The table represents an exponential function, and the function formula is: [tex]\[ y = 3 \cdot 2^x \][/tex]
To determine whether the table represents a linear or an exponential function, we need to examine the rate of change in the `y` values as `x` increases.
For a linear function, the rate of change (the difference between one `y` value and the next) is constant.
For an exponential function, the rate of change is multiplicative – the `y` value is multiplied by a constant factor as `x` increases by a regular increment.
Looking at the provided table:
- When `x` increases by 1 (from 0 to 1, from 1 to 2, etc.), the `y` values are:
- At `x=0`, `y=3`
- At `x=1`, `y=6`
- At `x=2`, `y=12`
- At `x=3`, `y=24`
- At `x=4`, `y=48`
- At `x=5`, `y=96`
- At `x=6`, `y=192`
- At `x=7`, `y=384`
Each time `x` increases by 1, `y` is doubled. This is a characteristic of an exponential function.
The pattern suggests that `y` is being multiplied by 2 as `x` increases by 1. Therefore, we can express the function as:
[tex]\[ y = ab^x \][/tex]
where `a` is the initial value of `y` when `x` is 0 (which is 3 in this case), and `b` is the factor by which `y` is multiplied each time `x` increases by 1 (which is 2 in this case).
So the exponential function that fits the table is:
[tex]\[ y = 3 \cdot 2^x \][/tex]
Thus the table represents an exponential function, and the function formula is:
[tex]\[ y = 3 \cdot 2^x \][/tex]
The population of a city is expected to increase by 7.5% next year. If p represents the current population, which expression represents the expected population next year.
Answer:
Population next year = 1.075p
Step-by-step explanation:
The current population can be represented by 1 p the increase in the population number by next year is 7.5% p or 7.5/100 p that equals to 0.075p. The expression that represents the expected population by next year is:
Population next year = This year population + expected growth
Population next year = 1p + 0.075p = 1.075p
Given Information:
Population rate = 7.5 %
Current population = p
Required Information:
Population next year = ?
Answer:
Population next year = 1.075p
Step-by-step explanation:
The rate of increase in the population is given as 7.5 %
We know that the current population is equal to p
The population in the next year would be the sum of current population and 7.5 % of current population.
Population next year = current population + 7.5% of current population
Population next year = p + 7.5% of p
Population next year = p + 0.075*p
Population next year = p(1 + 0.075)
Population next year = p(1.075)
Population next year = 1.075p
Phillip Esten operates a mail store in which he offers various services such as packaging items for shipment, delivering items to overnight services, and a fax machine. Esten has been charging $2.00 per page for the fax service, but a new store has opened in a nearby shopping center that is charging $1.00 per page. Esten lowers his price to $.50 per page, knowing this charge will not always cover his cost. Esten's actions:
Answer:
constitute meeting the competition.
Step-by-step explanation:
Philip Esten action from the above scenario tries to meet up with the new competition he is encountering.
He operates a mail store where he renders services such as delivering of item overnight, and charging of fax service with each page for a fee of $2.00 for clients. He has a competition in the business environment where he now has direct competitors who offers the same service and product type to clients.
In this case, his competitors tend to attract more customers, both new and Esten old customers, because his competitors are rendering the same services at a cheaper fee to build a better brand of product / services for the store and buying the trust of customers now and for the future.
Esten with the knowledge of how business competition an works, reduces his price of charge to $.50 to attract more people or customers back to his store and tries to drive off the competitors, knowing quite well that this charges will not cover his cost .
To estimate the average annual expenses of students on books and class materials a sample of size 36 is taken. The sample mean is $850 and the sample standard deviation is $54. A 99% confidence interval for the population mean is:_______.A) $823.72 to $876.28.
B) $832.36 to $867.64.
C) $826.82 to $873.18.
D) $825.48 to $874.52.
Answer:
C) $826.82 to $873.18.
Step-by-step explanation:
Sample mean (M) = $850
Standard deviation (s) = $54
sample size (n) = 36
Z for 99% confidence interval (Z) = 2.576
The confidence interval is determined by the following relationship:
[tex]M \pm Z*\frac{s}{\sqrt{n}}[/tex]
Applying the given values, the lower (L) and upper (U) values are:
[tex]850 \pm 2.576*\frac{54}{\sqrt{36}}\\L=\$826.82\\U=\$873.18[/tex]
The answer is C) $826.82 to $873.18.
A soccer ball is kicked from the ground with an initial upward velocity of 90 feet per second. The equation h=-16t^2+90t gives the height h of the ball after t seconds. Find the maximum height of the ball.
Answer:
[tex]h_{max} = 30.012\,ft[/tex]
Step-by-step explanation:
The maximum height of the soccer can be determined with the help of the First Derivative and Second Derivative Tests, whose expression are introduced below:
[tex]\frac{dh}{dt} = -32\cdot t + 90[/tex]
[tex]-32\cdot t + 90 = 0[/tex]
[tex]t = 0.356\,s[/tex]
[tex]\frac{d^{2}h}{dt^{2}} = -32[/tex]
According to both tests, the critical value leads to maximum height. Then:
[tex]h_{max} = -16\cdot (0.356)^{2}+90\cdot (0.356)[/tex]
[tex]h_{max} = 30.012\,ft[/tex]
A local elementary school is having a bake sale fundraiser. The students are selling 30 cupcakes, 10 pies, and 60 cookies. What is the ratio of the number of cupcakes to the total number of baked goods?
10:3
7:3
3:7
3:10
Answer:
3:10
Step-by-step explanation:
Solution to the question is in the attached picture.
Answer:
3:10 trust
Step-by-step explanation:
Kate Alexander worked 40 hours last week. Her pay rate is $8.50 per hour. Assuming 7.65% social security withholding, how much should her employer withhold from her check for social security? a) 0.65 b) 6.50 c) 2.60 d) 26.01
Answer:
Her employer should withhold from her check for social security is d) 26.01
Step-by-step explanation:
Given:
Kate Alexander worked 40 hours last week. Her pay rate is $8.50 per hour. Assuming 7.65% social security withholding.
Now, to find the amount her employer should withhold from her check for social security.
Total number of hours = 40.
Pay rate per hour = $8.50.
Now, the total amount of total number of hours she worked in accordance of her pay rate:
[tex]40\times 8.50\\\\=\$340.[/tex]
Social security withholding = 7.65%.
So, to get the amount of social security withholding:
[tex]7.65\%\ of\ \$340[/tex]
[tex]=\frac{7.65}{100} \times 340[/tex]
[tex]=\frac{2601}{100}[/tex]
[tex]=\$26.01.[/tex]
The amount of social security withholding is $26.01.
Therefore, her employer should withhold from her check for social security is d) 26.01
Please someone help me on 2 problems 25 points ya boy be struggling
Answer:
6) x = 17 ft
7) 42 in
Step-by-step explanation:
6) length of the tangents are equal.
2x - 7 = 27
2x = 34
x = 17
7) if you draw a line from T passing through the centre of the circle, it will divide the triangle into two congruent triangles
Perimeter = 2(5+7+9) = 42 in
A student in statistics argues that the concepts of mutually exclusive events and independent events are really the same, and that if events are mutually exclusive they must be independent. Do you agree with this statement
Answer:
No, Mutually exclusive events and Independent events are not the same.
Step-by-step explanation:
Mutually exclusive events and Independent events are not the same.
Mutually Exclusive Events:Mutually exclusive events are those events that cannot occur together, i.e. they cannot take place at the same time.
For example, the events of tossing a Head and Tails are mutually exclusive. This is because when a coin is flipped it cannot land on both sides at once.
Independent Events:Independent events are those events that can occur at the same time without affecting each other, i.r. they are not dependent on the occurrence of other events in the sample space.
For example, on rolling two fair die the events of first die rolling 4 and the second die rolling 1 are independent.
Final answer:
Mutually exclusive events cannot occur simultaneously, which means P(A AND B) = 0. Independent events occur independently of each other, and their combined probability is P(A AND B) = P(A)P(B). They are different concepts; being mutually exclusive does not imply events are independent.
Explanation:
No, the statement that mutually exclusive events and independent events are the same is incorrect. Mutually exclusive events are two or more events that cannot happen at the same time. For example, when tossing a coin, the events of landing on heads and tails are mutually exclusive because the coin cannot land on both sides at once. This means that P(A AND B) = 0 for mutually exclusive events A and B.
Independent events, however, are those where the occurrence of one event does not affect the probability of the other event occurring. In other words, events A and B are independent if the probability of A occurring is the same, regardless of whether B has occurred, and vice-versa. This means that P(A AND B) = P(A)P(B) for independent events A and B.
Therefore, while mutually exclusive events must have a combined probability of zero (they cannot both occur), independent events are characterized by one event's occurrence not influencing the probability of the other event occurring. Essentially, mutually exclusive deals with the impossibility of events happening simultaneously, whereas independence is about the absence of any causal connection between them.
Local phone numbers consist of seven numerals, the first three of which are common to many users. A small town's phone numbers all start with 313, 359, or 387. How many phone numbers are available?
Answer:
30,000 phone numbers.
Step-by-step explanation:
If the first three numbers are already defined then it means that only the other 4 digits remain to be defined.
The solution would be the number of numbers between 0000 and 9999, because the order here matters, since each number is different.
Therefore between these two numbers there are a total of 10,000 numbers, that is to say that for each of the three initial numbers there are 10,000 numbers, therefore in the town there are a total of 30,000 numbers.
Final answer:
The small town has 30,000 available telephone numbers.
Explanation:
To calculate the number of available telephone numbers in the small town, we need to consider that local phone numbers have seven digits, with the first three being the telephone exchange numbers. The town uses three different telephone exchanges: 313, 359, and 387. Since the last four digits of a phone number can range from 0000 to 9999, that means there are 10,000 possible combinations for the last four digits.
Since there are three possible telephone exchanges, each with 10,000 combinations for the remaining four digits, we calculate the total number of available phone numbers by multiplying the number of exchanges by the number of combinations per exchange:
Number of exchanges x 10,000 (combinations per exchange) = Total number of phone numbers
3 x 10,000 = 30,000
Therefore, the small town has 30,000 available telephone numbers.
Solve the system of equations.
-5y+6x=40
3y-8x=-46
x=
y=
Answer:
X=5
Y=-2
Step-by-step explanation:
Answer:
x = 5
y = -2
Step-by-step explanation:
Let's solve the system of equations, this way:
-5y + 6x = 40
3y - 8x = -46
******************
-5y + 6x = 40
6x = 40 + 5y
x = (40 + 5y)/6
******************
Substituting x and solving for y in the 2nd equation:
3y - 8x = - 46
3y - 8 * [(40 + 5y)/6] = - 46
3y - (320 + 40y)/6 = - 46
18y - 320 - 40y = - 276 (Multiplying by 6 at both sides)
-22y = - 276 + 320 (Adding 320 at both sides)
-22y = 44
y = -44/22
y = -2
**************************
Solving for x in the 1st equation:
-5y + 6x = 40
-5 * - 2 + 6x = 40
10 + 6x = 40
6x = 40 - 10 (Subtracting 10 at both sides)
6x = 30
x = 30/6
x = 5
A parabola can be drawn given a focus of ( 6 , − 5 ) (6,−5) and a directrix of y = 1 y=1. Write the equation of the parabola in any form. -12 -10 -8 -6 -4 -2 2 4 6 8 10 12 -12 -10 -8 -6 -4 -2 2 4 6 8 10 12
Answer:
y = -(1/12)(x -6)² -2
Step-by-step explanation:
The vertex of the parabola is halfway between the focus and the directrix, so has y-coordinate (-5+1)/2 = -2. The difference in the y-coordinates between the focus and the vertex is ...
p = -5 -(-2) = -3
An equation of the parabola with vertex (h, k) and focus-vertex distance p can be written:
y = 1/(4p)(x -h)² +k
For (h, k) = (6, -2) and p = -3, the equation is ...
y = (-1/12)(x -6)² -2
A CHAIR regular is 349.It is on clearance for 30% off and a customer uses a 15% off coupon after that. What is the final cost of the chair before sales tax
Answer:
$207.655
Step-by-step explanation:
Firstly, we calculate the value taken off the cost by the clearance sales tag.
That would be 30/100 * 349 =104.7
We subtract this from the original = 349-104.7 = 244.3
Now, he applied a 15% coupon. That would be 15/100 * 244.3 = 36.645
The cost of the chair before sales tax = 244.3-36.645 = 207.655
HELP PLEASE!
Solve the system of equations
[tex]\left \{ {x+4y=-2} \atop {-5x+5y=10}} \right.[/tex]
Answer: x = - 2
y = 0
Step-by-step explanation:
The given system of linear equations is expressed as
x + 4y = - 2 - - - - - - - - - - - - - 1
- 5x + 5y = 10- - - - - - - - - - - - - 2
We would eliminate x by multiplying equation 1 by 5 and equation 2 by 1. It becomes
5x + 20y = - 10
- 5x + 5y = 10
Adding both equations, it becomes
25y = 0
Dividing both sides by 25, it becomes
y = 0/25 = 0
Substituting y = 0 into equation 1, it becomes
x + 4 × 0 = - 2
x = - 2
The system of equations have only one solution.
4 game dice have been rolled out. Find the probability that all of the same points will drop.
please
Answer:
1/216
Step-by-step explanation:
n{1111,2222,3333,4444,5555,6666}=6
number of every cases =6×6×6×6
6/6^4=1/6^3=1/216
Answer:
1/216.
Step-by-step explanation:
The probability that all the 4 dice will show a 1 = (1/6)^4.
There are also 5 other possible outcomes: 4 2's , 4 3's etc.
So the required probability = 6 * (1/6)^4
= 6 * 1/1296
= 1/216.
If the risk-free rate is 7 percent, the expected return on the market is 10 percent, and the expected return on Security J is 13 percent, what is the beta of Security J
Answer:
0.02 or 2% = Beta
Step-by-step explanation:
Given that,
Risk-free rate = 7 percent
Expected return on the market = 10 percent
Expected return on Security J = 13 percent
Therefore, the beta of Security J is calculated as follows;
Expected return on Security J = Risk-free rate + Beta (Expected return on the market - Risk-free rate)
13 percent = 7 percent + Beta (10 percent - 7 percent)
0.13 - 0.07 = 0.03 Beta
0.06 = 0.03 Beta
0.06 ÷ 0.03 = Beta
0.02 or 2% = Beta
What are the eight-digit grid coordinates for benchmark 86 (circled in red)?
Without a map or structured dataset, it is not possible to provide the eight-digit grid coordinates for benchmark 86 as requested.
Explanation:The student asked for the eight-digit grid coordinates for benchmark 86, which is circled in red. To determine the eight-digit grid coordinates, we need a map with grid lines or specific information that provides the exact location of benchmark 86. Unfortunately, the data provided does not contain adequate information to pinpoint the exact eight-digit grid coordinates for this benchmark. Grid coordinates are typically derived from a more structured dataset or map rather than the types of numbers presented in the question. Those appear to be an arbitrary sequence of numbers and are not formatted as grid coordinates, which usually consist of an easting and a northing.
Find the range and the interquartile range.
57,96,72,63,88
The range is 39
The interquartile range is 32
Explanation:
The given data is [tex]57,96,72,63,88[/tex]
Let us arrange the data in ascending order.
Thus, we have,
[tex]57,63,72,88,96[/tex]
We need to determine the range and interquartile range of the data.
Range:
The range of the data is the difference between the highest and the lowest value in the given data.
Highest value = 96
Lowest value = 57
Range = Highest value - Lowest value
= 96 - 57
= 39
Thus, the range of the data is 39
Interquartile range:
The interquartile range is the difference between the upper quartile and the lower quartile in the given data.
From, the given data, we have, 3 quartiles. They are [tex]Q_1 , Q_2[/tex] and [tex]Q_3[/tex]
[tex]Q_2=72[/tex]
[tex]Q_1=\frac{57+63}{2} =60[/tex]
[tex]Q_3=\frac{88+96}{2} =92[/tex]
Interquartile range = [tex]Q_3-Q_1[/tex]
= [tex]92-60[/tex]
= [tex]32[/tex]
The interquartile range is 32
List the data set from least to greatest:
57, 63, 72, 88, 96
Range: Highest value - Lowest value = answer
Range: 96 - 57 = 39
(IQR) Interquartile Range: Upper quartile - Lower quartile = answer
(IQR) Interquartile range: 88.5 - 57.5 = 31
Jane must select three different items for each dinner she will serve. The items are to be chosen from among five different vegetarian and four different meat selections. If at least one of the selections must be vegetarian, how many different dinners could Jane create?
A. 30
B. 40
C. 60
D. 70
E. 80
Answer:
E. 80
Step-by-step explanation:
First consider exactly what the problem is asking. You have to make a dinner and AT LEAST one of the dishes has to be vegetarian. So then we could have all three be vegetarian (V V V), 2 vegetarian with one meat (V V M), or one vegetarian with 2 meat (V M M). If I can find the number of arrangements possible for each of the possibilities and add them, we should have our answer.
Consider first the all vegetarian option. There are 5 vegetarian meals on the menu and we may choose 3 of them. This will be a combination since the order in which we choose doesn't matter. For example if my 5 vegetarian dishes are salad, hummus, rice, lentils and pasta, it doesn't matter what order I serve them in, since they will all be a part of the meal. Simply put, placing hummus, rice, and lentils on the table is the same as placing rice, lentils and hummus on the table if everybody shares the dishes. If I had specific guests assigned to the each dish then the order would matter, and it would be a permutation. For example if three of Jane's guests, (lets say Mike, Frank, and Bob) are going to have a specific dish, then the arrangement where Mike has rice, Bob has lentils, and Frank has pasta is different from the arrangement where Mike has lentils, Bob has rice, and Frank has pasta. Since there is no mention of a specific order this has to go in, it is safe to assume a combination. So how many ways can we choose 3 vegetarian dishes from 5 options? This will be 5 C 3.
So we found that (V V V) gives us 5 C 3, so lets examine the other remaining cases. (V V M) implies from 5 vegetarian options we can choose 2 and from 4 meat options we choose one. Then (V V M) gives us 5 C 2 * 4 C 1. Likewise for (V M M) we can say 5 C 1 * 4 C 2.
Putting it all together we have 5 C 3 + 5 C 2 * 4 C 1 + 5 C 1 * 4 C 2. 10 + 10*4 +5 *6 =80.
what is the approximate volume of the cylinder? use 3.14 for TT 7 cm radius 26 cm height
The volume of the cylinder is [tex]4000.36 \ cm^3[/tex]
Explanation:
Given that the radius of the cylinder is 7 cm
The height of the cylinder is 26 cm
We need to find the volume of the cylinder.
The volume of the cylinder can be determined using the formula,
[tex]Volume = \pi r^2 h[/tex]
Let us substitute the values [tex]\pi= 3.14[/tex] , [tex]r=7[/tex] and [tex]h=26[/tex] in the above formula.
Thus, we have,
[tex]Volume = (3.14)(7)^2(26)[/tex]
Simplifying the terms, we get,
[tex]Volume = (3.14)(49)(26)[/tex]
Multiplying the terms, we have,
[tex]Volume = 4000.36 \ cm^3[/tex]
Thus, the approximate volume of the cylinder is [tex]4000.36 \ cm^3[/tex]
For how many values of k is it true that |k - 3| + 2 is equal to one?
A) One
B) Two
C) None
D) More than two
Answer:
C) None
Step-by-step explanation:
|k - 3| + 2 = 1
|k - 3| = -1
Which is not possible because a mod can never be negative
Final answer:
There are zero values of k that make the equation |k - 3| + 2 = 1 true because the absolute value of any number cannot be negative.
Explanation:
To determine for how many values of k the equation |k - 3| + 2 = 1 is true, we need to consider what the absolute value represents. The absolute value of a number is its distance from 0 on the number line, regardless of direction.
Thus, |k - 3| represents the distance of k from 3.
First, we simplify the equation by subtracting 2 from both sides:
|k - 3| = -1
Since the absolute value of a number is always non-negative, there can be no real number k that would make |k - 3| equal to -1.
Therefore, there are zero values of k that would satisfy the original equation.
Of the 20 members of a kitchen crew, 17 can use the meat-cutting machine, 18 can use the bread-slicing machine, and 15 can use both machines. If one member of the crew is to be chosen at random, what is the probability that the member chosen will be someone who cannot use either machine?
Step-by-step explanation:
The total number of members in the crew = 20
The number of people able to use meat machine = 17 ⇒n (M) = 17
The number of people able to use bread machine = 18 ⇒n (B) = 18
The number of people able to use both machine = 15 ⇒n (M∩B) = 15
Now, a person is chosen at random:
Let us assume the number of people who cannot use either machine = K
Now,as we know:
[tex]n(A\cup B) = n(A) + n(B) - n(A\cap B)[/tex]
So, the number of people who can use either of the machines
=n (M) + n(B) - n(M∩B) = 17 + 18 - 15 = 20
So, there are 20 people who can use either of the two machines.
Also, as given the total number of people in the crew = 20.
Hence, from the above statement it is clear that there exists no person who can not use either of the machines.
So, such probability = 0
A prism with a base area of 8 cm² and a height of 6 cm is dilated by a factor of 54 . What is the volume of the dilated prism? Enter your answer, as a decimal, in the box
Question:
A prism with a base area of 8 cm² and a height of 6 cm is dilated by a factor of 5/4 .
What is the volume of the dilated prism?
Enter your answer, as a decimal, in the box.
Answer:
The volume of the dilated prism is [tex]93.75 \ {cm}^{3}[/tex]
Explanation:
A prism with a base area of 8 cm² and a height of 6 cm
The volume of the prism can be determined by the formula, [tex]V=Bh[/tex]
Volume of the prism is given by
[tex]V=Bh[/tex]
[tex]V=(8)(6)[/tex]
[tex]V=46\ cm^3[/tex]
Thus, the volume of the prism is [tex]46 \ {cm}^{3}[/tex]
It is also given that the volume of the dilated prism is dilated by a factor of [tex]\frac{5}{4}[/tex]
Hence, the new volume is given by
[tex]Volume = 48(\frac{5}{4} )^3[/tex]
[tex]=48(\frac{125}{64} )[/tex]
[tex]=48(1.953125)[/tex]
[tex]=93.75 \ {cm}^{3}[/tex]
Thus, the volume of the dilated prism is [tex]93.75 \ {cm}^{3}[/tex]
Final answer:
The volume of the dilated prism is 93.75 cm³ after applying the dilation factor of 5/4 to the original volume.
Explanation:
To find the volume of the dilated prism, we must apply the dilation factor to the original dimensions of the prism. Since a volume is a three-dimensional measure, the dilation affects all three dimensions (the base area and the height). The dilation factor is given as 5/4.
We must raise this factor to the third power when dealing with volumes, since we are dealing with three dimensions. Therefore, the original volume, V, of the prism is the base area multiplied by the height, which is:
V = 8 cm² × 6 cm = 48 cm³.
Applying the dilation factor, the volume V' of the dilated prism is:
V' = V × (5/4)³.
First, calculate:
(5/4)³3 = 125/64.
Then multiply the original volume by this factor:
V' = 48 cm³ × (125/64) = (48 × 125) / 64 = 6000 / 64 = 93.75 cm³.
Factor the expression. 6x^2 + 5x + 1
(3x – 1)(2x – 1)
(3x – 1)(2x + 1)
(3x + 1)(2x + 1)
(3x + 1)(2x – 1)
Answer:
Option C
Step-by-step explanation:
6x² +5x + 1
6x² + 3x + 2x + 1
3x(2x + 1) + 1(2x + 1)
(3x + 1)(2x + 1)
Answer: C
Step-by-step explanation: Answer is C
g A group of people were asked if some psychics can help solve murder cases. 175 responded "Yes", and 474 responded "To". Find the probability that if a person is chosen at random, the person believes some psychics can help solve murder cases.
Answer:
0.2696
Step-by-step explanation:
Number of People who responded Yes=175
Number of People who responded No=474
Total Number of Respondents=175+474=649
We want to determine the Probability that a person chosen at random believes that psychic can help solve murder cases.
Now,
[TeX]Probability=\frac{Number of Possible Outcome}{Total Number of Outcomes}[/TeX]
Number who believe psychic can help solve murder cases=175
Total Number=649
Therefore:
P(a person chosen at random person believes some psychics can help solve murder cases) = [TeX]\frac{175}{649}=0.2696[/TeX]
Final answer:
The probability that a randomly chosen person believes some psychics can help solve murder cases is 175 divided by the total number of respondents (649), resulting in approximately 26.96%.
Explanation:
The question asks for the probability that a chosen person believes some psychics can help solve murder cases, given that out of a group, 175 said 'Yes' and 474 said 'No'. To find this probability, divide the number of people who believe psychics can help (175) by the total number of people asked (175 + 474).
Steps to Calculate the Probability:
Calculate the total number of responses: 175 (Yes) + 474 (No) = 649.
Calculate the number of positive responses (people who believe psychics can help): 175.
Divide the number of positive responses by the total number of responses: Probability = 175 / 649.
Perform the division to get the probability.
Therefore, the probability that a person chosen at random believes some psychics can help solve murder cases is 175/649 or approximately 0.2696, which can be expressed as 26.96%.
Determine whether the statement is sometimes, always, or never true.
If ax + b - 4 = b and a doesn't = 0 then x = 4/a
sometimes
always
not enough information provided
never
Answer:
always true
Step-by-step explanation:
Adding 4-b to both sides of the equation gives ...
ax = 4
Then dividing by "a" gives ...
x = 4/a
This is always true when a≠0.
According to the journal of irreproducible results, any obtuse angle is a right angle! c d b p here is their argument. given the obtuse angle x, we make a quadrilateral abcd with \dab = x, and \abc = 90 , and ad = bc. say the perpendicular bisector to dc meets the perpendicular bisector to ab at p. then pa = pb and pc = p
d. so the triangles p ad and p bc have equal sides and are congruent. thus \pad = \pbc. but pab is isosceles, hence \pab = \pba. subtracting, gives x = \pad \pab = \pbc \pba = 90 . this is a preposterous conclusion – just where is the mistake in the "proof" and why does the argument break down there?
Answer:
The mistake stems from the assumption that angle dab and abc are both 90 and ad = bc and that the perpendicular bisector of dc is different from the perpendicular bisector to ab because they are the same and abcd is a rectangle.
Step-by-step explanation:
If ∡dab = ∡abc and side ab is equal to side bc which are opposite sides, ten then ab is parallel to bc which means the quadrilateral is parallelogram. Also since two angles of the four angles of the parallelogram are 90 degrees then the parallelogram is a rectangle.
The bisector of one side of a rectangle will also bisect the opposite side of the rectangle. Therefore the bisector of dc is the same as the bisector of ab and it meets ab at the midpoint of ab. Therefore p is now at the midpoint of ab and there are no triangles pad and pbc.
Graph the function g(x)= -3/(x^2-4) . What is the domain of g(x)? Explain your reasoning. Do not completely trust calculator or computer graphs of this function.
can anyone help
Answer:
Find where the expression [tex]\frac{3}{(x+2)(x-2)}[/tex]
is undefined.
List all of the vertical asymptotes:
[tex]x=2, -2[/tex]
This is what your graph would look like:
Most evenings after dinner Duarte spends 30 3030 minutes playing chess with his dad. Write an equation for the number of minutes, m mm, that Duarte spent playing chess with his dad if they played chess together e ee evenings
Answer:
im sorry but that question makes o sense
Step-by-step explanation:
one pipe fills a store pool in 12 hours. A second pipe fills the same pool in 6 hours. When a third pipe is added and all three are uset otill the pool, it only takes 3 hours. Find how long it takes the third pipe to do the job
Answer:
x = 12 hours
Step-by-step explanation:
If one pipe fills store pool in 12 hours in 1 hour will fill 1/12 of the pool
If one pipe fills a store pool in 6 hours in 1 hour will fill 1/6 of the pool
Let call " x " number of hours needed by the third pipe to fills the pool
then in 1 hour will fill 1/x
The three pipes working together in 1 hour will fill
1/12 + 1/6 + 1/x
Now we know that the three pipes take 3 hours to fill the pool then in 1 hour three pipes will fill 1/3 of the pool, therefore
1/12 + 1/6 + 1/x = 1/3
( x + 2*x + 12) /12*x = 1/3 ⇒ ( 3*x +12 )/ 12*x = 1/3
9*x + 36 = 12*x
- 3*x = - 36
x = 36/3
x = 12 hours
Final answer:
The third pipe, when operating alone, takes 12 hours to fill the pool. This is found by calculating the combined rate of the first two pipes, then the rate of all three, and deducting to find the third pipe's alone rate.
Explanation:
The question asks how long it takes for a third pipe to fill a pool when utilized alongside two other pipes, where one fills the pool in 12 hours, another in 6 hours, and all three together in 3 hours. This is a rate of work problem, commonly encountered in algebra and practical mathematics. To solve, we first find the rates at which each individual pipe fills the pool and then calculate the third pipe's rate.
Determine the rate at which each pipe fills the pool. The first pipe fills the pool at a rate of 1/12 of the pool per hour, and the second at 1/6 of the pool per hour.
Add these rates to determine the combined rate when the two pipes are working together: (1/12) + (1/6) = 1/12 + 2/12 = 3/12 = 1/4. So, the two pipes fill the pool at a rate of 1/4 of the pool per hour together.
When the third pipe is added, all three fill the pool in 3 hours, which means their combined rate is 1/3 of the pool per hour. The rate of the third pipe alone can be found by subtracting the rate of the first two pipes from this combined rate: (1/3) - (1/4) = 4/12 - 3/12 = 1/12.
Therefore, the third pipe fills the pool at a rate of 1/12 of the pool per hour on its own. To find the time it takes for the third pipe to fill the pool by itself, we take the reciprocal of its rate, resulting in 12 hours.
A bag contains 4 red, 5 blue, and 6 green marbles: One blue marble is selected and NOT replaced. If a 2nd marble is drawn, what is the probability that the 2nd marble drawn is a blue marble? Write your answer as a simplified fraction.
Answer:
2/7
Step-by-step explanation:
To find the this first you need the total number of marbles minus one since the blue marble was taken.
4+5+6-1=14
after one blue marble being picked there are 4 blue left, so the fraction is
4/14 and after being simplified it is 2/7
Answer:
the true is the answer is g
Step-by-step explanation: