a. No, w is not in fv1; v2; v3g. There are three vectors in fv1; v2; v3g.
b. There are three vectors in the span of fv1; v2; v3g.
c. No, w is not in the subspace spanned by fv1; v2; v3g. This is because the subspace is the set of all linear combinations of the vectors in the span, and w does not have to be a linear combination of the vectors in the span.
To prove this, we first need to recall the definition of the span: it is the set of all linear combinations of a set of vectors. A linear combination is a sum of the vectors, multiplied by constants. For example, if we have a vector v1, and two constants a and b, then the linear combination of a*v1 and b*v1 is (a + b)*v1. If a vector w is not a linear combination of v1, then w is not in the span of v1.
The same logic applies to the vectors fv1; v2; v3g. If w is not a linear combination of these three vectors, then w is not in the subspace spanned by these three vectors. We can prove this by showing that w cannot be a linear combination of fv1; v2; v3g. This is because the only way to create a linear combination of these vectors is to multiply them by constants, and since w is not one of the vectors, it cannot be multiplied by a constant. Therefore, w is not in the subspace spanned by fv1; v2; v3g.
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the area of one lateral face of a right pyramid with an equilateral triangular base is 75 square meters. if the slant height is 30 meters, what is the length of the side of its base, in meters?
A right pyramid with an equilateral triangular base has a lateral face with a surface area of 75 square meters. The side of the base of a slant with a height of 30 meters is 5 meters long.
Let’s call the side length of the equilateral triangular base “s”. We know that the area of one lateral face is 75 square meters, and that face is a triangle with base s and height 30 meters (the slant height). We can use the formula for the area of a triangle to solve for s:
Area = (1/2) * base * height
75 = (1/2) * s * 30
Simplifying the equation, we get:
75 = 15s
s = 75/15
s = 5
Therefore, the length of the side of the equilateral triangular base is 5 meters.
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a poll was taken asking people if they agreed with the positions of the 4 candidates for a county office. does the pie chart present a good representation of this data? explain.
The pie chart accurately represents the data from the poll, as it accurately shows the proportion of people who agreed with each candidate's positions.
The pie chart presents a good representation of the data from the poll taken asking people if they agreed with the positions of the 4 candidates for a county office. This is because the pie chart accurately shows the proportion of people who agreed with each candidate's positions. For example, the chart indicates that 26% of the people agreed with Candidate A's positions, 28% agreed with Candidate B's positions, 29% agreed with Candidate C's positions, and 17% agreed with Candidate D's positions. In order to calculate the proportions, the total number of people who responded to the poll was divided by each individual candidate's number of supporters. For example, for Candidate A, the proportion of people who agreed with their positions was calculated by dividing the total number of people responding to the poll (100) by the number of people who agreed with Candidate A's positions (26), resulting in a proportion of 0.26 or 26%. This same approach was used to calculate the proportions of each candidate's supporters. Therefore, the pie chart accurately presents the data from the poll and is a good representation of the data.
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Blake decides to estimate the volume of a coffee cup by modeling it as a right cylinder. Blake measures its radius as 2.7 cm and its volume as 174 cubic centimeters. Find the height of the cup in centimeters. Round your answer to the nearest tenth if necessary.
The height of the coffee cup is approximately 4.1 cm.
Equations
h = V / (π[tex]r^{2}[/tex])
Plugging in the given values, we get:
h = 174 / (π × [tex]2.7^{2}[/tex])
h ≈ 4.1 cm
Therefore, the height of the coffee cup is approximately 4.1 cm.
What is the difference between total surface area and lateral surface area of a cylinder?The total surface area of a cylinder is the sum of the areas of its curved surface and its two circular bases, while the lateral surface area of a cylinder is the area of its curved surface only, without the bases.
To be more precise, if a cylinder has a height of "h", a radius of "r", and a base circumference of "c", then:
The total surface area of the cylinder is given by: 2πr² + 2πrh = 2πr(r+h) + 2πr² = 2πr(r+h+c)
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A triangle has two sides 4 and 15 what value could the length of the third side be
The answers
are 12, 15, 13
__________________________________________________________
The sum of two sides must be equal to or greater than the third side.
4+15 = 19; 4 + 19 = 23; 15 + 19 = 34.
19 is a possible answer.
4 + 15 = 19; 15 + 15 = 30
15 is a possible answer.
4 + 15 = 19; 4 + 13 = 17; 15 + 13 = 28
13 is a possible answer.
4 + 12 = 16; 4 + 15 = 19; 15 + 12 = 27
12 is a possible answer.
4 + 11 = 15; 4 + 15 = 19; 11 + 15 = 26
11 is a possible answer.
15 + 4 = 19; 4 + 4 = 8
4 is NOT a possible answer because 4 + 4 is less than 15.
--------------------------------------HAVE A NICE DAY--------------------------------------------
The number of milligrams D(h) in a patient’s bloodstream h hours after the drug is injected is modeled by the following function D (h) =50e^-0.2h
Find the initial amount injected and the amount in the bloodstream after 7 hours. Round your answers to the nearest hundredth as necessary
The initial amount injected was 50 milligrams and after 7 hours, there are approximately 16.08 milligrams of the drug in the patient's bloodstream.
How to calculate initial amount injected and the amount in the bloodstream after 7 hours.The function that models the number of milligrams D(h) in a patient's bloodstream h hours after the drug is injected is:
D(h) = 50e^(-0.2h)
To find the initial amount injected, we can evaluate D(0):
D(0) = 50e^(-0.2*0) = 50e^0 = 50
Therefore, the initial amount injected was 50 milligrams.
To find the amount in the bloodstream after 7 hours, we can evaluate D(7):
D(7) = 50e^(-0.2*7) ≈ 16.08
Therefore, after 7 hours, there are approximately 16.08 milligrams of the drug in the patient's bloodstream.
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Determine whether it is possible to find values of L 0 so that the given boundary-value problem has precisely one nontrivial solution, more than one solution, no solution, and the trivial solution. (Let k represent an arbitrary integer. If an answer does not exist, enter DNE.) y" + 16y=0, y(0)= 1, y(L) = 1 (a) precisely one nontrivial solution (b) more than one solution (c) no solution (d) the trivial solution
There is no solution if the boundary conditions are inconsistent, i.e., if y(0) ≠ y(L) = 1.
We are given the boundary-value problem:
y" + 16y = 0, y(0) = 1, y(L) = 1
The characteristic equation is r^2 + 16 = 0, which has roots r = ±4i.
The general solution to the differential equation is then y(x) = c1cos(4x) + c2sin(4x).
Using the boundary conditions, we get:
y(0) = c1 = 1
y(L) = c1cos(4L) + c2sin(4L) = 1
Substituting c1 = 1 into the second equation, we get:
cos(4L) + c2*sin(4L) = 1
Solving for c2, we get:
c2 = (1 - cos(4L))/sin(4L)
Thus, the general solution to the differential equation that satisfies the given boundary conditions is:
y(x) = cos(4x) + (1 - cos(4L))/sin(4L)*sin(4x)
Now, we can answer the questions:
(a) To have precisely one nontrivial solution, we need the coefficients c1 and c2 to be uniquely determined. From the above expression for c2, we see that this is only possible if sin(4L) is nonzero. Thus, if sin(4L) ≠ 0, there exists precisely one nontrivial solution.
(b) If sin(4L) = 0, then c2 is undefined and we have a family of solutions that differ by a constant multiple of sin(4x). Hence, there are infinitely many solutions.
(c) There is no solution if the boundary conditions are inconsistent, i.e., if y(0) ≠ y(L) = 1.
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There are 3.2 liters of iced tea in a pitcher. How many milliliters of iced tea are in the pitcher?
Answer:3200
Step-by-step explanation:
there are 1000 ml per liter
how many different 5-digit sequences can be formed using the digits 0, 1,...,6 if repetition of digits is allowed?
In the following question, among the conditions given, With digit combinations, there are 16,807 different 5-digit sequences that can be formed using the digits 0, 1,...,6 if repetition of digits is allowed.
To solve this problem, we can use the fundamental counting principle or multiplication rule. It states that if there are m ways to do one thing, and n ways to do another thing, then there are m*n ways to do both things. Therefore, to find the number of different 5-digit sequences that can be formed using the digits 0, 1,...,6 if repetition of digits is allowed, we can multiply the number of choices at each position. Since repetition is allowed, each of the five positions has 7 possible digits (0, 1, 2, 3, 4, 5, or 6). Thus, the total number of possible 5-digit sequences is:7 × 7 × 7 × 7 × 7 = 7^5 = 16,807Therefore, there are 16,807 different 5-digit sequences that can be formed using the digits 0, 1,...,6 if repetition of digits is allowed.
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There are 16,807 different 5-digit sequences that can be formed using the digits 0, 1,...,6 if repetition of digits is allowed.
To find out the number of different 5-digit sequences that can be formed using the digits 0, 1,...,6 if repetition of digits is allowed, we can use the fundamental principle of counting or multiplication principle.The fundamental principle of counting states that if there are n different ways of performing the first task, and for each of these n ways of performing the first task there are m different ways of performing the second task, then the total number of different ways of performing both tasks is n x m.
To apply this principle to this problem, we can consider each digit in the 5-digit sequence as a task. The first task is to choose a digit from 0, 1,...,6, which can be done in 7 ways since there are 7 digits to choose from. Similarly, for each of the first 5 digits, there are 7 ways to choose a digit from 0, 1,...,6, so the total number of different 5-digit sequences that can be formed with repetition of digits allowed is 7 x 7 x 7 x 7 x 7 = 7^5 = 16,807.
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its special angles, please show work
Answer:
H=25
I=36
Step-by-step explanation:
if repairing a machine has already taken two hours and the repair person is not done, what is the probability that it will take 3 or more hours to repair the machine?
The probability of the repair person taking 3 or more hours to fix the machine is 0.3, or 30%.
As an AI language model, I do not have the specific information needed to answer this question. However, we can use probability theory to solve this problem.
Let's assume that the probability of repairing the machine in 2 hours or less is p, and the probability of taking more than 2 hours is q (which is the same as saying the probability of taking 3 or more hours).
We know that p + q = 1, meaning that the sum of the probabilities of repairing in 2 hours or less and taking more than 2 hours is equal to 1, which represents the total probability.
Now, if we know the value of p, we can easily calculate q by subtracting it from 1:
q = 1 - p
For example, if we assume that the probability of repairing in 2 hours or less is 0.7, then the probability of taking more than 2 hours is:
q = 1 - 0.7 = 0.3
So, in this case, the probability of the repair person taking 3 or more hours to fix the machine is 0.3, or 30%.
However, without knowing the specific probabilities of the repair person finishing within 2 hours or the probabilities of taking longer, we cannot provide an accurate answer to this question.
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A plant in my garden is growing 2/3 of a foot every 3/4 of a month. How much does it grow per month?
The plant is growing 0.89 feet per month.
To calculate how much a plant grows per month, you need to first convert the measurements into one unit of measurement.
Since the plant is growing 2/3 of a foot every 3/4 of a month,
we can first convert the fractions of a foot and a month into decimal equivalents.
2/3 of a foot is 0.67 feet, and 3/4 of a month is 0.75 months.
We can then calculate the amount of growth per month by dividing the amount of growth per 3/4 of a month by the amount of time that is 3/4 of a month (0.75).
The equation is 0.67 feet / 0.75 months = 0.89 feet per month.
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A 3.0kg ball and a 1.0kg ball are placed at opposite ends of a massless beam so that the system is i equilibrium as shown. What is the value of the ratio of the lengths, b/a?
To find the value of the ratio b/a for the 3.0 kg ball and the 1.0 kg ball placed at opposite ends of a massless beam in equilibrium, we can use the principle of moments.
Solution:
Step 1: Identify the forces and distances involved. The 3.0 kg ball has a force of 3.0g (g represents gravity) acting at distance a from the pivot point. The 1.0 kg ball has a force of 1.0g acting at distance b from the pivot point.
Step 2: Apply the principle of moments. For the system to be in equilibrium, the clockwise moment and anticlockwise moment must be equal. This means that the product of the force and distance for each ball must be equal:
3.0g × a = 1.0g × b
Step 3: Solve for the ratio b/a. First, divide both sides of the equation by g:
3.0a = 1.0b
Now, divide both sides of the equation by 3.0a:
b/a = 1/3
The value of the ratio b/a is 1/3.
The ratio is 1:3
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for each model, choose categorical or numeric for the explanatory and response variables. for simple linear regression, the explanatory variable is
For simple linear regression, the explanatory variable is numeric.
What is simple linear regression?Simple linear regression is a statistical method that allows researchers to understand the relationship between two continuous variables. A simple linear regression model is used to represent the relationship between a dependent variable (Y) and an independent variable (X) by making a linear equation of the form
Y = a + bX, where a is the constant, and b is the regression coefficient.
In simple linear regression, the explanatory variable is of numeric type. This statistical method involves the use of two numeric variables, namely the explanatory (independent) variable and the response (dependent) variable, which are analyzed to establish a linear relationship between them.
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The cross product of two vectors in R3 is defined by (a1, a2, a3) × (b1, b2, bз) = (a2b3 — aзb2, aзb1 — a1bз, a12 — ab1). Letv = (-1,3, 0). Find the matrix A of the linear transformation from R3 to R3 given by T(x) = V x X.
The given cross product formula is slightly incorrect. The correct cross product of two vectors in R3 is defined by (a1, a2, a3) × (b1, b2, b3) = (a2b3 - a3b2, a3b1 - a1b3, a1b2 - a2b1). We are given vector v = (-1, 3, 0) and asked to find the matrix A of the linear transformation [tex]T(x) = v × x.[/tex]
Let x = (x1, x2, x3) be a vector in R3. Then, using the cross product formula, we have:
T(x) =[tex]v × x = (-1, 3, 0) × (x1, x2, x3) = (3x3 - 0x2, 0x1 - (-1)x3, (-1)x2 - 3x1)[/tex]
T(x) =[tex](3x3, x3, -x2 - 3x1)[/tex]
Now, we can express the linear transformation as a matrix A multiplied by the vector x:
[tex]A * (x1, x2, x3) = (3x3, x3, -x2 - 3x1)[/tex]
The matrix A can be found by comparing the components of the vectors:
A = | 0 -3 0 |
| 0 0 1 |
|-3 -1 3 |
So, the matrix A of the linear transformation from R3 to R3 given by T(x) = v × x is:
A = | 0 -3 0 |
| 0 0 1 |
|-3 -1 3 |
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Ricardo throws a stone off a bridge into a river below.
The stone's height (in meters above the water), x seconds after Ricardo threw it, is modeled by
w ( x ) = − 5 ( x − 8 ) ( x + 4 )
How many seconds after being thrown will the stone reach its maximum height?
Therefore , the solution of the given problem of equation comes out to be the stone will reach its maximum height 2 seconds after being thrown.
What is an equation?Variable words are widely used in complex algorithms to show consistency between two contradictory claims. Academic expressions called equations are used to show the equality of various academic figures. Think about the information that y + 7 provides. When paired with construct y + 7, elevating results in b + 7 in this circumstance rather than another method that may divide 12 equal two halves.
Here,
The height of the stone above the water is given by the function:
=> w(x) = -5(x-8)(x+4)
To find the time when the stone reaches its maximum height, we need to find the vertex of the parabola that represents this function. We can do this by using the formula:
=> x = -b / 2a
where a = -5 and b = -5(8+(-4)) = -20.
Substituting these values into the formula, we get:
=> x = -(-20) / 2(-5) = 2
Therefore, the stone will reach its maximum height 2 seconds after being thrown.
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Pls just say a b c or d
Answer: theres no attachment
Step-by-step explanation:
Find Sum to infinity of the given series: a. 1 + 2x + 3x² + 4x³+... to ∞ (|x| <1)
The sum to infinity of the series 1 + 2x + 3x² + 4x³ + ... is 1/[(1-x)²] when |x| < 1.
How do we calculate?The formula for the sum of an infinite geometric series when |x| < 1 is given as:
S = a/(1-r)
We have a = 1 and r = x/1.
S = 1/(1-x) + 2x/(1-x)² + 3x²/(1-x)³ + 4x³/(1-x)⁴ + ...
we multiply both sides of this equation by (1-x)²,
S(1-x)² = (1-x) + 2x + 3x²(1-x) + 4x³(1-x)² + ...
S(1-x)² = 1 + x + x² + x³ + ... eqn (1)
Using the formula for the sum of an infinite geometric series when |x| < 1, we have:
1/(1-x) = 1 + x + x² + x³ + ...
Substituting this into equation (1), we get:
S(1-x)² = 1/(1-x)
S = 1/[(1-x)²]
In conclusion, the sum to infinity of the series 1 + 2x + 3x² + 4x³ + ... is 1/[(1-x)²] when |x| < 1
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in three combined decks of cards, what is the fewest number of cards you must pick at random to be guaranteed at least one four-of-a-kind?
four is the minimal because you want to draw all four to the four of a kind
after a (not very successful) trick or treating round, candice has 12 tootsie rolls and 10 twizzlers in her pillow case. her mother asks her to share the loot with her three younger brothers. (a) how many different ways can she do this?
Using the stars and bars technique, Candice can distribute her 24 pieces of candy among her four siblings in 2,925 different ways. If she must give each sibling at least one of each type of candy, there are 67,200 ways to distribute the candy among the four siblings.
(A) To solve this problem, we can use the technique of stars and bars. We have a total of 24 pieces of candy to share among four children. We can represent this using 24 stars, with 3 bars to separate the stars into four groups, one for each child. For example, the following arrangement represents giving 6 pieces of candy to the first child, 10 pieces to the second child, 3 pieces to the third child, and 5 pieces to the fourth child:
*****|**********|***|****
The number of ways to arrange the stars and bars is equal to the number of ways to choose 3 positions out of the 27 possible positions for the stars and bars. Therefore, the number of different ways that Candice can share her candy with her three younger brothers is:
C(27, 3) = 27! / (3! * 24!) = 2925
(B) Now, we need to ensure that each child receives at least one Tootsie roll and one Twizzler. We can give each child one of each candy to start, and then distribute the remaining 13 Tootsie rolls and 7 Twizzlers using the stars and bars technique. We have 13 Tootsie rolls and 7 Twizzlers to distribute among four children, which can be represented using 13 stars and 3 bars for the Tootsie rolls, and 7 stars and 3 bars for the Twizzlers. The number of ways to arrange the stars and bars for each type of candy is:
C(16, 3) = 560 for the Tootsie rolls
C(10, 3) = 120 for the Twizzlers
To find the total number of ways to distribute the candy, we can multiply the number of ways for each type of candy:
560 * 120 = 67200
Therefore, there are 67,200 different ways for Candice to share her candy with her three younger brothers after her mother asks her to give at least one of each type of candies to each of her brothers.
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Complete question:
After a (not very successful) trick or treating round, Candice has 15 Tootsie rolls and 9 Twizzlers in her pillow case. Her mother asks her to share some of the loot with her three younger brothers.
(A) How many different ways can she do this?
(B) How many different ways can she do this after her Mother asks her to give at least one of each type of candies to each of her brothers?
In which quadrant does the point (-18 , 17) lie?
A.
Quadrant II
B.
Quadrant IV
C.
Quadrant III
D.
Quadrant I
Answer:quadrant ll
Step-by-step explanation:
Juan has a large bag of rice that he placed in three different containers. He put 3.253.25 pounds into the first container. He put three times as much into the second container. He put twice as much into the third container as he put into the second container.
What is the weight in pounds of the rice in the second container and the third container?
Answer:
he puts 3.354.235 pounds in it
Step-by-step explanation:
because the synapses hypural torminal that's the only answer that make since.
Roberto plays on the school baseball team. In the last 10 games, Roberto was at bat 44 times. While at bat, Roberto got 11 hits and struck out 33 times. What is the experimental probability that Roberto will get a hit during his next time at bat?
The experimental probability that Roberto will get a hit during his next time at bat is 0.25 or 25%.
The experimental probability of an event is calculated by dividing the number of times the event occurred by the total number of trials.
In this case, the event is "getting a hit" and the number of times it occurred is 11. The total number of trials is 44, which represents the number of times Roberto was at bat.
Experimental probability of getting a hit = Number of times Roberto got a hit / Total number of times at bat
Experimental probability of getting a hit = 11 / 44
Experimental probability of getting a hit = 0.25 or 25%
Therefore, the experimental probability that Roberto will get a hit during his next time at bat is 0.25 or 25%.
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carbon-14 dating wood deposits recovered from an archaeological site contain 19% of the c-14 they originally contained. how long ago did the tree from which the wood was obtained die? (assume the half life of carbon-14 is 5,730 years. round your answer to the nearest whole number.)
The tree from which the wood was obtained died 13,729 years ago, considering the exponetial function that models the situation.
How to model an exponential function?The standard definition of an exponential function is given by the equation presented as follows:
[tex]A(t) = A(0)b^{\frac{t}{n}}[/tex]
The parameters of the exponential function with format above are given as follows:
A(0) is the initial value.b is the rate of change of the function.n is the time needed for the rate of change.The half-life of carbon-14 is 5,730 years, hence the parameters b and n have the values given as follows:
b = 0.5, n = 5730.
Then the exponential function for the amount of the substance after t years is given as follows:
[tex]A(t) = A(0)(0.5)^{\frac{t}{5730}}[/tex]
19% of the substance remained, hence the time is obtained as follows:
[tex]0.19A(0) = A(0)(0.5)^{\frac{t}{5730}}[/tex]
[tex](0.5)^{\frac{t}{5730}} = 0.19[/tex]
t = 5730 x log(0.19)/log(0.5)
t = 13,729 years.
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anderson went to the restaurant traveling 15 mph and returned home traveling 12 mph. if the total trip took 9 hours, how long did anderson travel at each speed?
Anderson traveled 15 mph to go to the restaurant and 12 mph to get home. Anderson went at 15 mph for 3 hours and at 12 mph for 6 hours. if the entire trip took 9 hours.
The given speed Anderson, the total time taken, and asked to find the time traveled at each speed:
Speed, [tex]S_1[/tex] = 15 mph
Speed, [tex]S_2[/tex] = 12 mph
Total time, [tex]t[/tex] = 9 hours
Time traveled with speed 1,
[tex]t_1[/tex] Time traveled with speed 2, [tex]t_2[/tex]
To solve the given problem, let's use the following formula:
Total [tex]t[/tex] (time) = [tex]t_1[/tex] ( time 1) + [tex]t_2[/tex] (time 2)
Now, time 1 can be represented as
[tex]t_1[/tex] (time 1) = [tex]d[/tex] (distance) / [tex]S_1[/tex] (speed 1)
Similarly, time 2 can be represented as:
[tex]t_2[/tex] (time 2) = [tex]d[/tex] (distance) / [tex]S_2[/tex] (speed 2)
Here, we need to find the time traveled at each speed. Let's use these equations to solve the given problem.
Time traveled with speed 1, [tex]t_1[/tex] = [tex]d[/tex] / [tex]S_1[/tex]
Time traveled with speed 2, [tex]t_2[/tex] = [tex]d[/tex] / [tex]S_2[/tex]
As we know the total time, we can find the value of d in terms of [tex]t[/tex].
So, [tex]d[/tex] = [tex]S_1[/tex] * [tex]t_1[/tex] = [tex]S_2[/tex] * [tex]t_2[/tex]
From the above equation, we can write: [tex]t_1[/tex] / [tex]t_2[/tex] = [tex]S_2[/tex] / [tex]S_1[/tex] [tex]t_2[/tex]
= [tex]t[/tex] - [tex]t_1[/tex]
Substitute the value of [tex]t_2[/tex] in equation(1):
[tex]t_1[/tex] / ([tex]t[/tex] - [tex]t_1[/tex] ) = [tex]S_2[/tex] / [tex]S_1[/tex][tex]t_1[/tex] [tex]S_1[/tex]
= ([tex]t[/tex] - [tex]t_1[/tex] ) [tex]S_2[/tex] .[tex]t_1[/tex] . [tex]S_1[/tex] + [tex]t_1[/tex] [tex]S_2[/tex]
= [tex]tS_1[/tex][tex]t_1[/tex]
= [tex]tS_1[/tex] / ( [tex]S_1[/tex] + [tex]S_2[/tex] ) [tex]t_2[/tex]
= [tex]t[/tex] - [tex]t_1[/tex]
= [tex]tS_2[/tex] / ( [tex]S_1[/tex] + [tex]S_2[/tex] )
Therefore, Anderson traveled at 15 mph for 3 hours Anderson traveled at 12 mph for 6 hours.
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Evaluate. 547+233×5−142 whats this answer
The answer to the expression 547 + 233 × 5 - 142 is 1752. To solve the expression, we must follow the order of operations, which is PEMDAS: Parentheses, Exponents, Multiplication, and Division (performed left to right), and Addition and Subtraction (performed left to right).
Since there are no parentheses or exponents in this expression, we start with multiplication and division. In this case, we have to multiply 233 by 5, which gives us 1165. Then, we add 547 to 1165, which gives us 1712. Finally, we subtract 142 from 1712, which gives us the final answer of 1752. Therefore, the result of the expression 547 + 233 × 5 - 142 is 1752, which can be obtained by following the order of operations and performing the arithmetic operations in the correct order.
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Given the function g(x) = 5x - 12, find the value of g(-2)
Answer:-22
Step-by-step explanation:
g(x)=g(-2) means that, x=-2:
so, we have to write -2 instead of every x,
5*(-2)-12=-10-12=-22
The scale factor of two similar hexagons is 7:3.
The area of the smaller hexagon is 18 m2.
What is the area of the larger hexagon?
Question options:
5832 m2
324 m2
42 m2
98 m2
36 m2
Answer:
42 m2
Step-by-step explanation:
3=18
7=?
=7 × 13 ÷ 3
=42
Pls i need help on this question
The length of the missing side is 3√17 ft. Option B is the correct option.
What is the hypotenuse?
The longest side of a right-angled triangle, or the side opposite the right angle, is known as the hypotenuse in geometry. The Pythagorean theorem, which states that the square of the length of the hypotenuse equals the sum of the squares of the lengths of the other two sides, can be used to determine the length of the hypotenuse.
The △ABC is a right-angled triangle.
Thus the sum of squares of the legs of the triangle is equal to the square of the hypotenuse.
The hypotenue is 13 ft.
Assume that the missing leg is equal to x.
The legs of the triangle are x and 4ft.
Apply Pythagorean theorem:
13² = 4² + x²
x² = 169 -16
x² = 157
x = √(3×3×17)
x = 3 √17
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GIVING BRAINLIEST AND MANY POINTS FOR CORRECT ANSWER!!
Let's say you decide to go for a walk. You start out at home and walk 500 meters total, making a few turns here and there. You stop for a moment and realize you have ended up only 100 meters east of where you started.
What distance did you travel?
What was your displacement?
Answer:
500 meters.
Step-by-step explanation:
Help me please on the linear function from a table
The missing numbers to complete the linear equation that gives the rule for this table are y = 11x-10
Describe Linear Equation?A linear equation is an equation that describes a line in a two-dimensional coordinate system. It can be written in the form:
y = mx + b
where y and x are variables representing coordinates on the vertical and horizontal axes, respectively, m is the slope of the line, and b is the y-intercept (the point where the line crosses the y-axis).
The slope of the line represents the rate of change between y and x, or the steepness of the line. A positive slope indicates that the line is increasing from left to right, while a negative slope indicates that the line is decreasing from left to right. A slope of zero indicates a horizontal line, while a slope that is undefined (such as when x is constant) indicates a vertical line.
To find the equation that gives the rule for this table, we need to determine the slope and y-intercept of the line that passes through these points.
We can start by using the two given points (4, 34) and (5, 45) to find the slope:
slope = (change in y) / (change in x)
slope = (45 - 34) / (5 - 4)
slope = 11
Now we can use the point-slope form of a linear equation to write the equation for this line, using the point (4, 34):
y - 34 = 11(x - 4)
Simplifying this equation gives:
y = 11x - 10
So the missing numbers to complete the linear equation that gives the rule for this table are:
y = 11x-10
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