To find the inverse of a 2x2 matrix, calculate the determinant (ad-bc), then swap the diagonal elements, change the signs of the off-diagonal elements, and multiply each by the reciprocal of the determinant.
Explanation:To find the inverse of a 2x2 matrix, you must follow a specific procedure. Given a 2x2 matrix A:
\( A = \begin{bmatrix} a & b \\ c & d \end{bmatrix} \)
The inverse of matrix A, denoted as \( A^{-1} \), is calculated using the formula:
[tex]\( A^{-1} = \frac{1}{ad - bc} \begin{bmatrix} d & -b \\ -c & a \end{bmatrix} \)[/tex]
Here, \( ad - bc \) is called the determinant of matrix A. For the inverse to exist, the determinant must not be zero. To calculate the inverse, you compute the determinant \( (ad - bc) \), then swap the elements of the diagonal positions (a and d), change the signs of the off-diagonal elements (b and c), and then multiply each element by \( \frac{1}{ad - bc} \).
For example, if you have a matrix:
[tex]\( A = \begin{bmatrix} 4 & 7 \\ 2 & 6 \end{bmatrix} \)[/tex]
The determinant is [tex]\( 4\cdot6 - 7\cdot2 = 24 - 14 = 10 \).[/tex]
The inverse of A is:
[tex]\( A^{-1} = \frac{1}{10} \begin{bmatrix} 6 & -7 \\ -2 & 4 \end{bmatrix} = \begin{bmatrix} 0.6 & -0.7 \\ -0.2 & 0.4 \end{bmatrix} \)[/tex]
a truck is going to a village and stops to see four trucks. how many trucks are going to the village?
The truck going to the village remains one.
This question appears to be an example of logical reasoning. If a truck is going to a village and stops to see four trucks, the number of trucks going to the village is still one. The fact that the truck stops to see four other trucks does not change its own path or destination.
Find the product. (7 - 10x)2
Which answer represents the range of the logarithmic function given below? F(x) = log7 x
A. x>=0
B. x<0
C. x>0
D. All real numbers
Range of the logarithmic function F(x) = log7 x is C. x > 0.
What is a logarithm?The logarithm is exponentiation's opposite function in mathematics.
This indicates that the exponent to which b must be raised in order to obtain a number x is the logarithm of x to the base b. For instance, because 100 = 10², the logarithm of 100 in base 10 is 2, or log10 = 2.
In the given question, F(x) = log7 x.
Assuming log7 x = y.
Therefore, x is the value equal to [tex]7^y[/tex], hence it can not be zero and negative.
Even if y is equal to zero [tex]7^y[/tex] would be 1.
∴ The range of the logarithmic function F(x) = log7 x is x > 0.
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Help please?? If you deposit $750 in an account that pays 8% annual interest compounded continuously, what will the balance be after five years?
The balance in your account after five years will be approximately $1,118.85.
Step 1: Understand Continuous Compounding
In continuous compounding, interest is earned not only on the initial principal amount but also on the accumulated interest over time. This means interest is calculated continuously throughout the year, leading to a slightly higher final balance compared to simple interest.
Step 2: Formula for Continuous Compounding
The formula for continuous compounding to find the future value (balance) after t years is:
A = P * e^(r*t)
where:
A = Final amount (balance after t years)P = Principal amount (initial deposit - $750)e = Euler's number (approximately 2.71828)r = Annual interest rate (as a decimal - convert 8% to 0.08)t = Time in years (5 years)Step 3: Apply the Formula
Now that we have the formula and values, let's plug them in:A = $750 * e^(0.08 * 5)Step 4: Calculate the Final Balance
You can use a calculator to evaluate the expression.
A ≈ $750 * e^(0.4) ≈ $750 * 1.4918
Step 5: Round the Answer (Optional)
Depending on the desired level of precision, you can round the answer to two decimal places:
A ≈ $1118.85 (rounded to two decimal places)
On a particular day, the wind added 4 miles per hour to Jaime's rate when she was rowing with the wind and subtracted 4 miles per hour from her rate on her return trip. Jaime found that in the same amount of time she could row 57 miles with the wind, she could go only 33 miles against the wind.What is her normal rowing speed with no wind?
Answer:
15 mph
Step-by-step explanation:
Speed of wind = [tex]V_w[/tex] = 4 mph
Speed of Jaime rowing = [tex]V_r[/tex]
Speed of boat against wind = [tex]V_r-4[/tex].
Speed of boat with wind = [tex]V_r+4[/tex]
Time taken with and against wind is same = t
Distance travelled with wind = 57 mph
Distance travelled against wind = 33 mph
[tex]time=\frac{\text{Distance}}{\text{Speed}}[/tex]
Time taken to go with wind
[tex]t=\frac{57}{V_r+4}[/tex]
Time taken to go against wind
[tex]t=\frac{33}{V_r-4}[/tex]
So,
[tex]t=\frac{57}{V_r+4}=\frac{33}{V_r-4}\\\Rightarrow \frac{57}{33}=\frac{V_r+4}{V_r-4}\\\Rightarrow 57V_r-33V_r-228-132=0\\\Rightarrow V_r=\frac{360}{24}\\\Rightarrow V_r=15\ mph[/tex]
∴ Her normal rowing speed with no wind is 15 mph
3x + 3 − x + (−7) > 6 what is x
3x+3-x+(-7)>6
combine like terms on left side
2x-4>6
add 4 to both sides 2x>10
x=10/2 = 5
x>5
factor the trinominal below please
you have 15 x and 56
so you need two numbers when added equal 15 and when multiplied equal 56
and since they are both positive, the answer also needs to be positive
so B is the correct answer
What value is a discontinuity of x squared plus 7 x plus 1, all over x squared plus 2 x minus 15?
Answer:
x = -5 is your answer
Step-by-step explanation:
option c
If 3x+y=14, and x and y are positive integers, all of the following could be the value of x+y EXCEPT? This is an sat question and it is bothering my mind, does anyone understand this? The answer choices are: A) 4 C) 8
The sum of x and y that cannot be obtained from the equation 3x + y = 14 is 8.
Explanation:The question asks for the sum of x and y that could not be obtained from the equation 3x + y = 14. To find the possible values of x and y, we need to consider different combinations of positive integers that satisfy the equation. If we test the answer choices, we can see that the sum of x and y cannot be equal to 8. Therefore, the correct answer is C) 8.
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You look at the clock and it is exactly 2pm. you set an alarm to go off in 51 hours. at what time does the alarm go off? (hint: you could count on your fingers, but this is not what we’re after. if you are tempted to count on your fingers, change the 51 to 5100.)
If you look at the clock and it is exactly 2pm. you set an alarm to go off in 51 hours then 5PM is the time when alarm go off.
What is Time?Time can be defined as an ongoing and continuous sequence of events that occur in succession, from past through the present, and to the future.
Given that You look at the clock and it is exactly 2pm and set an alarm to go off in 51 hours.
We need to find at which time the alarm go off.
We know that in a clock we will have 12 hours.
For every 12 hours the PM changes to PM.
2PM-2PM=24 hours
2PM-2PM=24 hours
When we add the hours we get 48 hours still we needed three more hours to turn off the alarm
2PM-5PM=3 hours.
at 5PM it becomes 51 hours.
Hence, if you look at the clock and it is exactly 2pm. you set an alarm to go off in 51 hours then 5PM is the time when alarm go off.
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Express log2 6 + log2 7 as a single logarithm.
Answer: The correct option is (C) [tex]\log_242.[/tex]
Step-by-step explanation: We are given to express the following logarithmic expression as a single logarithm :
[tex]E=\log_26+\log_27~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~(I)[/tex]
We will be using the following logarithmic property :
[tex]\log_ab+\log_ac=\log_a(bc)[/tex]
So, from expression (i), we get
[tex]E=\log_26+\log_7=\log_2(6\times 7)=\log_242.[/tex]
Thus, the required single logarithm is [tex]\log_242.[/tex]
Option (C) is CORRECT.
The table shows the mean daily temperature in North Dakota during a week in February. Which statement about the data is true?
A.The Lowest mean temperature was on wednesday
B.The lowest temperature was on friday
C.The highest mean temperature was on friday
D.The highest mean temperature was on monday
The correct option is 2nd option i.e., the lowest mean temperature is on Friday.
The mean temperature in North Dakota during a week in February.
We have to find which statement is true.
What is the method to find mean ?
The mean can be calculated by adding all the given numbers and then dividing by the total no. of numbers.
As per the question ;
Mean daily temperature is given in a table.
Let's arrange these temperatures day wise from highest mean temperature to lowest mean temperature.
i.e.,
Tuesday - 1.3°F > Monday - 1°F > Wednesday - 0°F > Thursday > -1.2°F > Sunday - -1.4°F > Saturday > - 1.5°F > Friday - -1.7°F
So ;
The highest mean temperature is on Tuesday of 1.3°F.
The lowest mean temperature is on Friday of -1.7°F.
Thus , the correct option is 2nd option i.e., the lowest mean temperature is on Friday.
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If g(x)=k*f(x), what would be the value of k? How would I find k?
Write the expression as either the sine, cosine, or tangent of a single angle.
sine of pi divided by two times cosine of pi divided by seven plus cosine of pi divided by two times sine of pi divided by seven.
Help. Solve for x. Show your work.
a. picture one show your work
b. picture 2 show your work
Secants from the same point have the same product of length to the near intersection times length to the far intersection from the point.
1) 5(5+x) = 6(6+4)
... 25 + 5x = 60 . . . . eliminate parentheses using the distributive property
... 5x = 35 . . . . . . . . subtract 25
... x = 7 . . . . . . . . . . . divide by 5
2) The same rule applies.
... 3(3+5) = 4(4+x)
... 24 = 16 + 4x . . . . . eliminate parentheses
... 8 = 4x . . . . . . . . . . . subtract 16
... 2 = x . . . . . . . . . . . . divide by 4
Simplify the expression
9−8b+6b
9−8b+6b
.
9−8b+6b=??
haha last one XD
One of the roots of the equation x^2 + kx -6 = 0 is 3, and k is constant
Help please! I will give Brainliest to most detailed answer:)
The figure shows three right triangles. Triangles JKM, KLM, and JLK are similar.
Theorem: If two triangles are similar, the corresponding sides are in proportion.
Using the given theorem, which two statements help to prove that if segment JL is x, then x^2 = 100?
1.) Segment JL • segment JM = 64
Segment JL • segment LM = 48
2.)Segment JL • segment JM = 48
Segment JL • segment LM = 36
3.)Segment JL • segment JM = 64
Segment JL • segment LM = 36
4.)Segment JL • segment JM = 36
Segment JL • segment LM = 64
*If you can, could you please give an explanation? Thanks.
Given the function f(x) = 0.5(3)x, what is the value of f−1(7)? 1) 0.565 2) 1.140 3) 1.771 4) 2.402
Answer:7=0.5 |x-4| -3
+3 +3
10=0.5 |x-4|
10/0.5=0.5/0.5 |x-4|
20=|x-4|
^
-20=x-4 20=x-4
+4 +4 +4 +4
-16=x 24=x
The answers are -16=x and 24=x
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Step-by-step explanation:
what are the discontinuities of the function f(x)= (x^2 - 36)/(4x - 24)
The function f(x) = (x² - 36)/(4x - 24) has a removable discontinuity at x = 6, due to the fact that at this value the original function's denominator becomes zero.
The function given is f(x) = (x² - 36)/(4x - 24). To find the discontinuities of this function, we must identify values of x that cause the denominator to be zero, as the function would be undefined at those points. Factor the numerator and the denominator to simplify the expression. (x² - 36) can be factored as (x + 6)(x - 6), and (4x - 24) can be factored as 4(x - 6). So, the simplified function is f(x) = (x + 6)/4, but we must exclude the value x = 6 from the domain due to it making the original denominator zero. Therefore, the function is discontinuous at x = 6, which is also known as a point of removable discontinuity because the factor (x - 6) is canceled out in the simplification.
what is the solution to the equipment 3x+2(x-9)= 8x +x -14
the expression equivalent to sin 3x−sin x is what
Answer:
The required equivalent form of given expression is
[tex]\sin 3x-\sin x=2\cos 2x\sin x[/tex]
Step-by-step explanation:
Given : Expression [tex]\sin 3x-\sin x[/tex]
To find : The expression is equivalent to ?
Solution :
Applying trigonometric formula,
[tex]\sin a - \sin b = 2\cos(\frac{a+b}{2})\sin(\frac{a-b}{2})[/tex]
where, a=3x and b=x
[tex]\sin 3x-\sin x=2\cos(\frac{3x+x}{2})\sin(\frac{3x-x}{2})[/tex]
[tex]\sin 3x-\sin x=2\cos(\frac{4x}{2})\sin(\frac{2x}{2})[/tex]
[tex]\sin 3x-\sin x=2\cos 2x\sin x[/tex]
Therefore, The required equivalent form of given expression is
[tex]\sin 3x-\sin x=2\cos 2x\sin x[/tex]
The expression equivalent to (sin 3x-sin x) is 2cos(2x)sin(x) and this can be determined by using the trigonometric properties.
Given :
Expression -- (sin 3x - sin x)
The following steps can be used in order to determine the expression equivalent to (sin 3x - sin x):
Step 1 - The trigonometric properties can be used in order to determine the expression equivalent to (sin 3x - sin x).
Step 2 - Below are the properties that help to evaluate the given expression.
[tex]\rm sin \;A - sin\;B = 2cos\left(\dfrac{A+B}{2}\right) sin\left(\dfrac{A-B}{2}\right)[/tex]
Step 3 - Use the above-mentioned property in the given expression.
[tex]\rm sin \;3x - sin \; x = 2 cos\left(\dfrac{3x+x}{2}\right) sin\left(\dfrac{3x-x}{2}\right)[/tex]
[tex]\rm sin \;3x - sin \; x = 2 cos\left(\dfrac{4x}{2}\right) sin\left(\dfrac{2x}{2}\right)[/tex]
[tex]\rm sin \;3x - sin \; x = 2 cos\left(2x\right) sin\left(x\right)[/tex]
So, the expression equivalent to (sin 3x-sin x) is 2cos(2x)sin(x).
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An airplane is flying at 180mph. A jet flying at 330 mph leaves 1 hour later traveling in the same direction. How long will it take for the jet to catch up to the airplane?
To determine how long it will take for the jet to catch up to the airplane, calculate the time by dividing the distance the airplane covers before the jet starts (180 miles) by the relative speed of the jet to the airplane (150 mph), resulting in 1.2 hours or 72 minutes.
Explanation:The subject of the question is related to the topic of relative velocity in Mathematics, specifically regarding two objects moving in the same direction. To find out how long it will take for the jet to catch up to the airplane, we need to calculate the relative speed of the two vehicles and the time it takes for one to overtake the other.
The airplane is moving at 180 mph, and the jet is flying at 330 mph. Since the jet leaves one hour later, the airplane would have traveled 180 miles by that time. The relative speed of the jet to the airplane is the difference between their speeds, which is 330 mph - 180 mph, resulting in 150 mph.
To catch up, the jet needs to cover the 180 miles separation distance at a relative speed of 150 mph. We can find the time it takes to catch up by dividing the distance by the relative speed:
Time = Distance ∗ Relative Speed = 180 miles ∗ 150 mph = 1.2 hours.
Therefore, it will take 1.2 hours or 72 minutes for the jet to catch up to the airplane after it starts its pursuit.
Solve for y. x + a = yb
In the diagram, AC=BD=17 and BC=3. The length of segment AD is
CAN SOMEONE WHO KNOWS HPW TO DO THIS EXPLAIN ME THESE
Eliza Savage received a statement from her bank showing a checking account balance of $324.18 as of January 18. Her own checkbook shows a balance of $487.38 as of January 29. The bank returned all of the cancelled checks but three. The amounts of these three checks are $15.00, $77.49, and $124.28. How much did Eliza deposit in her account between January 18 and January 29?
How does the volume of an oblique cone change if the height is reduced to 2/5 of its original size and the radius is doubled?
Answer:
Option (D) is correct.
Step-by-step explanation:
Let the initial original height of the cone is h and radius is r.
The volume of original cone is given by
[tex]V=\frac{1}{3}\times \pi r^{2}\times h[/tex]
Now the new height be h' = 2/5 h and radius r' = 2r
So, the new volume be
[tex]V'=\frac{1}{3}\times \pi r'^{2}\times h'[/tex]
[tex]V'=\frac{1}{3}\times \pi\times 2r^{2}\times \frac{2}{5}h[/tex]
[tex]V=\frac{8}{15}\times \pi \times r^{2}h[/tex]
Mr. Scrubs got some money for his birthday he spent 1/5 of it on dog treats then he divided the remainder equally among his 3 favorite charities what fraction of his money did each charity receive ? If he donated 60 to each charity , how much money did he received for his birthday
No woman has broken the 10-second barrier in the 100 -meter runfind probability the empirical probability that a womwn will break the 10 second barrier next year ?
We cannot definitively conclude the sprinter's improvement in time due to the ±0.05 seconds uncertainty of the stopwatch. Additionally, the stopwatch's uncertainty hinders accurate timing in close races, making it possibly unhelpful for precise measurements.
Explanation:The subject of the question is probability, but the scenario provided deals with the uncertainty of a stopwatch rather than the probabilities of breaking records. The uncertainty of the stopwatch is ±0.05 seconds. Analyzing the times recorded, the sprinter's time improved from 12.04 seconds to 11.96 seconds, but due to the stopwatch's uncertainty, it's not possible to definitively conclude that this week's time was faster since both times could vary by ±0.05 seconds. Likewise, when the times of the first and second place sprinters at the last track meet are considered, the difference in their times is 0.03 seconds, which is within the margin of error of the stopwatch. Therefore, the new stopwatch might not be helpful in accurately determining the winner in close races where the time difference is within the uncertainty range of the stopwatch.