The distance of AB is 117.992 meters.
What is Law of Sines?Law of sines is a law in trigonometry which states that the ratios of the angle to the opposite side of a triangle are equal.
For triangle ABC,
sin A / a = sin B / b = sin C / c
where a, b and c are the sides opposite to the angles A, B and C respectively.
Here,
∠B = 112° 10' = 112° + 0.167° = 112.167°
∠C = 15° 20' = 15° + 0.333° = 15.333°
By the angle sum property of triangle,
∠A = 180° - (∠B + ∠C)
∠A = 180° - (112.167° + 15.333°)
= 52.5°
Using law of sines,
sin A / BC = sin C / AB
sin (52.5°) / 354 = sin (15.333°) / AB
AB = [354 × sin (15.333°)] / [sin (52.5°)]
AB = [354 × 0.264] / [0.793]
AB = 117.992 meters
Hence the distance across the river is 117.992 meters.
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Given EFG=XYZ, find m
Therefore , the solution of the given problem of triangle comes out to be m∠x = 30° they are congruent.
What precisely does a triangle mean?Triangles are included in polygons because they have four aspects or more. It is simple and geometric in design. The triangle formed by the letters ABC has a square angle. A single rectangles or square is produced by euclidean geometry when the sides are not coinciding. Triangles are polygons because they have three parts and three corners. The intersection of a triangle's three sides forms its corners. A triangle has 180 degrees of angles in all.
Here,
Given :
=> ΔEFG ≅ ΔXYZ
In ΔEFG
=> 90° + 60° + x = 180°
=> 150° + x = 180°
=> x = 180° - 150°
=> x = 30°
Since . they are congruent .
So m∠x = 30°
Therefore , the solution of the given problem of triangle comes out to be m∠x = 30° they are congruent.
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20 POINTS PLEASE ANSWER QUICK
Solve the equation —1/6(12 + 18t) = 13 for t
Answer: t=-5
Step-by-step explanation:
Multiply by -6 on both sides to get rid of the -1/6
Subtract 12 on both sides
Divide 18 by -90 on the other side
[tex](-1/6(12+18t))(-6)=13(-6)\\12+18t=-78\\18t=-90\\\\t=-5[/tex]
if the economy is producing 12 units of guns and 4 units of butter, what is the opportunity cost of increasing the production of butter from 4 units to 11 units?
If the economy is producing 12 units of guns and 4 units of butter, the opportunity cost of increasing the production of butter from 4 units to 11 units is 4 units of guns.
What is an opportunity cost?In Economics, an opportunity cost is sometimes referred to as alternative forgone and it can be defined as the value, profit or benefits that are given up and forfeited by an individual or business organization, in order to choose or acquire something that is deemed most significant at a particular point in time.
This ultimately implies that, the opportunity cost of owning or earning a thing is the alternative that is foregone in the attainment or earning of another value, profit or benefits.
Cost increase = 11 units - 4 units = 7 units of butter.
In this context, we can reasonably infer and logically deduce that the opportunity cost of 7 more units of butter would be 4 units of guns.
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Find an equation in point-slope for the line having the slope m=5. and containing the point (3,4)
Answer:
slope:m=5m=5
Step-by-step explanation:
Step-by-step explanation:
y-y1=m (x-x1)
y-4=5 (x-3)
y-4=5x-15
5x-y=11
There are 10 tricycles and bicycles in all.
If there are 23 wheels, how many are bicycles and how many are tricycles?
Answer:
see below
Step-by-step explanation:
tricycles = x
bicycles = y
x+y =10 so y=10-x
3x+2y=23
so 3x + 2(10-x) =x+20 =23
so x=3
y = 7
Write a congruence statement for the above triangles
The congruence statement for the triangle is: The triangles ABC and LMN are congruent using the SSS criteria.
What are congruent triangles?Triangle congruence: If all three corresponding sides and all three corresponding angles are equal in size, two triangles are said to be congruent. Slide, twist, flip, and turn these triangles to create an identical appearance. They are in alignment with one another when moved.
For the given triangles ABC and triangle LMN we can see that:
Line segment AB = LM
Segment AC= LN
and, CB = MN
Hence, the congruence statement for the triangle is: The triangles ABC and LMN are congruent using the SSS criteria.
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Help 20 points (show your work)
The measure of angle ADC in the geometric system is equal to 55°.
How to determine the value of an angle related to a geometric system
In this question we find a geometric system formed by a quadrilateral and an angle vertical to a vertex of the quadrilateral. Angle CDE is supplementary to angles EDF and ADC. Two angles are supplementary whose sum of measures equals 180°. Therefore:
m ∠ CDE + m ∠ EDF = 180°
(2 · x + 1) + (x - 7) = 180°
3 · x - 6 = 180°
3 · x = 186°
x = 62
m ∠ CDE = 2 · x + 1
m ∠ CDE = 2 · 62 + 1
m ∠ CDE = 125°
m ∠ ADC = 180° - 125°
m ∠ ADC = 55°
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PLEASE HELP!!!!!!!!!!!
The decimal number 0.4 is greater than 0.25.
What is decimal?Decimals are numbers that have two components, a whole number component and a fractional component, which are separated by a decimal point.
There are 25 out of 100 shaded cubic part.
That means, the number is 0.25.
From the given choices:
0.4 > 0.25.
Therefore, 0.4 is the required decimal number.
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Show that x-3 and x+5 are factors of x^4+2x^3-16x^2-2x+15. Explain your reasoning using long division, Synthetic Division and Remainder theorem.
Answer:
Step-by-step explanation:
To show that x-3 and x+5 are factors of x^4+2x^3-16x^2-2x+15, we can use polynomial division, synthetic division, and the Remainder theorem.
Using long division, we can divide x^4+2x^3-16x^2-2x+15 by x-3:
x^4 + 2x^3 - 16x^2 - 2x + 15
÷ x - 3
_________________________
x^3 + 5x^2 - 14x - 12
|__________
-3x^3 + 17x^2 + 26x + 36
|_________
-14x^2 - 23x - 36
|_________
-15x + 72
|___
57
So, the remainder is 57, which means x^4 + 2x^3 - 16x^2 - 2x + 15 = (x - 3)(x^3 + 5x^2 - 14x - 12) + 57.
Using synthetic division, we can divide x^4 + 2x^3 - 16x^2 - 2x + 15 by x+5:
1 2 -16 -2 15
x + 5 |x^4 + 2x^3 - 16x^2 - 2x + 15|
____________________________
x^3 - 3x^2 + 21x + 75
So, the remainder is 0, which means x^4 + 2x^3 - 16x^2 - 2x + 15 = (x + 5)(x^3 - 3x^2 + 21x + 75).
Using the Remainder theorem, we know that if a polynomial p(x) is divided by x-a, the remainder is p(a). So, when we plug in x=3, the remainder should be p(3) = 57. When we plug in x=-5, the remainder should be p(-5) = 0. This confirms that x-3 and x+5 are indeed factors of x^4 + 2x^3 - 16x^2 - 2x + 15.
there are 12 balls to every 2 pits. If Fred has 40 balls in his room, how many pits are in his room?
Your answer may be exact or accurate to the nearest tenth.
if Fred has 40 balls in his room then there are 7 pits in his room.
What is Ratio?A ratio is an ordered pair of numbers a and b, written a / b where b does not equal 0.
Given that there are 12 balls to every 2 pits
Fred has 40 balls in his room
We have to find the number of pits for 40 balls
Let x be the number of pits for 40 balls.
Form an proportional equation
12/2=40/x
6=40/x
x=40/6=20/3
x=6.667=7
Hence, if Fred has 40 balls in his room then there are 7 pits in his room.
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each person wants to make 36 wreaths to sell at the craft fair. Each wreath needs 2 1/4 yards of ribbon. How many yards of ribbon does the person need to make all the wreaths?
Answer:
81
Step-by-step explanation:
[tex]2\frac{1}{4}*36\\ \\\frac{9}{4}*\frac{36}{1} \\ \\\frac{324}{4} =81[/tex]
A recipe calls for cup
of chopped walnuts. You chop 4 walnuts
and get of the amount you need.
-
4
How much more of a cup of chopped
walnuts do you need? All your walnuts
are the same size. How many more
walnuts should you chop? Explain.
If you already chopped 4 walnuts and you have only gotten 1/4 cup of the chopped walnuts, it means that each walnut yields 1/4 cup / 4 walnuts = 1/16 cup of chopped walnuts.
To find out how much more chopped walnuts you need, we can subtract the amount you have from the total amount the recipe calls for:
1 cup - 1/4 cup = 3/4 cup
So you need 3/4 cup of chopped walnuts more.
To find out how many more walnuts you should chop, divide the amount you need by the amount each walnut yields:
3/4 cup / (1/16 cup/walnut) = 12 walnuts
So you should chop 12 more walnuts to get the desired amount.
Write in the missing angle measures of WXYZ and then find the sum of the interior angles.
Answer:
X = 50
Z = 50
W = 130
Y = 130
Sum of Interior Angles: 360 degrees
Step-by-step explanation:
We can infer from the diagram, X = 50, therefore Z must be as well. W is congruent to Y, so 260 / 2 = 130. Quadrilateral is equal to 360 degrees.
The lateral height of a cone is 8 inches and the area of the base of the cone is 49π in². It requires 2.5 minutes to paint the cone.
The area of the base is doubled.
How long will it take to paint this cone if it can be painted at the same rate? Use π≈3.14.
Enter your answer, rounded to the nearest tenth, in the box.
The time required to paint the cone when the base area is doubled is determined as 5.0 minutes.
How will it take to paint the cone when the area of the base doubles?
The amount of time requires to paint the entire cone when the area of the base of the cone is doubled is calculated using simple proportion as shown below;
time
Area of base of cone = 49π in². -----------------------> 2.5 minutes
Area of base of cone = 2 (49π in² ) -------------------> ?
49 x = ( 2 x 49 x 2.5 )
x = 2 x 2.5 min
x = 5.0 minutes
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In rectangle PQRS, the diagonals intersect each other at point T. If PR = 9 and PQ = 7 what is the area of PQR? Round to the nearest tenth.
On solving the provided question, we can say that In rectangle, the two diagonals are in congruence , the diagonals bisect each other. PT=TR=ST=TQ=1/2PR=1/2QS =1/2×22.8=11.4
What is rectangle?A rectangle in Euclidean plane geometry is a quadrilateral with four right angles. You might also describe it as follows: a quadrilateral that is equiangular, which indicates that all of its angles are equal. The parallelogram might also have a straight angle. Squares are rectangles with four equally sized sides. A quadrilateral of the shape of a rectangle has four 90-degree vertices and equal parallel sides. As a result, it is sometimes referred to as an equirectangular rectangle. Because its opposite sides are equal and parallel, a rectangle is also known as a parallelogram.
Rectangle, two diagonals are in congruence
⇒PR=QS=22.8
The diagonals bisect each other.
⇒PT=TR=ST=TQ=1/2PR=1/2QS
=1/2×22.8=11.4
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fill in the missing numbers: c) -----, 3.840, 3.836, 3.832------,3.824, 3.820
d) 30.565, 31.065, 31.565, -----32.565, 33.065,
Answer:
3.844, 3.840, 3.836, 3.832, 3.828 ,3.824, 3.820 - minus by 4
30.565, 31.065, 31.565, 32.065, 32.565, 33.065, - minus 0.5 , -0.5 , 0.5 .......
Find the perimeter of the figure to the right.
Answer: [tex]11a+16[/tex] feet
Step-by-step explanation:
The perimeter is equal to the sum of the lengths of the sides.
[tex]2a+2a+2a+8+5a+8=11a+16[/tex]
In which of these diagrams does the shaded region show
a) the locus of points that are less than 5 cm from P?
b) the locus of points that are closer to Q than to P?
c) the locus of points that are more than 5 cm from Q?
A
D
p
P"
5 cm
Q
5 cm
¹Q
B
E
P
P
5 cm
"Q
*Q
C
F
p²
P'
5 cm
*Q
Q
a) The locus of points that are less than 5 cm from P is (A)
b) The locus of points that are closer to Q than to P is (F)
c) The locus of points that are more than 5 cm from Q is (D),
What is Locus point in Circle?A locus is a curve or other shape created in mathematics from all the points that meet a specific equation describing the relationship between the coordinates, or from a point, line, or moving surface. The locus defines all shapes as a set of points, including circles, ellipses, parabolas, and hyperbolas.
Given:
a) The point A is less than 5cm away from point P is int he circle centered on P.
b) The option E is point closer to P than Q.
The option F is point closer to Q than P.
c) The option D point more than 5 cm away from Q on the outside of the circle centered on Q.
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Suppose that a single die with 19 sides (numbered 1, 2, 3, ... , 19) is rolled once. What is the probability of getting an even number.
Step-by-step explanation:
To find the probability of getting an even number, we need to count the number of even numbers and divide it by the total number of sides of the die:
Number of even numbers = 10 (2, 4, 6, 8, 10, 12, 14, 16, 18, 19)
Total number of sides = 19
P(even number) = Number of even numbers / Total number of sides = 10/19 = 0.526 (or 52.6%)
Find an angle θ that is coterminal with an angle, in radians, measuring 14π/3, where 0≤θ<2π. Give your answer as an exact answer involving π, if necessary.
The angle θ that is coterminal with angle 14π/3, is 20π/3
What is coterminal angle?Coterminal angles are the angles that have the same initial side and share the terminal sides. These angles occupy the standard position, though their values are different. They are on the same sides, in the same quadrant and their vertices are identical.
Given that, we need to find a coterminal angle of 14π/3,
The formula to find the coterminal angles is, θ ± 2πn where, n is an integer and it denotes the number of rotations around the coordinate plane.
For finding one coterminal angle: n = 1 (anticlockwise)
Then the corresponding coterminal angle is,
= 14π/3 + 2πn
= 14π/3 + 2π(1)
= 14π/3 + 2π
= 20π/3
Hence, the angle θ that is coterminal with angle 14π/3, is 20π/3
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From a group of eight people, two individuals are to be selected at random. How many selections are possible?
Answer:
28 different selections
Step-by-step explanation:
The number of ways in which k items can be drawn from a larger sample of n items is given by:
[tex]nC_k\;[/tex] pronounced as "n choose k" relates to a class of problems known as combinatorics
[tex]nC_k\;[/tex] is given by the formula
[tex]nC_k\; =\dfrac{n!}{k!(n-k)!}[/tex]
where ! stands for the factorial of a number
n! = n x (n-1) x ...... x 3 x 2 x 1
Plugging values of n and k into the equation we get
[tex]8C_2\; =\dfrac{8!}{2!(8-2)!} = \dfrac{8!}{2!\;6!}[/tex]
We can rewrite 8! as 8 x 7 x 6!
So
[tex]8C_2\; =\dfrac{8\cdot 7 \cdot 6!}{2!\; 6!} = \dfrac{8 \cdot 7}{2 \cdot 1} = \dfrac{56}{2} = 28[/tex]
Central Angles
please type the solution and determine if it's minor or major arc or semi circle
need asap
Answer:
∠YPV = 50°
∠XPV = 130°
∠WPZ = 85°
1. Arc YZ is a minor arc.
2. Arc WX is a minor arc.
3. ∠VPZ = 95°
4. Arc VZ is a minor arc.
5. Arc VWX is a major arc.
6. Arc ZVW is a major arc.
7. Arc YWZ is a major arc.
8. Arc ZXW is a major arc.
9. ∠VPX = 130°
10. Arc XVY is a semicircle.
11. Arc XWY is a semicircle.
12. Arc WZX is a major arc.
Step-by-step explanation:
As WV and XY are diameters, and ∠WPX = 50° then according to the vertical angles theorem, ∠YPV = 50°.
As VW is a diameter of circle P, and angles on a straight line sum to 180°:
⇒ ∠WPX + ∠XPV = 180°
⇒ 50° + ∠XPV = 180°
⇒ ∠XPV = 130°
As XY is a diameter of circle P, and angles on a straight line sum to 180°:
⇒ ∠WPZ + ∠ZPY + ∠YPV = 180°
⇒ ∠WPZ + 45° + 50° = 180°
⇒ ∠WPZ + 95° = 180°
⇒ ∠WPZ = 85°
Add the central angles to the given circle diagram (see attachment).
Definition of ArcsMinor arc: An arc whose measure is less than 180°.Note that two-letter arcs might not necessarily be minor arcs if their measure is more than 180°. Therefore, use circle P to double-check each two-letter arc.
Note that three-letter arcs might not necessarily be major arcs if their measure is less than 180°. Therefore, use circle P to double-check each three-letter arc.
As WV and XY are diameters of circle P, when the endpoints of a three-letter arc are the endpoints of one diameter, the arc will be a semicircle.
1. Arc YZ is a minor arc.
2. Arc WX is a minor arc.
3. ∠VPZ = 50° + 45° = 95°
4. Arc VZ is a minor arc.
5. Arc VWX is a major arc: Start at endpoint V, move counterclockwise around the circle through point W through to endpoint X.
6. Arc ZVW is a major arc: Start at endpoint Z, move clockwise around the circle through point V through to endpoint W.
7. Arc YWZ is a major arc: Start at endpoint Y, move clockwise around the circle through point W through to endpoint Z.
8. Arc ZXW is a major arc: Start at endpoint Z, move clockwise around the circle through point X through to endpoint W.
9. ∠VPX = 130°
10. Arc XVY is a semicircle.
11. Arc XWY is a semicircle.
12. Arc WZX is a major arc: Start at endpoint W, move clockwise around the circle through point Z through to endpoint X.
The answers to the respective arcs are given as follows:
∠YPV = 50°∠XPV = 130°∠WPZ = 85°Arc YZ is a minor arc.Arc WX is a minor arc.∠VPZ = 95°Arc VZ is a minor arc.Arc VWX is a major arc.Arc ZVW is a major arc.Arc YWZ is a major arc.Arc ZXW is a major arc.∠VPX = 130°Arc XVY is a semicircle.Arc XWY is a semicircle.Arc WZX is a major arc. What is a Major or Minor Arc?The arcs are defined as follows:
Minor arc: An arc whose measure is less than 180°. Minor arcs are named using the two letters of the endpoints. The two letters can be in any order.Major arc: An arc whose measure is greater than 180°. Major arcs are named using three letters. The two letters at the end of the name are the endpoints of the arc. The middle letter is the name of the point contained in the arc.Semicircle: An arc whose measure is equal to 180°.It is to be noted that two-letter arcs might not necessarily be minor arcs if their measure is more than 180°. Therefore, use circle P to double-check each two-letter arc.
Also, three-letter arcs might not necessarily be major arcs if their measure is less than 180°. Therefore, use circle P to double-check each three-letter arc.
To solve for the arcs:
Given that WV and XY are diameters, and ∠WPX = 50° then according to the vertical angles theorem, ∠YPV = 50°.
As VW is a diameter of circle P, and angles on a straight line sum to 180°:
⇒ ∠WPX + ∠XPV = 180°
⇒ 50° + ∠XPV = 180°
⇒ ∠XPV = 130°
Since XY is a diameter of circle P, and angles on a straight line sum to 180°:
⇒ ∠WPZ + ∠ZPY + ∠YPV = 180°
⇒ ∠WPZ + 45° + 50° = 180°
⇒ ∠WPZ + 95° = 180°
⇒ ∠WPZ = 85°
Given that WV and XY are diameters of circle P, when the endpoints of a three-letter arc are the endpoints of one diameter, the arc will be a semicircle. Thus,
1. Arc YZ is a minor arc.
2. Arc WX is a minor arc.
3. ∠VPZ = 50° + 45° = 95°
4. Arc VZ is a minor arc.
5. Arc VWX is a major arc: Start at endpoint V, move counterclockwise around the circle through point W through to endpoint X.
6. Arc ZVW is a major arc: Start at endpoint Z, move clockwise around the circle through point V through to endpoint W.
7. Arc YWZ is a major arc: Start at endpoint Y, move clockwise around the circle through point W through to endpoint Z.
8. Arc ZXW is a major arc: Start at endpoint Z, move clockwise around the circle through point X through to endpoint W.
9. ∠VPX = 130°
10. Arc XVY is a semicircle.
11. Arc XWY is a semicircle.
12. Arc WZX is a major arc: Start at endpoint W, move clockwise around the circle through point Z through to endpoint X.
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Use the definition of continuity and the properties of limits to show that the function
is continuous at x = -2.
The given function
F(x) = √(8 - x²)/ (2x² - 5)
is continuous at x = -2,
What is continuity ?In mathematics, The function is called as continuous at the particular value of x, if right hand limit, left hand limit and the value of function at x all are equal.
RHL = LHL = F(x)
Limit exist and continuous
Given that,
F(x) = √(8 - x²)/ (2x² - 5)
To check whether it is continuous at x = -2
First taking LHL,
[tex]\lim_{h \to \00}[/tex] √[8 - ( -2 -0)²]/ [2(-2-0)² - 5]
⇒ √4/(8-5)
⇒ 2/3
Now, taking RHL
[tex]\lim_{h \to \00}[/tex] √[8 - ( -2 +0)²]/ [2(-2+0)² - 5]
⇒ √4/(8-5)
⇒ 2/3
The value at x = -2
F(3) = √[8 - ( -2 +0)²]/ [2(-2+0)² - 5]
⇒ √4/(8-5)
⇒ 2/3
RHL = LHL = F(-2)
Hence Proved, the function is continuous at x = -2
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According to the US Census Bureau, the population of the state of Arizona was 5,130,632 people, in the year 2000. In the year 2010, it was 6,392,017 people
1. Use this information to express the population as a linear function of time since the year 2000. (Make sure to define the variables you use.) .
2. What does this model predict that the population will be in the year 2019?
Q2 Linear Functions
A solar water heater costs about $5800 to install. A traditional gas water heater costs about $900 to install and about $325 per year to use. The average annual cost to use the solar water heater is about $90.
Q2.1 Part a)
Grading comment:
Create a total cost function for the solar water heater.
Create a total cost function for the gas water heater.
Make sure to label each function, define your variables, and use proper notation.
Q2.2 Part b)
Graph the functions that you created on the same set of axes. (Make sure to label the axes, label all important points, use an appropriate scale, and use an appropriate window).
How many years would you need to use a solar water heater in order for the total cost to become less than the total cost of the gas water heater? How do you know?
Answer:lmkmonmklmlkmlkn
Step-by-step explanation:;lmklmlkmlkm
Using the rules of inference show that s is a conclusion
1. p → q
2. q → r
3. (q → r) → s
4. p
how to solve?
"s" can be concluded from the premises
How to show that s is the conclusionTo use the rules of inference to show that "s" is a conclusion, we can use modus ponens,
This is a rule that allows us to infer a conclusion from a premise and its conditional statement.
Using modus ponens, we can infer "q" from "p → q" and "p".Next, using modus ponens, we can infer "r" from "q → r" and "q".Finally, using modus ponens, we can infer "s" from "(q → r) → s" and "q → r".Thus, "s" can be concluded from the premises "p → q", "q → r", "(q → r) → s", and "p".
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In ΔJKL, j = 1.7 inches, m m∠J=120° and m m∠K=47°. Find the length of k, to the nearest 10th of an inch.
Answer: We can use the Law of Cosines to find the length of side k in ΔJKL:
k^2 = j^2 + l^2 - 2 * j * l * cos(m∠K)
k = √(j^2 + l^2 - 2 * j * l * cos(m∠K))
Substituting the given values, we get:
k = √(1.7^2 + l^2 - 2 * 1.7 * l * cos(47°))
k = √(2.89 + l^2 - 2.94 * l * cos(47°))
To the nearest 10th of an inch, k = √(2.89 + l^2 - 2.94 * l * cos(47°)) = 3.3 inches.
Step-by-step explanation:
Select whether each of these factors was a reason for or against American neutrality. US trade with Europe was worth almost one billion dollars. for against Intro
________________________
Sunny ko behan mil gayi sonali ✨
The United States' decision to remain neutral was motivated by its over $1 billion in annual trade with Europe.
Why did American neutrality benefit from commerce with Europe?Early 20th-century American trade with Europe helped the US remain neutral by enabling it to maintain business ties with both the Allied and Central Powers.
The US was able to avoid taking a political stance and maintain its neutral status by supplying goods to both sides of the conflict. Additionally, trade helped the US maintain its economic stability because it would have been detrimental to the nation's economy to break off trade with one party.
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The sum of 3x and 70 exceeds 13x
The algebraic representation of the sentence the sum of 3x and 70 exceeds 13x is: 3x + 70 > 13x.
What is algebraic expression?The concept of algebraic expressions is the use of letters or alphabets to represent numbers without providing their precise values. We learned how to express an unknown value using letters like x, y, and z in the fundamentals of algebra. Here, we refer to these letters as variables. Variables and constants can both be used in an algebraic expression. A coefficient is any value that is added before a variable and then multiplied by it.
Given that the sum of 3x and 70 exceeds 13x, this is represented as:
3x + 70 >13x
Hence, the algebraic representation of the sentence the sum of 3x and 70 exceeds 13x is: 3x + 70 > 13x.
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400 wrist watches in a box of 10,000 are defective. If 100 watches are selected at random, find the probability that 50 are defective
Step-by-step explanation:
The probability of selecting a defective watch is 400/10,000 = 2/50.
The probability of selecting 50 defective watches out of 100 selected is given by the binomial distribution:
(100 choose 50) * (2/50)^50 * (1/2)^(100-50) = 0.072.
So the probability that exactly 50 out of 100 selected watches are defective is approximately 0.072.
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The solution to the integral ∫ [csc x · (cot x + csc x)] dx is - (csc x + cot x) + C. (Correct choice: A)
How to solve an integral by integral tables
In this problem we find the case of an integral involving trigonometric functions, this can be solved quickly by means of algebra properties and integral tables. Integral tables are an useful resource to find the result of integrals that require a lot of time to be solved.
First, write the function within the integration operator and simplify by algebra properties:
csc x · (cot x + csc x)
csc x · cot x + csc² x
Second, rewrite the integral by integral properties:
∫ [csc x · (cot x + csc x)] dx = ∫ csc x · cot x dx + ∫ csc² x dx
Third, use integral tables to find the solution to the integral:
∫ [csc x · (cot x + csc x)] dx = - csc x - cot x + C
∫ [csc x · (cot x + csc x)] dx = - (csc x + cot x) + C
Where is C is the integration constant.
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