Answer:
Y=3x(x-4)
Step-by-step explanation:
What is the planes ground distance to the airport (picture provided)
Answer:
d. ≈ 37,106 ft
Step-by-step explanation:
The angle of depression to the plane to the airport is the same as the angle of elevation from the airport to the plane. Therefore, the angle of elevation form the airport to the plane is 6°.
Notice that the height of the plane is the opposite side of the angle of elevation and the ground distance is the adjacent side of the angle of elevation. To find ground distance we need to use a trig function to relate the opposite side and the adjacent side; that trig function is tangent:
[tex]tan(\alpha )=\frac{opposite-side}{adjacent-side}[/tex]
[tex]tan(6)=\frac{3900ft}{ground-distance}[/tex]
[tex]ground-distance=\frac{3900ft}{tan(6)}[/tex]
[tex]ground-distance=37106ft[/tex]
We can conclude that the plane's ground distance to the airport is approximately 37,106 feet
On a baseball diamond,1st base, 2nd base, 3rd base, and home plate form a square. If the ball is thrown from 1st base to 2nd base and then from 2nd base to home plate, how many feet has the ball been thrown? The distance between the bases are 90 feet. Option A: 90 Sq. root of 2 Option B: 180 Sq. Root of 2 Option C: 90+90 Sq. Root of 2 Option D: 270 Sq. Root of 2
Answer:
Option C: 90+90 Sq. Root of 2
Step-by-step explanation:
First we find the distance from second base to home plate. This is the diagonal of the square, which splits it into two right triangles.
Each right triangle will have legs of 90 feet. We use the Pythagorean theorem to find the length of the diagonal (the hypotenuse of the right triangle):
a² + b² = c²
90² + 90² = c²
8100 + 8100 = c²
16200 = c²
Take the square root of each side:
√(16200) = √(c²)
Simplifying √16200, we find the prime factorization:
16200 = 162(100)
162 = 2(81)
81 = 9(9) [Since this is a perfect square, we can stop; we know we take this out of the radical.]
100 = 10(10) [Since this is a perfect square, we can stop; we know we take this out of the radical.]
√16200 = √(9²×10²×2) = 9×10√2 = 90√2
This means the distance from 1st to 2nd and then from 2nd to home would be
90 + 90√2
Which of the following shows the graph of y = 4x + 3?
Answer:
the graph of y=4 x+3 is a straight line that passes through the point (0,3) and (\frac{-3}{4},0)
Step-by-step explanation:
The graph of the exponential function y = 4ˣ + 3 is attached below.
Exponential functionAn exponential function is in the form:
y = abˣ
Where y, x are variables, a is the initial value of y and b is the multiplication factor.
Given an exponential function of y = 4ˣ + 3
The graph of the exponential function y = 4ˣ + 3 is attached below.
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The surface area of a pyramid is 327 square meters. what is the surface area of a similar pyramid that is smaller by a scale factor of 2 − 3 ? round to the nearest hundredth if necessary
Answer:
[tex]\boxed{\text{144.33 m}^{2}}[/tex]
Step-by-step explanation:
The scale factor (C) is the ratio of corresponding parts of the two pyramids.
The ratio of the areas is the square of the scale factor.
[tex]\dfrac{A_{1}}{ A_{2}} = C^{2}\\\\\dfrac{\text{327 m}^{2}}{A_{2}} = \left (\dfrac{1}{\frac{2}{3}}\right)^{2}\\\\ \dfrac{\text{327 m}^{2}}{A_{2}}= \dfrac{9}{4}\\\\\text{1308 m}^{2}= 9A_{2}\\\\A_{2} = \text{145.33 m}^{2}\\\text{The surface area of the smaller pyramid is \boxed{\text{145.33 m}^{2}}}[/tex]
Ed Parker joined a health club. There was a $39 registration fee, and a $27.50 monthly fee. If Ed visits the club 2 times a week for a year, what does each workout cost him?
Answer:
$3.55/workout
Step-by-step explanation:
Total cost: $39 + ($27.50/month)(12 months) = $369
Number of visits per year: (2 visits/week)(52 weeks/year) = 104 visits/year
Dividing the total cost by 104 visits/year results in:
$369
--------------- = 3.55
104 visits
Each workout cost him $3.55. Each workout cost is obtained by the total cost and the number of the visit per year.
What is the total cost?
It is the sum of the variable cost and the fixed cost. The total cost is the minimum dollar cost of producing some quantity of output.
Registration fee = $39
Monthly fee = $27.50
No of visit a week for a year= 2
Total cost is found as;
Total cost = registration fee+monthly fee ×no of month
Total cost = $39 + ($27.50/month)(12 months)
Total cost =$369
Number of visits per year= visits/week×no of week
Number of visits per year= (2 visits/week)(52 weeks/year)
Number of visits per year = 104 visits/year
When you divide the entire cost by 104 visits per year, you get:
Each workout cost = $369/104
Each workout cost =$3.55
Hence, each workout cost him $3.55
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Please help me out!!!!!
We have three pythagoras:
4² + y² = z²
16² + y² = x²
x² + z² = 20²
Now let's think:
4² + y² = z²
y² = z² - 4²
16² + y² = x²
16² + z² - 4² = x²
x² + z² = 20²
16² + z²- 4² + z² = 20²
2z² = 20² - 16² + 4²
2z² = (2.10)² - (2^4)² + (2²)²
2z² = 2².10² - 2^8 + 2^4
z² = 2.10² - 2^7 + 2^3
z² = 200 - 128 + 8
z² = 208 - 128
z² = 80
z = √80
80 | 2
40 | 2
20 | 2
10 | 2
5 | 5
1
80 = 5.2^4
So
√80 = 4√5
z = 4√5
PLEASE HELP ASAP!!! CORRECT ANSWER ONLY PLEASE!!!
The number 0.1271 represents the area under the standard normal curve below a particular z-score.
What is the z-score?
Enter your answer,as a decimal to the nearest hundredth, in the box.
A z-score is a standardized value that represents the number of standard deviations a given score is above or below the mean in a normal distribution. In this case, the area under the standard normal curve is 0.1271, and the corresponding z-score is approximately -1.14.
Explanation:A z-score is a standardized value that represents the number of standard deviations a given score is above or below the mean in a normal distribution.
It allows for comparison of scores from different data sets with different means and standard deviations. In this case, we are given the area under the standard normal curve and asked to find the corresponding z-score.
To find the z-score, we can use a z-table, which shows the area under the normal curve to the left of each z-score. In the given problem, the area under the curve is 0.1271.
By looking up the closest area in the z-table, we find that the z-score is approximately -1.14.
Final answer:
The z-score represents the number of standard deviations a value is from the mean in a standard normal distribution.
Explanation:
The z-score represents the number of standard deviations a value is from the mean in a standard normal distribution. To find the z-score, we can use the z-table or a calculator. In this case, the area under the standard normal curve is given as 0.1271. Using the z-table, we can find the z-score that corresponds to this area and enter it in the box.
Three angles of an irregular octagon are 100 degrees, 120 degrees, and 140 degrees. The remaining angles are congruent. Find the size of each of the remaining angles
Answer:
144°
Step-by-step explanation:
The sum of the interior angles of a polygon is
sum = 180° × (n - 2) ← n is the number of sides
Here n = 8 ( octagon ), hence
sum = 180° × 6 = 1080°
let the measure of 1 congruent angle be x
Then sum the 8 angles and equate to 1080
100 + 120 + 140 + 5x = 1080
360 + 5x = 1080 ( subtract 360 from both sides )
5x = 720 ( divide both sides by 5 )
x = 144
Thus each of the 5 congruent angles is 144°
A number decreased by 15 is less than 35. What numbers satisfy this condition?
Answer:
Any number between 36-49
Step-by-step explanation:
The number has to be higher then 35. It has to be less then 50 because any number 50 or above would be more then/equal to 35
Answer: x < 50
Explination:
The given equation is x - 15 < 35.
To solve you add 15 to both sides:
x - 15 + 15 < 35 + 15
And you are left with a simplified answer of x < 50.
Find the odds in favor of getting all heads on nine coin tosses.
A. 1 to 508
B. 1 to 518
C. 1 to 511
D. 1 to 505
Answer:
(C) 1 : 511
Step-by-step explanation:
Possible outcome for every throw = 2 (head or tail)
Total possible outcome for 9 throws
= 2⁹
= 512
Odd of getting all head
= 1 : 511
The odds in favor of getting all heads on nine coin tosses is 1 to 512.
Explanation:The odds in favor of getting all heads on nine coin tosses can be calculated as the number of favorable outcomes divided by the number of possible outcomes. In this case, we want all nine coin tosses to result in heads, which is only 1 favorable outcome. The total number of possible outcomes for nine coin tosses is 2^9 = 512.
Therefore, the odds in favor of getting all heads on nine coin tosses is 1 to 512. Comparing this to the options given, the correct answer is A. 1 to 508.
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Devontre rode his bike uphill 5 miles and then back downhill. The rate at which Devontre traveled downhill was 20 mph faster than his rate going uphill. If it took him 20 minutes longer to ride uphill than downhill, what was his uphill rate?
Answer:
10 mph
Step-by-step explanation:
Let x mph be Devontre rate uphill, then x+20 mph its his rate downhill.
1. Time uphill:
[tex]\dfrac{5}{x}\ hours[/tex]
2. Time downhill:
[tex]\dfrac{5}{x+20}\ hours[/tex]
3. If it took him 20 minutes (1/3 hour) longer to ride uphill than downhill, then
[tex]\dfrac{5}{x}-\dfrac{5}{x+20}=\dfrac{1}{3}[/tex]
Solve this equation:
[tex]\dfrac{5(x+20)-5x}{x(x+20)}=\dfrac{1}{3}\\ \\\dfrac{100}{x(x+20)}=\dfrac{1}{3}\\ \\300=x(x+20)\\ \\x^2+20x-300=0\\ \\D=20^2-4\cdot (-300)=400+1200=1600\\ \\x_{1,2}=\dfrac{-20\pm \sqrt{1600}}{2}=\dfrac{-20\pm 40}{2}=-30,\ 10.[/tex]
The rate cannot be negative, thus, x=10 mph (rate uphill).
Find a vector v whose magnitude is 4 and whose component in the i direction is twice the component in the j direction.
The answer is (8√5 i + 4√5j)/5.
Could someone please give me a detailed explanation on how to do the problem? Thanks
Start with
[tex]\vec v=x\,\vec\imath+y\,\vec\jmath[/tex]
as a template for the vector [tex]\vec v[/tex]. Its magnitude is 4, so
[tex]\|\vec v\|=\sqrt{x^2+y^2}=4[/tex]
Its component in the [tex]\vec\imath[/tex] direction is twice the component in the [tex]\vec\jmath[/tex] direction, which means
[tex]x=2y[/tex]
So we have
[tex]\sqrt{(2y)^2+y^2}=\sqrt{5y^2}=4\implies y^2=\dfrac{16}5\implies y=\pm\dfrac4{\sqrt5}[/tex]
and
[tex]x=\pm\dfrac8{\sqrt5}[/tex]
Lastly, rationalize the denominator:
[tex]\dfrac1{\sqrt5}\cdot\dfrac{\sqrt5}{\sqrt5}=\dfrac{\sqrt5}5[/tex]
So we end up with two possible answers,
[tex]\vec v=\pm\left(\dfrac{8\sqrt5}5\,\vec\imath+\dfrac{4\sqrt5}5\,\vec\jmath\right)[/tex]
Final answer:
The vector v with a magnitude of 4 and i-component being twice the j-component can be found by solving for y in the equation of magnitude based on the given conditions and then determining the i and j components accordingly. The result is the vector v = (8√5 i + 4√5 j) / 5.
Explanation:
To find a vector v whose magnitude is 4, and whose i-component is twice its j-component, we can let the i-component be 2y and the j-component be y. Using the Pythagorean theorem for two-dimensional vectors, we can write the equation for magnitude as v = √((2y)^2 + y^2). Given that the magnitude is 4, the equation becomes:
4 = √(4y^2 + y^2)
4 = √(5y^2)
16 = 5y^2
y^2 = ⅔
y = √(⅔)
y = √(⅔)
y = √(⅔)
y = √(⅔)
y = √(⅔)
y = √(⅔)
(2.0 s) gives us the direction in unit vector notation. The magnitude of the acceleration is à(2.0 s)| = √√5.0² + 4.0² + (24.0)² = 24.8 m/s².
Using the value of y we calculated, the components of vector v are:
i-component = 2y = 2(⅔) = 8√5 / 5
j-component = y = ⅔ = 4√5 / 5
So the vector v can be expressed as v = (8√5 i + 4√5 j) / 5.
Which value of x satisfies both -9x + 4y = 8 and -3x − y = 4 given the same value of y?
A-1/7
B-7/9
C-8/7
D-9
E-4/3
Answer:
C
Step-by-step explanation:
Since y will have same value, y doesn't really matter. Thus,
We can solve for y in the 2nd equation as:
-3x - y = 4
-3x - 4 = y
Now we can plug it into the first and solve for x:
-9x + 4y = 8
-9x + 4(-3x - 4) = 8
-9x - 12x - 16 = 8
-21x = 8 + 16
-21x = 24
x = 24/-21
x = -8/7
Correct answer is C.
Answer: Option C
C-8/7
Step-by-step explanation:
We have the following equations
[tex]-9x + 4y = 8[/tex] and [tex]-3x - y = 4[/tex]
We want to find a value of x that satisfies both equations and obtains the same value of y.
To find the value of x, clear the value of y in both equations
[tex]-9x + 4y = 8\\\\-9x + 4y -8 = 0\\\\-9x -8 = -4y\\\\y = \frac{9}{4}x +2[/tex]
------------------------------
[tex]-3x - y = 4\\\\\-3x -y - 4 = 0\\\\y = -3x -4[/tex]
Now solve both equations and solve for x.
[tex]\frac{9}{4}x +2 = -3x -4\\\\\frac{21}{4}x = -4-2\\\\\frac{21}{4}x = -6\\\\21x = -24\\\\x = -\frac{24}{21}\\\\x = -\frac{8}{7}[/tex]
The answer is [tex]x = -\frac{8}{7}[/tex]
Sound travels through sea water at a speed of about 1500 meters per second. At this rate, how far will sound travel in 2 minutes?
Answer:
180,000 m
Step-by-step explanation:
There are 60 seconds in a minute, so:
2 min × 60 s/min = 120 s
Distance = rate × time
d = 1500 m/s × 120 s
d = 180,000 m
(10Q) Convert the angle to decimal degrees and round to the nearest hundredth of a degree.
Answer:
B. 13.26
Step-by-step explanation:
To go from the Degree-Minute-Second (DMS) system to a numeric one, we simply use this formula:
numeric = d + (min/60) + (sec/3600)
Where you take the degree number as is (13 in our case), then you divide the number of minutes by 60 (15 in our case) and the number of seconds by 3600 (36 in our case) and you add everything together.
So, if we plug in our numbers, we have
numeric = 13 + (15/60) + (36/3600)
numeric = 13 + 0.25 + 0.01
numeric = 13.26
SOMEONE PLEASE JUST ANSWER THIS FOR BRAINLIEST!!!
Answer:
[tex] y^2 + 8y + 16 [/tex]
Step-by-step explanation:
[tex] (6y^2 + 2y + 5) - (5y^2 - 6y - 11) = [/tex]
The first set of parentheses is unnecessary, so it can just be removed.
[tex] = 6y^2 + 2y + 5 - (5y^2 - 6y - 11) [/tex]
To remove the second set of parentheses, you must distribute the negative sign that is to its left. It changes every sign inside the parentheses.
[tex] = 6y^2 + 2y + 5 - 5y^2 + 6y + 11 [/tex]
Now you combine like terms.
[tex] = 6y^2 - 5y^2 + 2y + 6y + 5 + 11 [/tex]
[tex] = y^2 + 8y + 16 [/tex]
A theatre sells 1986 tickets. 234 more adult tickets are sold than child tickets, and 186 more child tickets are sold than student tickets. How many child tickets are sold?
Answer:
646 child tickets are sold
Step-by-step explanation:
Let c represent the number of child tickets sold. Then (c-186) is the number of student tickets sold, and (c+234) is the number of adult tickets sold. The total number sold is ...
(c -186) + c + (c+234) = 1986
3c +48 = 1986 . . . simplify
c + 16 = 662 . . . . divide by 3
c = 646 . . . . . . . . . subtract 16
The number of child tickets sold is 646.
The number of child tickets sold is 646.
To find the number of child tickets sold at the theatre, we can define some variables and set up equations based on the information provided.
Let:
x = number of student tickets soldy = number of child tickets soldz = number of adult tickets soldFrom the information given, we have the following relationships:
The total number of tickets sold is 1986:
x + y + z = 1986
There are 234 more adult tickets sold than child tickets:
z = y + 234
There are 186 more child tickets sold than student tickets:
y = x + 186
Now we can substitute the equations for z and y into the first equation:
Substitute z in the total tickets equation:This simplifies to:
x + 2y + 234 = 1986
Now, we substitute y using the equation y=x+186:
Replace y in the equation:
x + 2(x + 186) = 1752
This simplifies to:
x + 2x + 372 = 1752
3x + 372 = 1752
Now isolate x:
3x = 1752 − 372
3x = 1380
x = 31380
x = 460
Now that we have the value for x, we can find y:
Substitute x back into the equation for y:Finally, we calculate z to confirm:
Using z = y + 234:Now we can verify:
x + y + z = 460 + 646 + 880 = 1986
So the number of child tickets sold is y = 646.
. Andrew will roll a number cube and flip a coin for a probability experiment. The faces of the number cube are labeled 1 through 6. The coin can land on heads or tails. If Andrew rolls the number cube once and flips the coin once, write a list that contains only the outcomes in which the number cube lands on a number less than 3?
Answer:
Step-by-step explanation:
1 heads
1 tails
2 heads
2 tails.
That's all you can write given the constraint.
If sin theta equal 2/3 and theta is in Quadrant 1, then what value of (tan theta)(cos theta)? Help Please!
A-2/3
B-3 square root 5/5
C-2 square root 5/3
D-square root 5/3
Answer:
Option A. 2/3
Step-by-step explanation:
we know that
If angle theta is in Quadrant 1
then
The value of cos(theta) is positive and the value of tan(theta) is positive
Remember that
tan(theta)=sin(theta)/cos(theta)
In this problem we have
tan(theta)*cos(theta)=[sin(theta)/cos(theta)]*cos(theta)=sin(theta)
therefore
tan(theta)*cos(theta)=sin(theta)=2/3
Final answer:
The value of (tan theta)(cos theta) is 2/3.
Explanation:
To find the value of (tan theta)(cos theta), we can use the given value of sin theta and the fact that sin² θ + cos² θ = 1.
Since the value of sin theta is known to be 2/3, we can square this value to find sin² θ = (2/3)² = 4/9.
Using the identity sin² θ + cos² θ = 1, we can solve for cos² θ by subtracting sin² θ from 1. This gives us cos²θ = 1 - 4/9 = 5/9.
Finally, we can calculate (tan θ)(cos θ) by multiplying tan θ = sin θ/ cos θ = (2/3) / [tex]\sqrt{5/9[/tex] = (2/3) / ([tex]\sqrt{5[/tex]/3) = 2 / [tex]\sqrt{5[/tex] and cos θ = [tex]\sqrt{5/9[/tex]. Therefore, (tan θ )(cos θ ) = (2 / [tex]\sqrt{5[/tex]) * [tex]\sqrt{5/9[/tex] = 2 / 3.
Use the imaginary number i to rewrite the expression:
Answer:
D
Step-by-step explanation:
√(-49)
Let's rewrite this as:
√(-1) √(49)
√49 is 7, and √-1 is i. Therefore:
7i
Answer D.
The expression √(-49) can be rewritten using the Imaginary unit "i" as follows:
[tex]\sqrt(-49) = \sqrt(49 \times (-1)) = \sqrt49 \times \sqrt(-1) = 7i[/tex]
So, the correct answer is option D) 7i.
Here, rewrite the expression √(-49) using the imaginary unit "i," you can express it as the square root of (-1) multiplied by the square root of 49. This is because the square root of -1 is represented as "i."
[tex]\sqrt(-49) = \sqrt((-1) \times 49)[/tex]
Now, we can factor out the square root of 49, which is 7:
[tex]\sqrt(-1 \times 49) = \sqrt(-1) \times \sqrt(49) = i \times 7[/tex]
So, √(-49) can be expressed as 7i.
The correct answer is:
D) 7i
Thus, √(-49) is equal to 7i, indicating that it is a complex number with a real part of 0 and an imaginary part of 7. option D) 7i is correct choice .
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a fruit company delivers its fruit in two types of boxes: large and small. a delivery of 2 large boxes and 3 small boxes has a total weight of 78 kilograms. a delivery of 6 large boxes and 5 small boxes has a total weight of 180 kilograms. how much does each type of box weigh ?
weight of each large box: ? kilogram(s)
weight of each small box: ? kilogram(s)
Answer:
large box: 18.75 kgsmall box: 13.5 kgStep-by-step explanation:
The information given in the problem statement lets you write two equations relating box weights (L for the large box weight; S for the small box weight).
2L +3S = 78 . . . . . . weight of the first collection of boxes
6L +5S = 180 . . . . . weight of the second collection of boxes
We can subtract 3S from the first equation and multiply it by 3 and we have ...
2L = 78 -3S . . . . . . subtract 3S [eq3]
6L = 234 -9S . . . . . multiply by 3
Now we have an expression for 6L that can substitute into the second equation:
(234 -9S) +5S = 180
234 -4S = 180 . . . . . . . . simplify
54 -4S = 0 . . . . . . . . . . . subtract 180
13.5 -S = 0 . . . . . . . . . . . divide by 4
13.5 = S . . . . . . . . . . . . . add S
From [eq3] above, we can now find L.
2L = 78 -3(13.5) = 37.5
L = 37.5/2 = 18.75
The weight of the large box is 18.75 kg; the small box is 13.5 kg.
_____
A graphing calculator can provide an alternate means o finding the solution.
Sorry if this is too much but I'm desperate right now.
Answer:
[tex]f(x)=\dfrac{2x-1}{x+2}\\ \\f^{-1}(x)=\dfrac{-2x-1}{x-2}[/tex]
[tex]f(x)=\dfrac{x-1}{2x+1}\\ \\f^{-1}(x)=\dfrac{-x-1}{2x-1}[/tex]
[tex]f(x)=\dfrac{x+2}{-2x+1}\\ \\f^{-1}(x)=\dfrac{2-x}{-2x-1}=\dfrac{x-2}{2x+1}[/tex]
[tex]f(x)=\dfrac{2x+1}{2x-1}\\ \\y=f^{-1}(x)=\dfrac{1+x}{2(x-1)}[/tex]
[tex]f(x)=\dfrac{x+2}{x-1}\\ \\f^{-1}(x)=\dfrac{x+2}{x-1}[/tex] - extra
Step-by-step explanation:
1.
[tex]f(x)=y=\dfrac{2x-1}{x+2}\\ \\y(x+2)=2x-1\\ \\yx+2y=2x-1\\ \\yx-2x=-1-2y\\ \\x(y-2)=-1-2y\\ \\x=\dfrac{-1-2y}{y-2}\\ \\y=f^{-1}(x)=\dfrac{-2x-1}{x-2}[/tex]
2.
[tex]f(x)=y=\dfrac{x-1}{2x+1}\\ \\y(2x+1)=x-1\\ \\2xy+y=x-1\\ \\2xy-x=-1-y\\ \\x(2y-1)=-1-y\\ \\x=\dfrac{-1-y}{2y-1}\\ \\y=f^{-1}(x)=\dfrac{-x-1}{2x-1}[/tex]
3.
[tex]f(x)=y=\dfrac{x+2}{-2x+1}\\ \\y(-2x+1)=x+2\\ \\-2xy+y=x+2\\ \\-2xy-x=2-y\\ \\x(-2y-1)=2-y\\ \\x=\dfrac{2-y}{-2y-1}\\ \\y=f^{-1}(x)=\dfrac{2-x}{-2x-1}=\dfrac{x-2}{2x+1}[/tex]
4.
[tex]f(x)=y=\dfrac{2x+1}{2x-1}\\ \\y(2x-1)=2x+1\\ \\2xy-y=2x+1\\ \\2xy-2x=1+y\\ \\x(2y-2)=1+y\\ \\x=\dfrac{1+y}{2y-2}\\ \\y=f^{-1}(x)=\dfrac{1+x}{2(x-1)}[/tex]
5.
[tex]f(x)=y=\dfrac{x+2}{x-1}\\ \\y(x-1)=x+2\\ \\xy-y=x+2\\ \\xy-x=2+y\\ \\x(y-1)=2+y\\ \\x=\dfrac{2+y}{y-1}\\ \\y=f^{-1}(x)=\dfrac{x+2}{x-1}[/tex]
There are 12 pieces of fruit in a bowl 1/4 of the fruit pieces draw a fraction strip to show how many apples pieces are in the bowl
To find out how many apple pieces are in the bowl when 1/4 of 12 fruit pieces are apples, divide 12 by 4, which equals 3. So, there would be 3 apples in the bowl.
Understanding fractions is an important part of mathematics. In this scenario, we have a total of 12 pieces of fruit in a bowl and we want to find out how many of those are apple pieces if 1/4 of the fruit pieces are apples.
Since there's a total of 12 pieces, we divide this number into 4 equal parts (fractions strips) to determine what one quarter (1/4) of the bowl would contain.
To visualize this, you can draw a rectangle and divide it into 4 equal horizontal sections (fractions strips), because 1/4 means one part out of four equal parts. When you divide 12 by 4, you get 3. So, each section of your fraction strip would represent 3 pieces of fruit. This means that if 1/4 of the pieces are apples, there are 3 apples in the bowl.
Which quadratic equation is equivalent to (x2 – 1)2 – 11(x2 – 1) + 24 = 0?
Answer:
u² – 11u + 24 = 0 where u = (x² – 1)
Step-by-step explanation:
Given the equation;
(x² – 1)² – 11(x² – 1) + 24 = 0
We can let;
u = x² - 1
Substituting the value of u in the equation we get;
(u)² - 11 (u) + 24 = 0
u²- 11u + 24 = 0
Therefore;
The quadratic equation that is equivalent to the equation is;
u² – 11u + 24 = 0 where u = (x² – 1)
Answer:
option 1
Step-by-step explanation:
If the length of an arc is 12 inches and the radius of the circle is 10 inches, what is the measure of the arc? 216 degrees 270 degrees 288 degrees
Answer:
216 degrees
Step-by-step explanation:
step 1
Find the circumference of the circle
The circumference of the circle is equal to
[tex]C=2\pi r[/tex]
we have
[tex]r=10\ in[/tex]
substitute
[tex]C=2\pi (10)[/tex]
[tex]C=20\pi\ in[/tex]
step 2
Find the measure of the arc if the length of the arc is 12π in
Remember that
The circumference of a circle subtends a central angle of 360 degrees
so
by proportion
[tex]\frac{360}{20\pi}=\frac{x}{12\pi}\\ \\x=360*12/20\\ \\x= 216\°[/tex]
if you horizontally shift the square root parent function, F(x) = [tex]\sqrt{x}[/tex], left four units, what is the equation of the new function?
ANSWER
[tex]g(x) = \sqrt{x + 4} [/tex]
EXPLANATION
The parent square root function is
[tex]f(x) = \sqrt{x} [/tex]
The translation
[tex]g(x ) = \sqrt{x + k} [/tex]
Will shift the graph of f(x) k units to left.
The translation
[tex]g(x) = \sqrt{x -k} [/tex]
will shift the graph of f(x) to the right by k units.
Therefore if f(x) is shifted 4 units to the left its new equation is:
[tex]g(x) = \sqrt{x + 4} [/tex]
Shifting a function left involves adding a value to the x-component. Hence, shifting the square root parent function, F(x) = √x, to the left by 4 units results in a new function F(x) = √(x+4).
Explanation:When a function is shifted horizontally, it impacts the input or the x-values. A shift to the left is represented by the addition of a value to the x-component of the function. Hence, to shift the square root parent function, F(x) = √x, to the left by 4 units, you would add 4 to 'x' in the function, which results in a new function F(x) = √(x+4). "This function represents the original square root parent function shifted 4 units to the left".
Learn more about Horizontal Shift of Function here:https://brainly.com/question/36050732
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In the fifth grade at Lenape Elementary School, there are 4/7 as many girls as there are boys. There are 66 students in the fifth grade. How many students are girls?
Answer:
24 girls.
Step-by-step explanation:
If the number of boys is x then:
x + 4/7 x = 66
x = 66 / 1 4/7
x = 66 * 7/11
= 6 * 7
= 42.
So the number of girls is 66 - 42
= 24.
The quantitative relation between two amounts shows the number of times one value contains or is contained within the other:
The number of girls students is 24.
GivenIn the fifth grade at Lenape Elementary School, there are 4/7 as many girls as there are boys.
There are 66 students in the fifth grade.
What is a ratio?The quantitative relation between two amounts shows the number of times one value contains or is contained within the other:
There are 66 students in fifth grade, and there is a 4:7 girl to boy ratio.
[tex]= \dfrac{66}{11}\\\\= 6[/tex]
Then,
the number of girls is = [tex]6 \times 4=24[/tex]
The number of boys is = [tex]6 \times 7 = 42[/tex]
Hence, the number of girls students is 24.
To know more about Ratio click the link given below.
https://brainly.com/question/4573383
An employee worked 175.25 hours in January, 162 hours in February, 158 hours in March and 175 hours in April.
I. need. more info. to solve it sorry
The math club needs to choose four people for a committee to represent it at the school board meeting. The club consists of 14 members, made up of nine girls and five boys. Which counting method should you use to find the compound probability? Explain. What is the total number of possible outcomes? What is the probability that two girls and two boys are on the committee? Round your answer to two decimal places.
Answer:
Use combinations because order does not matter, 1001, 0.36
Step-by-step explanation:
Answer: Combination method is used for counting. There are 1001 possible outcomes and there is probability of 0.36 of getting two girls and two boys are on the committee.
Step-by-step explanation:
Since we have given that
Total number of members = 14
Number of girls = 9
Number of boys = 5
We will use "Combination method " to count the compound probability.
So, the total number of possible outcomes is given by
[tex]^{14}C_4\\\\=1001[/tex]
The probability that two girls and two boys are on the committee is given by
[tex]\dfrac{^9C_2\times ^5C_2}{^{14}C_4}\\\\=\dfrac{360}{1001}\\\\=0.3596\\\\=0.36[/tex]
Hence, there are 1001 possible outcomes and there is probability of 0.36 of getting two girls and two boys are on the committee.
Which answer is the best estimate of the residual value when x = 5? −1.5 −0.5 0.5 1.5
I took the test, (for this particular graph) it was -1.5.
Answer:
The correct option is 1.
Step-by-step explanation:
The formula for residual value is
[tex]\text{Residual Value = Observed Value - Estimated value}[/tex]
In the given graph points represents the observed value and the line represents the expected or estimated value.
From the given graph it is clear that the observed value at x=5 is 5.5 and the estimated value at x=5 is 7.
[tex]\text{Residual Value}=5.5-7[/tex]
[tex]\text{Residual Value}=-1.5[/tex]
The residual value is -1.5, therefore the correct option is 1.