A ramp 24 ft long rises to a platform that is 20 ft off the ground. find x , the angle of elevation of the ramp. round your answer to the nearest tenth of a degree.
Answers
Final answer:
To determine the angle of elevation x, we use the sine function with the opposite side (20 ft) and the hypotenuse (24 ft) to get sin(x) = 20/24, and by taking the arcsin of the result, we find that x ≈ 56.4° when rounded to the nearest tenth of a degree.
Explanation:
To find x, the angle of elevation of the ramp, we can use trigonometric functions. Since we have the length of the ramp (hypotenuse) and the height of the platform (opposite side) in a right-angled triangle, we can use the sine function, which is defined as the ratio of the opposite side to the hypotenuse.
Using the sine function: sin(x) = opposite/hypotenuse = 20/24.
We first calculate the ratio: sin(x) = 20/24 = 0.8333.
To find the angle x, we take the inverse sine (also known as arcsine) of the ratio: x = arcsin(0.8333).
Using a calculator set to degree mode, we find that x ≈ 56.4° when we round to the nearest tenth of a degree.
Related Questions
Find the value of each variable.
A. a = 15, b = 5, c = 8, d = 4
B. a = 15, b = 4, c = 8, d = 5
C. a = 14.5, b = 5, c = 6, d = 4
D. a = 14.5, b = 4, c = 6, d = 5
Answers
Answer:
(A)
Step-by-step explanation:
From the figure, since RT is parallel to QU, therefore ΔSQU is similar to ΔSRT, thus using the basic proportionality theorem, we get
[tex]\frac{SR}{SQ}=\frac{ST}{SU}[/tex]
[tex]\frac{c}{12+c}=\frac{10}{25}[/tex]
[tex]25c=120+10c[/tex]
[tex]15c=120[/tex]
[tex]c=8[/tex]
Also, QU is parallel to PV, therefore from ΔPVS and ΔSRT, we have
[tex]\frac{SR}{SP}=\frac{ST}{SV}[/tex]
[tex]\frac{c}{c+12+d}=\frac{10}{30}[/tex]
[tex]\frac{8}{20+d}=\frac{1}{3}[/tex]
[tex]24=20+d[/tex]
[tex]d=4[/tex]
Now, from ΔSRT and SQU, we have
[tex]\frac{RT}{QU}=\frac{ST}{SU}[/tex]
[tex]b=\frac{10{\times}12.5}{25}[/tex]
[tex]b=5[/tex]
Also, from ΔSQU and SPV,
[tex]\frac{12.5}{a}=\frac{25}{30}[/tex]
[tex]a=15[/tex]
Thus, value of a,b,c and d are 15,5,8 and 4 respectively.
Let g(x) = 2x and h(x) = x2 + 4. Evaluate (g ∘ h)(3).
Answers
(g○h)(x)=g(h(x))
(g○h)(x)=2(x^2+4)
(g○h)(x)=2x^2+8
(g○h)(3)=2(3^2)+8
(g○h)(3)=2(9)+8
(g○h)(3)=18+8
(g○h)(3)=26
Table that organizes two categorical variables is called?
It says it has 13 letters
Answers
Suppose that 66% of people own dogs. if you pick two people at random, what is the probability that they both own a dog?
Answers
The probability of two people owning a dog when 66% of people own dogs is found by squaring the probability (0.66), giving us a result of 0.4356 or 43.56%.
Explanation:The question asks to calculate the probability that both people picked at random own a dog when it is known that 66% of people own dogs. To find this probability, we can simply multiply the probability of the first person owning a dog by the probability of the second person owning a dog, assuming that these events are independent.
The probability that one person owns a dog is given as 66%, which is 0.66 in decimal form. Thus, the probability that both people own a dog is 0.66 × 0.66 (or 0.66 squared). Calculation yields:
0.66 × 0.66 = 0.4356
Therefore, the probability that both people own a dog is 0.4356, or 43.56%.
Solve using perfect square factoring patterns. x2 – 8x + 16 = 25
Answers
-25 both sides
x^2-8x-9=0
(x-9)(x+1)
x=9,-1
Suppose a youth organization wants to choose a president, vice-president and secretary for the upcoming year from its 35 person membership. In complete sentences, explain why this is a permutation. Determine how many different ways the youth board can be chosen.
Answers
is the formula which gives the total number of permutations of r objects out of n.
A permutation means an arrangement in a list, be it horizontally, or vertically.
So there is a first place, a second and so on.
Example: a, b, c and a, c, b are 2 different permutations.
with these in mind:
the problem described is a permutation problem, because the order is important.
We do not only care whether a certain person is chosen among the 3, we also care what position he/she will hold.
The total number of permutations of 3 objects out of 35 is calculated by the formula:
[tex]P(35, 3)=\frac{35!}{(35-3)!}=\frac{35!}{(32)!}= \frac{35*34*33*32!}{32!}=35*34*33=39,270[/tex]
Answer: 39, 270
What is the correct name for this circle?
Answers
the circled is named for the letter in the center
so this one is named circle C
A bridge in the shape of an arch connects two cities separated by a river. The two ends of the bridge are located at (–7, –13) and (7, –13), and the center of the arch on the bridge is located at (0, 0). Find the equation of the arch of the bridge.
Answers
The equation of the arch is y = (-13/49)x².
The equation of an arch can be described by a parabola when one side of the arch mirrors the other side. This is the case for the bridge problem given.
The center of the bridge is at the origin (0, 0), and it is the vertex of the parabola. Since the arch is symmetrical and the x-coordinate of the vertex is 0, the parabola is a vertical one. Thus, the equation will be in the form y = ax². To find the value of a, we will use the fact that one end of the bridge is at (7, -13).
Since (7, -13) is a point on the parabola, by plugging these values into the equation y = ax², we get:
-13 = a(7²)
-13 = 49a
a = -13/49
Thus, the equation is y = (-13/49)x².
On a blueprint, the scale indicates that 7 cm represent 16 ft. What is the length of a room that is 9.8 cm long and 5 cm wide on the blueprint?
Answers
7/16 =9.8/ x =156.8/7 = 22.4 feet long
7/16 = 5/x = 80/7 = 11.428 feet wide round to 11.43 or 11.4 feet
The variable Z is directly proportional to X. When X is 3, Z has the value 54. Wha is the value of Z when X= 12
Answers
Z = kX (Where k is the constant of proportionality)
To find k
54 = k3
k = 54/3
k = 18
now find new Z
Z = 18X
Z = 18(12)
Z = 216
What is the data path width for a dimm that supports ecc?
Answers
Normally, the data path width for DIMMs is 64 bits but for the DIMMs that support ECC, the data path is 72 bits.
To add, error checking uses the extra 8 bits. ECC memory is more reliable than non-ECC memory but it costs more than a non-ECC memory. Comprising the DIMMS are a series of dynamic random-access memory integrated circuits. Mounted on a printed circuit board, these modules are designed for use in personal computers, workstations and servers.
The most common kinds of internal data corruption are detected and corrected by a type of computer data storage called error-correcting code memory.
Find the solution of this system of equations.
Separate the x- and y-values with a comma.
x= 5 + y
28x – 9y= -12
Answers
28x – 9y = -12
substitute x= 5 + y into 28x – 9y = -12
28x – 9y= -12
28(5 + y) – 9y = -12
140 + 28y - 9y = -12
19y = -152
y = -8
x = 5 + y
x = 5 - 8
x = -3
solution (-3, -8)
Given the following linear function sketch the graph of the function and find the domain and range.
F(x)=2/7x-2
Answers
Domain and range are from negative infinity to positive infinity or all real numbers
Mike and adam left a bus terminal at the same time and traveled in opposite directions. mike’s bus was in heavy traffic and had to travel 20 mi/h slower than adam’s bus. after 3 hours, their buses were 270 miles apart. how fast was each bus going?
Answers
mike's bus speed = m
total distace = t
m = a - 20
after 3 hour:
3 * (m + a) = t
3 * (m + a) = 270
3m + 3a = 270
[ 3 * (a - 20) ] + [ 3 * a ] = 270
[ 3a - 60 ] + 3a = 270
3a - 60 + 3a = 270
3a + 3a = 270 + 60
6a = 330
their speed:
a = 55
m = 55 - 20 = 35
Find the sum of the arithmetic sequence. 15, 17, 19, 21, ..., 33
Answers
sum = [tex] n *\frac{ a_{1} + a_{n} }{2} [/tex]
in our case n = 10, a1 = 15 and An = 33 so the answer will be:
sum = 10 * (33 + 15)/2 = 10 * 48 / 2 = 10 * 24 = 240
Answer:
240
Step-by-step explanation:
Hope this helps! :)
Given a soda can with a volume of 15 and a diameter of 2, what is the volume of a cone that fits perfectly inside the soda can? (Hint: only enter numerals in the answer blank).
Answers
that is 5
Answer:
5 cubic units.
Step-by-step explanation:
We have been given that a can soda can has a volume of 15 cubic units and a diameter of 2.
First of all let us find the height of cylinder using volume of cylinder formula.
[tex]\text{Volume of cylinder}=\pi r^2 h[/tex], where,
r = radius of cylinder,
h = Height of cylinder.
Now let us divide our diameter by 2 to get the radius of cylinder.
[tex]\text{radius of cylinder}=\frac{2}{2}=1[/tex]
Let us substitute our given values in volume of cylinder formula to get the height of cylinder.
[tex]15=\pi*1^2*h[/tex]
[tex]15=\pi*h[/tex]
[tex]\frac{15}{\pi}=\frac{\pi*h}{\pi}[/tex]
[tex]\frac{15}{\pi}=h[/tex]
Now we will use volume of cone formula to find the volume of our given cone inscribed inside cylinder.
[tex]\text{Volume of cone}=\frac{1}{3}\pi*r^2h[/tex]
Since the height and radius of the largest cone that can fit inside the can will be equal to height and radius of can, so we will substitute [tex]\frac{15}{\pi}=h[/tex] and [tex]r=1[/tex] in the volume formula of cone.
[tex]\text{Volume of cone}=\frac{1}{3}\pi*1^2*\frac{15}{\pi}[/tex]
[tex]\text{Volume of cone}=\frac{1}{3}*1*15[/tex]
[tex]\text{Volume of cone}=5[/tex]
Therefore, volume of our given cone will be 5 cubic units.
Simplify 12 to the 16th power over 12 to the 4th power
Answers
[tex] \frac{ 12^{16}}{12^{4} } [/tex]
Do solve for this, we actually just have to do one thing since our number is the same - subtract the exponents.
When you divide by exponents, you are subtracting them.
For example;
[tex] \frac{ x^{5} }{x^{2} } [/tex]
Subtract the exponents.
[tex] x^{3} [/tex] is your answer for this example.
Let's apply this to our current expression.
[tex] \frac{ 12^{16}}{12^{4} } [/tex]
Subtract the exponents.
[tex] 12^{12} [/tex] is your simplified expression with exponents.
I hope this helps!
Find the fifth roots of 243(cos 240° + i sin 240°)
Answers
zⁿ = rⁿ(cos.n.Ф + i.sinn.Ф).
The 5th root, that means that n = 1/5 ↔↔↔ rⁿ = r¹/₅ = ⁵√r
zⁿ = ⁵√(243) [cos (240+2kπ)/5 +i.sin(240+2kπ)/5]
with k = 1,2,3,..,n-1. Note that ⁵√(243) = 3
1st root : for k=0 → 3[cos(240/5)+isin(240/5) = 3(cos48°+isin48°)
2nd root : for k=1→3[cos(240+360)/5)+isin(240+360)/5]=3(cos120°+isin120°)
3rd root : for k=2 →→ 3(cos192 + isin192)
4th root : for k=3→→3(cos264+isin264)
5th root : for k =4↔↔3(cos336+isin336)
Which is the slope of the line that connects points (3,17) and (7,25) ?
Answers
slope=(y2-y1)/(x2-x1) where (x1,y1) and (x2,y2) are any two points...
slope=(25-17)/(7-3)
slope=8/4
slope=2
8/4, reduced to 2/1.
2/1 is the correct answer.
What value should go in the empty box to complete the calculation for finding the product of 62.834 × 0.45?
Answers
A triangle has coordinates A (1, 5), B (-2, 1) and C (0, -4). What are the new coordinates if the triangle is dilated with a scale factor of 1/5?
Answers
What time is 5 3/4 hours after 9:22 PM?
Answers
3/4 hours = 45 minutes
22 + 45 = 67 = 1 hrs 7 minutes
15 hrs 7 minuts = 3:07 AM
Solve the inequality. 8x-5>_27. A.x>_4. B.x>_11/4. C.x<_4. D.x<_11/4
Answers
8x ≥ 32 <-- Add 5 to both sides
x ≥ 4 <-- Divide both sides by 8
So, to be in solution set, x has to be greater or equal to 4.
In interval notation: [4, ∞)
In a set builder notation: {x | x ∈ R, x ≥ 4}
The solution for the inequality 8x - 5 ≥ 27 can be written as x [4, ∞) or x ≥ 4, so option A is correct.
What is inequality?An inequality is a relation that compares two numbers or other mathematical expressions in an unequal way. It is most frequently used to compare the sizes of two numbers on the number line.
Given:
8x - 5 ≥ 27
Solve the above inequality as shown below,
Add 5 to both sides of an inequality,
8x - 5 + 5 ≥ 27 + 5
8x ≥ 32
Divide both sides by 8,
8x / 8 ≥ 32 / 8
x ≥ 4
x [4, ∞)
Thus, x can be any real number greater than 4 or equal to four.
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What is the y intercept of Y = 3x - 4?
Answers
y = mx + b
y = 3x + (-4)
so ur y intercept is -4
What is the problem to this
Answers
24:x
Set up a proportion
4/9=24/x
4x=216
x=54
a) 54 is your answer
hope this helps, and please give brainliest if it does!
__________________________
Given: "For every 4 people that made the team, 9 people did not make the team. 24 people made the team. How many did NOT make the team?
24 people made the team. How many groups of 4 people is that?
24 divided by 4 equals: "6".
__________________________
6 * 9 = 54 .
__________________________
The answer is: [A]: " 54 " .
__________________________
Find the indicated terms of the sequence defined by each of the following recursive formulas:
a3 = −11 and an = 2an − 1 − 1
a2 =
a4 =
a4 = −36 and an = 2 an − 1 − 4
a3 =
a2 =
Answers
Answer:
1.
Given the recursive formula:
[tex]a_3 = -11[/tex] and
[tex]a_n = 2a_{n-1} -1[/tex]
For n = 3:
[tex]a_3=2a_2 -1[/tex]
Substitute [tex]a_3 = -11[/tex] we have;
[tex]-11=2a_2 -1[/tex]
Add 1 to both sides we have;
[tex]-10 = 2a_2[/tex]
Divide both sides by 2 we have;
[tex]-5 = a_2[/tex]
or
[tex]a_2 = -5[/tex]
For n = 4, we have;
[tex]a_4=2a_3 -1[/tex]
Substitute [tex]a_3 = -11[/tex] we have;
[tex]a_4 = 2 \cdot -11 -1 = -22-1 = -23[/tex]
⇒[tex]a_4 = -23[/tex]
2.
Given:
[tex]a_4 = -36[/tex] and [tex]a_n = 2a_{n-1} -4[/tex]
For n = 4, we have;
[tex]a_4=2a_3 -4[/tex]
Substitute [tex]a_4 = -36[/tex] we have;
[tex]-36 = 2a_3 -4[/tex]
Add 4 to both sides we have;
[tex]-32 = 2a_3[/tex]
Divide both sides by 2 we have;
⇒[tex]a_3 =-16[/tex]
For n = 3:
[tex]a_3=2a_2 -4[/tex]
Substitute [tex]a_3 = -16[/tex] we have;
[tex]-16=2a_2 -4[/tex]
Add 4 to both sides we have;
[tex]-12 = 2a_2[/tex]
Divide both sides by 2 we have;
[tex]-6 =a_2[/tex]
or
⇒[tex]a_2 = -6[/tex]
The indicated terms of the sequence defined by each of the following recursive formulas are as follows:
[tex]\mathbf{a_{2} = -5}[/tex][tex]\mathbf{a_4 = -23}[/tex][tex]\mathbf{{a_3}=-16}[/tex][tex]\mathbf{{a_2}=-6}[/tex]What are recursive formulas?A recursive formula is one that describes each term in a series in terms of the term before it. The general term for an arithmetic sequence by using a recursive formula is [tex]\mathbf{a_n = a_{n-1} + d}[/tex]
From the given information:
[tex]\mathbf{a_3 = -11}[/tex] [tex]\mathbf{a_n = -2a_{n-1} -1}[/tex]Now, when n = 3
[tex]\mathbf{a_3 = -2a_{3-1} -1}[/tex]
[tex]\mathbf{-11= -2a_{2} -1}[/tex]
[tex]\mathbf{2a_{2} = -10}[/tex]
[tex]\mathbf{a_{2} = -5}[/tex]
When n = 4
[tex]\mathbf{a_4= -2a_{4-1} -1}[/tex]
[tex]\mathbf{a_4 = 2(-11) -1}[/tex]
[tex]\mathbf{a_4 = -23}[/tex]
Second Part:
[tex]\mathbf{a_4 = -36}[/tex][tex]\mathbf{a_n = 2_{an-1}-4}[/tex]When n = 4
[tex]\mathbf{a_4 = 2_{a4-1}-4}[/tex]
[tex]\mathbf{a_4= 2_{a3}-4}[/tex]
[tex]\mathbf{-36+4= 2_{a_3}}[/tex]
[tex]\mathbf{2_{a_3}=-32}[/tex]
[tex]\mathbf{{a_3}=-16}[/tex]
When n = 3
[tex]\mathbf{a_3= 2_{a3-1}-4}[/tex]
[tex]\mathbf{a_3= 2_{a2}-4}[/tex]
[tex]\mathbf{-16= 2_{a_2}-4}[/tex]
[tex]\mathbf{2_{a_2}=-12}[/tex]
[tex]\mathbf{{a_2}=-6}[/tex]
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A student took a test which had 6 questions. He would score 8 points on the test if all his answers are correct. If y represents the student's score when he got x questions incorrect, which graph best represents this situation?
Answers
m=(8-0)/(6-0)
m=8/6
m=4/3, and since we know we have the point (0,0) we know the line is just:
y=mx, using m found above...
y=4x/3
So the graph that will match this line is one that has a point on the origin and has a positive slope of 4/3. So another point other than the origin that will be quite clear is the point (3, 4)
Please Help! Given that line s is perpendicular to line t, which statements must be true of the two lines? Check all that apply.
a.Lines s and t have slopes that are opposite reciprocals.
b.Lines s and t have the same slope.
c.The product of the slopes of s and t is equal to -1
d.The lines have the same steepness.
e.The lines have different y intercepts.
f.The lines never intersect.
g.The intersection of s and t forms right angle.
h.If the slope of s is 6, the slope of t is -6
Remember, it is check all that apply, so there will be multiple answers.
Answers
the products of the slopes of s and t is equal to -1
they have different y int's
In geometry, when line s is perpendicular to line t, statements a, c, and g are true: Lines s and t have slopes that are opposite reciprocals, the product of the slopes of s and t equal -1, and the intersection of s and t forms a right angle.
Explanation:In geometry, if line s is perpendicular to line t, several facts about these two lines can be stated:
a. Lines s and t have slopes that are opposite reciprocals. This is true. If the slope of one line is m, the slope of the line perpendicular to it is -1/m.b. Lines s and t have the same slope. This is false as orthogonal lines have slopes that are negative reciprocals of each other.c. The product of the slopes of s and t is equal to -1. This is true. When two lines are perpendicular, the product of their slopes is -1.d. The lines have the same steepness. This is false because perpendicular lines have different slopes.e. The lines have different y intercepts. This assertion is not necessarily true. Perpendicular lines may or may not have different y-intercepts.f. The lines never intersect. This is false. Perpendicular lines intersect once, forming a 90 degrees angle.g. The intersection of s and t forms a right angle. This is true. The definition of perpendicular lines states that they intersect at a right angle.h. If the slope of s is 6, the slope of t is -6. This is false. If the slope of s is 6, the slope of t, being a negative reciprocal, would be -1/6, not -6.Learn more about Perpendicular Lines here:https://brainly.com/question/18271653
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A small school has 110 students who occupy three classrooms: a, b, and
c. after the first period of the school day, half the students in room a move to room b, one-fifth of the students in room b move to room c, and one-third of the students in room c move to room
a. nevertheless, the total number of students in each room is the same for both periods. how many students occupy each room?
Answers
There are 20, 50 and 30 in each room respectively.
What is equation?An equation is a mathematical statement that shows that two mathematical expressions are equal.
Given that, there are 110 students in total in all the class.
According to question,
a+b+c = 110
After the room changes, we have
a/2 + c/3 = a
4b/5 + a/2 = b
2c/3 + b/5 = c
or,
a/2 = c/3
a/2 = b/5
b/5 = c/3 = a/2
so, substituting in,
a + 5a/2 + 3a/2 = 110
2a + 5a + 3a = 220
a = 22
b = 55
c = 35
Hence, there are 20, 50 and 30 in each room respectively.
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HELP If f(x)=1/7x-9,then f^-1(x)=?
Answers
Answer:
Plato/Edementum
Step-by-step explanation:
this is the correct answer if you are taking Inverse of a Function: Mastery Test just type in 7x+63 type it in like that and it will be correct