pizza}=\dfrac{diameter}{2}=\dfrac{16}{2}=8\;inches[/tex]
The formula for the area of a circle is A = πr² (where r is the radius).
Therefore, the area of a large pizza is:
[tex]\implies \sf Area_{large\;pizza}=\pi \cdot 8^2=64 \pi \; in^2[/tex]
If the large pizzas are cut into 8 congruent pieces, the area of one slice of large pizza is:
[tex]\begin{aligned}\implies \sf Area_{large\;slice}&=\sf \dfrac{Area_{large\;pizza}}{8}\\\\&=\dfrac{64 \pi}{8}\\\\&=8 \pi \; \sf in^2\end{aligned}[/tex]
Therefore, the area of one slice of large pizza is 8π square inches.
[tex]\hrulefill[/tex]
If Joannie eats 2 slices of small pizza, the square inches of pizza she ate is:
[tex]\implies \sf Joannie=2 \times 6 \pi = 12 \pi\;in^2[/tex]
If Mark eats 5 slices of large pizza, the square inches of pizza he ate is:
[tex]\implies \sf Mark =5 \times 8 \pi = 40\pi\;in^2[/tex]
To calculate how many times greater are the square inches of pizza that Mark ate than the square inches of pizza that Joannie ate, divide the area Mark ate by the area Joannie ate:
[tex]\implies \sf \dfrac{40 \pi}{12 \pi} = \dfrac{10}{3}=3.3\;(nearest\;tenth)[/tex]
Therefore, Mark ate 3.3 times the square inches of pizza than Joannie ate.
what is the inductive hypothesis in a proof by strong induction that every simple polygon with at least three sides can be triangulated?
The pieces are reassembled into a triangulation of the original polygon.
What is inductive hypothesis?In a proof by strong induction, the inductive hypothesis is a statement that assumes the desired property is true for all cases up to some fixed size, and then uses that assumption to prove that the property is also true for the next case.
According to information:For the proof that every simple polygon with at least three sides can be triangulated, the inductive hypothesis would be something like,
"Assume that every simple polygon with up to k sides can be triangulated for some fixed k >= 3."
In other words, we are assuming that the property is true for all polygons with up to k sides, where k is some fixed number greater than or equal to 3.
The proof then proceeds by showing that if the property is true for all polygons with up to k sides, then it must also be true for polygons with k+1 sides. This usually involves breaking the (k+1)-sided polygon into smaller pieces (using a diagonal), each of which has fewer sides and can therefore be triangulated by the inductive hypothesis. Finally, the pieces are reassembled into a triangulation of the original polygon.
By completing this proof, we have shown that the property is true for all simple polygons with at least three sides.
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a person rolls a standard six-sided die 6 6 times. in how many ways can he get 3 3 fives, 2 2 sixes, and 1 1 two?
The person can get 3 fives, 2 sixes, and 1 two in 336 ways.
To find the number of ways to roll 3 fives, 2 sixes, and 1 two in 6 rolls of a standard six-sided die, we can use the formula for combinations with repetition:
[tex]C(n + k - 1, k) = C(6 + 3 - 1, 3) * C(3 + 2 - 1, 2) * C(1 + 1 - 1, 1)[/tex]
where n is the number of possible outcomes (in this case, 6), k is the number of choices to make (in this case, 3 for fives, 2 for sixes, and 1 for twos), and C(n + k - 1, k) represents the number of combinations with repetition.
Using this formula, we can calculate:
[tex]C(8, 3) * C(4, 2) * C(1, 1) = 56 * 6 * 1 = 336[/tex]
Therefore, there are 336 ways to roll 3 fives, 2 sixes, and 1 two in 6 rolls of a standard six-sided die.
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Amazon uses a box where the volume can be represented by the expression x^3-2x^2-15x. What are the possible dimensions of the box?
Answer:
See below.
Step-by-step explanation:
The volume of the box is given by the expression.
V(x) = x^3 - 2x^2 - 15x
To find the possible dimensions of the box, we need to solve for the values of x that make the volume positive. A box with negative volume is not physically meaningful.
Setting V(x) > 0, we get.
x^3 - 2x^2 - 15x > 0
Factorizing the left-hand side, we get.
x(x^2 - 2x - 15) > 0
Now, we can find the values of x that make each factor positive.
For x > 0, both factors are positive.
For x^2 - 2x - 15 > 0, we can factor it as (x - 5)(x + 3) > 0. This inequality is true when x < -3 or x > 5.
Therefore, the possible dimensions of the box are.
x > 0 and x < -3, or
x > 0 and x > 5.
However, we need to remember that the dimensions of a physical box must be positive. Therefore, the only valid solution is,
x > 0 and x > 5.
So the possible dimensions of the box are.
Length, width, and height > 5 units.
Answer:
Factor the polynomial.
x
(
x
−
5
)
(
x
+
3
Step-by-step explanation:
If 250 divided in the ratio 3:7,then smaller part is 25
If 250 is divided in the ratio 3:7, then 75 is the smaller part. To find the smaller part of 250 divided in the ratio 3:7, you need to first find the total number of parts that the ratio represents.
The total number of parts in the ratio of 3:7 is 3+7=10.
Next, you need to find the value of one part.
To do this, divide the total amount by the total number of parts:
250 ÷ 10 = 25
This means that one part of the ratio is equal to 25.
To find the smaller part, you need to multiply the value of one part (25) by the ratio of 3/10 (which represents the smaller part of the total).
So the smaller part is:
3/10 x 250 = 75
Therefore, the smaller part of 250 divided in the ratio of 3:7 is 75.
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Correct question:
If 250 is divided in the ratio 3:7, what is the smaller part?
4cm 12 cm 7cm ___square centimeters
Answer:
7cm to square centimeters is 2.6458 centimeters
Step-by-step explanation:
batman is taking a midnight stroll through gotham and sees the bat signal in the sky . if batman is 320 feet from the foot of the bat signal and the angle of elevation is 42* , find the height of the bat signal?
The height of the bat signal is about 214.12 feet.
Finding the Height of the Bat Signal from Batman's PositionTo find the height of the bat signal from Batman's position, we can use trigonometry.
The angle of elevation is the angle between the line of sight and the horizontal plane.
Using sine, we can set up the following equation:
sin(42) = height / 320
Solving for the height, we get:
height = 320 * sin(42)
Using a calculator, we can calculate the height to be approximately 214.12 feet.
Therefore, the height of the bat signal is about 214.12 feet.
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using a single composite transformation matrix for k transformations of n points, what is the required number of multiplications?
The required number of multiplications using a single composite transformation matrix for k transformations of n points is n × k.
In computer graphics, composite transformation matrices are used to transform points and shapes. These matrices are created by combining multiple transformations into a single matrix, allowing for efficient processing of large amounts of data. The number of multiplications required to perform a composite transformation depends on the number of points being transformed and the number of transformations being applied.
If there are n points and k transformations, then the required number of multiplications is n × k.
This is because each point needs to be multiplied by the composite transformation matrix k times.
Therefore, the total number of multiplications is n × k.
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Joesph has a bag filled with 2red, 4green, 10yellow, and 9 purple marbles. Determine P(not green) when choosing one marble from the bag.
92%
84%
48%
16%. PLS HELP
[tex]10 + 9 + 2 + 4 = 25[/tex] possible outcomes
[tex]25 - 4 = 21[/tex] outcomes that are not green
[tex]\dfrac{21}{25}[/tex] chance that you don’t choose green
[tex]\frac{21}{25}=\bold{84\%}[/tex]
What is the area of the triangle in this coordinate plane?
Responses
9.0 units²
9.0 units²
14.0 units²
14.0 units²
16.5 units²
16.5 units²
24.5 units²
Answer:
16.5 units square
Step-by-step explanation:
The area of a triangle is 1/2bh
To find the base and heights
We use the formula above
Using the formula for my x.-axis I got 11
From 14 - 3
And for the y-axis, I got 3
From 8-5
Then using the formula 1/2bh
The area of the triangle is 1/2 ×11×3
=16.5
each time a hurricane arrives, a new home has a 0.4 probability of experiencing damage. the occurrences of damage in different hurricanes are mutually independent. calculate the mode of the number of hurricanes it takes for the home to experience damage from two hurricanes.
As per the given probability, the mode of the number of hurricanes it takes for the home to experience damage from two hurricanes is either one or two hurricanes, depending on which sequence is more likely to occur.
The probability of the DD sequence is 0.4 x 0.4 = 0.16. This means that there is a 16% chance that the home will experience damage in both the first and second hurricanes.
The probability of the DN sequence is 0.4 x 0.6 = 0.24. This means that there is a 24% chance that the home will experience damage in the first hurricane but not in the second hurricane.
The probability of the ND sequence is 0.6 x 0.4 = 0.24. This means that there is a 24% chance that the home will not experience damage in the first hurricane but will experience damage in the second hurricane.
To determine the mode of the number of hurricanes it takes for the home to experience damage from two hurricanes, we need to consider which sequence is most likely to occur.
In this case, the DN and ND sequences have the same probability, which means that there are two possible modes: one and two hurricanes.
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Locate each of the stations on the accompanying map of California. Us a compass to drawa circle centered on each city station with a radius corresponding to the distance determined to the epicenter from that station. The horizontal scale in kilometers is provided on the map
To locate the stations and draw cirradius cles on the map of California, follow these steps:
1. Identify the city stations on the map: Find the city stations indicated on the map, such as San Francisco, Los Angeles, and San Diego.
2. Use a compass: Set your compass to the scale provided on the map.
For example, if the scale says 1 inch = 100 km, adjust your compass accordingly.
3. Determine the distance from the epicenter: Based on the information provided, determine the distance from each city station to the epicenter. If it is not provided, refer to additional resources or data.
4. Draw the circles: Place the compass point on each city station and draw a circle with a corresponding to the distance determined in
step 3. Ensure the radius is in scale with the map.
5. Identify the epicenter: The point where all the circles intersect is the approximate location of the epicenter.
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Landon owns 16 baseball cards, which is 4 times as many as Phillip owns. The equation 4p = 16 represents this situation where p is the number of baseball cards Phillip owns. Which number line represents the solution to the equation?
The number line :0-------------4-------------10 represents the solution to the equation.
What Is an integer?
An integer is a whole number that can be positive, negative, or zero. In other words, integers are numbers that can be written without fractions or decimals.
Examples of integers are: -3, -2, -1, 0, 1, 2, 3, and so on.
The equation 4p = 16 represents the number of baseball cards owned by Phillip, where p is the number of baseball cards owned by him.
To solve for p, we can divide both sides of the equation by 4:
4p/4 = 16/4
p = 4
Therefore, Phillip owns 4 baseball cards.
Now we need to represent this solution on a number line. We can draw a number line with 0 on the left and 10 on the right, marking every integer in between. Then we can place a dot at the point corresponding to the number 4, which represents the number of baseball cards owned by Phillip.
Therefore the number line :
0-------------4-------------10
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1.6.1) Does the relationship in the table represents direct or inverse/indirect proportion?
1.6.2) Determine the value of a.
1.6.3) Determine the distance a car will travel using the first two values in the table.
Answer:
1.6.1) Inversely proportional
1.6.2) 0.6h
1.6.3) 120km
Step-by-step explanation:
1.6.1)
Inversely proportional relationships are in the form of [tex]y=k/x[/tex]
[tex]y=time=t[/tex]
[tex]x=speed=v[/tex]
If we the relationship is inversely proportional, [tex]k[/tex] must be constant for all values.
[tex]yx=k[/tex]
So we just have to check the value of [tex]yx[/tex] in all cases.
[tex]20*3=60\\50*1.2=60\\80*0.75=60[/tex]
Hence relation is inversely proportional.
1.6.2)
[tex]k=60, x=100, y=k/x\\[/tex]
∴[tex]y=60/100[/tex] ⇒[tex]y=0.6[/tex]
1.6.3)
Distance formula:
[tex]v=s/t\\v*t=s\\s=(20*3) + (50*1.2)\\s=60 + 60\\s=120[/tex]
adult men have an average height of 69.0 inches with a standard deviation of 2.8 inches. find the height of a man with a z-score of . round your answer to one decimal place.
The height of a man with a z-score of 0 is 69 inches.
The average height of adult men = 69.0 inches, Standard deviation of adult men = 2.8 inches to find the Z-score the following formula is used:
z = (x- μ)/σ where z is the z-score, x is the value to be standardized, μ is mean and σ is the standard deviation.
To find the height of a man with a z-score of Standardized value(z) = 0
z = (x - μ)/σ
0 = (x - 69)/2.8
x = 69 + 0 (2.8)
x = 69 inches.
Therefore, the height of a man with a z-score of 0 is 69 inches.
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The S.S of the two equations : X+2y =5, and 2x+ky=3 in RxR equals phi then k=?
The value of k such that the solution set of the system is empty is any value of k that is not equal to 4.
What is equation?A mathematical statement that expresses the equivalence of two numbers or expressions is known as an equation. It has two sides, the left-hand side (LHS) and the right-hand side (RHS), which are equal and are divided by the equal symbol (=). Variables, constants, and mathematical operations like addition, subtraction, multiplication, and division can all be found in an equation.
To find the value of k such that the solution set of the system of equations X + 2y = 5 and 2x + ky = 3 is the empty set (i.e., the intersection of their solution sets is the empty set), we can use the determinant of the coefficient matrix.
The coefficient matrix for the system is:
| 1 2 |
| 2 k |
The determinant of this matrix is:
[tex]det(| 1 2 |[/tex]
| 2 k |) = (1)(k) - (2)(2) = k - 4
For the solution set of the system to be empty, the determinant must be non-zero, since a zero determinant would indicate that the coefficient matrix is singular and therefore the system has no unique solution.
So, we need to solve the equation k - 4 ≠ 0 for k:
k - 4 ≠ 0
k ≠ 4
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Equation C is an example of Distributive Property of Multiplication over Addition. It can be used
when you multiply a number by a sum. According to this property, you can add the numbers
and then multiply by 8 or you can first multiply each addend by 3. (This is called distributing
the 3. ) Then, you can add the products. C. 8x (3 + 4) = (8x 3) + (8x 4)
8x7= 24 + 32
2x (5+ 6) = (2x 5) + (2x 6)
Simplified form of the expression 8 ( 3 + 4 ) using the Distributive Property of Multiplication over Addition is 56
To apply the Distributive Property of Multiplication over Addition, you need to multiply the number outside the parentheses by each term inside the parentheses and then add the products together.
In this case, the number outside the parentheses is 8, and the terms inside the parentheses are 3 and 4. So, you can apply the distributive property as follows:
8 ( 3 + 4 ) = 8 × 3 + 8 × 4
Multiply the numbers
= 24 + 32
Add the numbers
= 56
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Aright cone has radius 5 ft and slant height 9 ft. The radius and slant height are both multipliedby 1/2. Which of the following correctly describes the effect on the surface area?a. The surface area is multiplied by 4b. The surface area is multiplied by 1/2.c. The surface area is multiplied by 2d. The surface area is multiplied by 1/4
The effect on the surface area is best described by the statement "the surface area is multiplied by 1/4." The correct option is D.
Given that the radius of a right cone is 5 ft and the slant height is 9 ft. If the radius and slant height of the cone are both multiplied by 1/2, then the new radius of the cone will be:5 × (1/2) = 2.5 ft
New slant height of the cone will be:9 × (1/2) = 4.5 ft. The surface area of a cone can be given by the formula:
S = πrl + πr² Where r is the radius of the base, l is the slant height of the cone, and π is a constant (3.14). The surface area of the original cone can be calculated as:
S1 = π × 5 × 9 + π × 5² = 141.37 ft². Now, if we multiply the radius and slant height by 1/2, the new surface area of the cone will be:S2 = π × 2.5 × 4.5 + π × 2.5² = 17.67 ft².
Therefore, the ratio of the new surface area to the original surface area will be:S2/S1 = 17.67/141.37 = 0.125Thus, the new surface area is 1/8th (0.125) of the original surface area or multiplied by 1/8th (1/2 × 1/4). So, the surface area is multiplied by 1/4.
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