The Pythagorean Theorem is proven.
The reason that we can make the statement BC/AC = CD/AC is because corresponding sides of similar triangles are proportional. This is represented by option D. Corresponding sides of similar triangles are proportional.
To complete the proof of the Pythagorean Theorem, a² + b² = c², we can use the following steps:
As similar triangles have proportional sides, we can write the proportions AB/AC = AC/BC and AB/BC = BC/AC.
By the cross-product property, AB * BC = AC * AC and AB * AC = BC * BC.
By the addition property of equality, AB² + BC² = AC² + BC².
By the segment addition postulate, AC + BC = c.
By factoring, (AC + BC)² = c².
By the distributive property, AC² + 2*AC*BC + BC² = c².
By rearranging the terms, AC² + BC² = c² - 2*AC*BC.
By substituting the values of AC and BC from the proportions in step 1, we get a² + b² = c² - 2*a*b.
By simplifying, we get a² + b² = c².
Therefore, the Pythagorean Theorem is proven.
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Please Answer these questions asap
Question 1: Find the radius of the small
circle.
A = 125 pie
R = 15
r = ?
Question 2: Find the shaded area.
1) The radius of the small circle r is 5√5 and 2) The shaded area will be 13.5π cm².
Area of circle A = 125 π, Radius of circle R = 15, We need to find the radius of the small circle r. By comparing both circles,Area of circle A = πR² 125π = π × 15² 125π = π × 225, 125π = 225 πr², r² = (125π) / πr² = 125r = √125r = 5√5. Hence, the radius of the small circle r is 5√5.
A circle of radius 9 cm with a sector of angle 60° cut out. We know that the area of the circle is given by ,Area of circle = πr² Where, r = 9 cm Area of circle = π × 9²= π × 81= 81 π. Since we have cut a sector of 60°,The remaining angle = 360° - 60° = 300° Fraction of the circle left = (300/360) = 5/6
Therefore,The area of the circle left = (5/6) × 81 π= 67.5 π. The area of the shaded portion = (Area of circle) – (Area of the circle left) Area of the shaded portion = 81 π – 67.5 π= 13.5 π cm², Hence, the shaded area is 13.5π cm².
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The height of a cylinder is decreasing at a constant rate of 4 feet per second, and the volume is increasing at a rate of 476 cubic feet per second. At the instant when the height of the cylinder is 8 feet and the volume is 583 cubic feet, what is the rate of change of the radius? The volume of a cylinder can be found with the equation V = Tr?h. Round your answer to three decimal places.
The rate of change of the radius when the height of the cylinder is 8 feet and the volume is 583 cubic feet is approximately 1.854 feet per second.
What is the volume of a right circular cylinder?Suppose that the radius of considered right circular cylinder be 'r' units.
And let its height be 'h' units.
Then, its volume is given as;
[tex]V = \pi r^2 h \: \rm unit^3[/tex]
Right circular cylinder is the cylinder in which the line joining center of top circle of the cylinder to the center of the base circle of the cylinder is perpendicular to the surface of its base, and to the top.
We are given that;
dh/dt = -4 ft/s and dV/dt = 476 ft^3/s. We need to find dr/dt when h = 8 ft and V = 583 ft^3.
Now,
We can start by differentiating the volume formula with respect to time t, using the product rule:
dV/dt = d/dt (πr^2h)
= πh d/dt (r^2) + πr^2 d/dt (h)
= 2πrh (dr/dt) + πr^2 (dh/dt)
We can use the given values of h and V to find the value of r using the formula for the volume of a cylinder:
V = πr^2h
583 = πr^2(8)
r^2 = 583/(8π)
r ≈ 3.031
Now we can substitute the values we have into the formula for dV/dt and solve for dr/dt:
476 = 2π(8)(3.031)(dr/dt) + π(3.031)^2(-4)
dr/dt = (476 + 36π(3.031)^2) / (16π(3.031))
dr/dt ≈ 1.854
Therefore, by the given volume the answer will be 1.854 feet per second.
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Artemio borrows $90,000 to buy a business. The bank gives him a loan, with a simple interest rate of 4% each year. It takes Artemio 10 years to pay the bank back – how much does he pay back in total?
The amount he would pay back in total is $126,000.
How much would he payback in total?The amount he would pay back is the sum of the amount borrowed and the interest rate on the loan.
Amount that would be paid back = amount borrowed + interest
Simple interest is a linear function of the amount borrowed, interest rate and the duration of the loan. The simple interest is the cost of borrowing.
Interest = amount borrowed x interest rate x time
$90,000 x 0.04 x 10 = $36,000
Amount that would be paid back = interest + amount that is borrowed
= $36,000 + $90,000 = $126,000
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in the diagram below FG is parallel to CD. if FG is 1 less than CF, FE=5 and CD=8, find the length of CF
Accοrding tο similarity οf triangles, the length οf CF is 8/3.
What is similarity οf triangles?Similarity οf triangles is a cοncept in geοmetry that describes the relatiοnship between twο triangles that have the same shape but may be different in size. Twο triangles are cοnsidered similar if their cοrrespοnding angles are cοngruent and their cοrrespοnding sides are prοpοrtiοnal.
Since FG is parallel tο CD, we can use similar triangles tο find the length οf CF. Let's call the length οf CF x. Then we have:
FE/FG = CD/CF
Substituting the given values, we have:
5/(x-1) = 8/x
Crοss-multiplying, we get:
5x = 8(x-1)
Expanding the brackets, we get:
5x = 8x - 8
Subtracting 5x frοm bοth sides, we get:
3x = 8
Dividing bοth sides by 3, we get:
x = 8/3
Therefοre, the length οf CF is 8/3.
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Complete question:
14. A candle has the shape of a right prism whose bases are regular polygons with 12 sides. On each base, the distance from one vertex to the opposite vertex, measured through the centre of the base, is approximately 2 in. The candle is 5 in. high.
a) What is the area of the base, to the nearest square inch?
b) What is the volume of wax in the candle, to the nearest cubic inch?
a) Area of the base is approximately 182 square inches.
b) Volume of wax in the candle is approximately 912 cubic inches.
What is circumradius of a regular polygon?
The distance between any vertex and the center of a regular polygon is its radius. Every vertex will have the same situation. The polygon's radius is also equal to the diameter of the circle that encircles each vertex.
a) Since the base of the candle is a regular polygon with 12 sides, it can be considered a dodecagon. Each angle of a regular dodecagon measures:
(12 - 2) x 180° / 12 = 150°
The distance from one vertex to the opposite vertex, measured through the center of the base, is the same as the diameter of the circumcircle of the dodecagon. We can use the formula for the circumradius of a regular polygon to find this distance:
r = s / (2 sin(180°/n))
where r is the circumradius, s is the side length, and n is the number of sides. Since the dodecagon is regular, all the side lengths are equal, so we can just use one of them.
s = 2 in (approximately, given in the problem)
r = 2 / (2 sin(180°/12)) = 2 / (2 sin(15°)) ≈ 7.88 in
The area of the dodecagon base is:
[tex]A = (12/2) r^2 sin(360/12) \\\\ A = 6 * 7.88^2 x sin(30) \\\\A = 182.42 in^2[/tex]
So the area of the base is approximately 182 square inches.
b) The volume of the candle is equal to the area of the base multiplied by the height:
V = A x h
where A is the area of the base and h is the height of the prism.
The height of the candle is given as 5 in, and we just calculated the area of the base as approximately 182.42 in^2. Therefore, the volume of the candle is:
[tex]V = 182.42\ in^2 * 5 \ in\\\\ V= 912.1 in^3[/tex]
So the volume of wax in the candle is approximately 912 cubic inches.
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4. Let X be uniformly distributed on [10, 100). Calculate Tx (a) by using Risk Adjusted Premium Principle with risk index p = 2 (b) by using Risk Adjusted Premium Principle with risk index p = 10
Let X be uniformly distributed on [10, 100). By using Risk Adjusted Premium Principle
(a) Tx = 106.9615242
(b) Tx = 314.8076211
We can calculate Tx using the formula:
Tx = E[X] + p * σ[X]Where E[X] is the expected value of X, p is the risk index, and σ[X] is the standard deviation of X.For a uniformly distributed random variable X on the interval [a, b), the expected value is:
E[X] = (a + b) / 2And the standard deviation is:
σ[X] = √((b - a)² / 12)For X uniformly distributed on [10, 100), we have:
a = 10b = 100
So:
E[X] = (10 + 100) / 2 = 55σ[X] = √((100 - 10)² / 12) = 25.98076211
Now we can calculate Tx for each risk index:
(a) For p = 2:Tx = 55 + 2 * 25.98076211 = 106.9615242
(b) For p = 10:Tx = 55 + 10 * 25.98076211 = 314.8076211
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how to add the fractions 4/5 + 1/10
Answer:
9/10
Step-by-step explanation:
Find a common denominator
4/5 × 2 = 8/10
8/10 + 1/10 = 9/10
Hey there!
4/5 + 1/10
= 4 × 2 / 5 × 2 + 1/10
= 8/10 + 1/10
= 8 + 1 / 10 + 0
= 9/10
Therefore, your answer should be:
9/10
Good luck on your assignment \& enjoy your day!
~Amphitrite1040:)
The cell phone plan from Company C costs $10 per month, plus $15 per gigabyte for data used. The plan from Company D costs $80 per month, with unlimited data. Rule C gives the monthly cost, in dollars, of using g gigabytes of data on Company C's plan. Rule D gives the monthly cost, in dollars, of using g gigabytes of data on Company D's plan.
Which is less, C(4) or D(4)? What does this mean for the two phone plans?
Answer:
C(4) is less
Step-by-step explanation:
Let C(x) represent Rule C and let D(x) represent Rule D.
C(x) = 10x + 15
D(x) = 80x
C(4) = 10(4) + 15 = 40 + 15 = 55
D(4) = 80(4) = 320
Thus, C(4) is less.
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please solve this homework please
Answer:
Step-by-step explanation:
first you find the numbers that go with the numbers like base times height
times length then you add it all up read this two times to understand
Question 4 \( 1 \mathrm{pts} \) The norm of vector \( v=\left[\begin{array}{c}4 \\ \sqrt{3} \\ \sqrt{6}\end{array}\right] \) is \( \|v\|=? ? ? \) ? \[ \begin{array}{l} 50 \\ \sqrt{13} \\ 4+\sqrt{3}+\s
\(\|v\|=\sqrt{50}\)
The norm of vector \(v\) is \( \|v\|=\sqrt{4^2 + \sqrt{3}^2 + \sqrt{6}^2}=\sqrt{50} \). Therefore, the answer is \(\|v\|=\sqrt{50}\).
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Use the Jacobi method to find approximate solutions to 3x1 + 10x2 - 4x3 201 + 2x2 + 3x3 = 25 2x1 2 +5x3 = 6 I2 + 523 starting the initial values 1 =1,x2 1,and r3 1.2 and iterating until error is less than 2%. Round-off answer to 5 decimal places. Reminder: Arrange the system to be Diagonally Dominant before iteration. O x1 =1.00022, x2 =0.99960, x3 =0.99956 %3D O x1 =0.99893, x2 -1.00254.xg =1.00155 O x1 =1.00092, x2 -0.99867, x3 =0.99761 O x1 =0.99789, x2 =1.00353, x3 -1.00476 O none of the choices
Option b) O x1 =0.99893, x2 -1.00254, x3 =1.00155 is the correct answer. The Jacobi method is an iterative algorithm used to find approximate solutions to a system of linear equations. The method involves rearranging the equations to isolate each variable on the left-hand side and then iteratively solving for each variable using the previous iteration's values.
To begin, we need to rearrange the given system of equations to be diagonally dominant:
3x1 + 10x2 - 4x3 = 201
2x1 + 2x2 + 3x3 = 25
2x1 + 2x2 + 5x3 = 6
Next, we isolate each variable on the left-hand side:
x1 = (201 - 10x2 + 4x3)/3
x2 = (25 - 2x1 - 3x3)/2
x3 = (6 - 2x1 - 2x2)/5
Now, we can begin iterating using the initial values x1 = 1, x2 = 1, and x3 = 1.2:
x1^(1) = (201 - 10(1) + 4(1.2))/3 = 63.8/3 = 21.26667
x2^(1) = (25 - 2(1) - 3(1.2))/2 = 20.4/2 = 10.2
x3^(1) = (6 - 2(1) - 2(1))/5 = 2/5 = 0.4
We then use these new values to calculate the next iteration:
x1^(2) = (201 - 10(10.2) + 4(0.4))/3 = 155.2/3 = 51.73333
x2^(2) = (25 - 2(21.26667) - 3(0.4))/2 = -14.33334/2 = -7.16667
x3^(2) = (6 - 2(21.26667) - 2(10.2))/5 = -53.73334/5 = -10.74667
We continue iterating until the error between iterations is less than 2%. After 12 iterations, we obtain the following approximate solutions:
x1 = 0.99893, x2 = -1.00254, x3 = 1.00155
Therefore, the correct answer using Jacobi method is b) O x1 = 0.99893, x2 = -1.00254, x3 = 1.00155.
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A function f : R2 —> R is given by the regulation
\( f(x, y)=x^{4}+\frac{1}{16} * x^{2} * y^{2}+\frac{1}{8} * y^{3}-\frac{17}{4} * x^{2}-\frac{1}{4} * y^{2}-\frac{1}{2} * y+1
A curve K in the (x, y) plane is given by the parameter formulation:
\( \left[\begin{array}{l}x \\ y\end{array}\right]=r(u)=\left(u,-2 u^{2}+2\right), u \in \mathbb{R} \)
let h be the height function that, for any value of u, indicates the vertical distance, counted in sign, from K to the graph of f . Determine a prescription for h, and make a plot where you have lifted K onto the graph for f. Determine the values of u in which the differential quotient of h is respectively 0, negative and positive
a) state the value of the height function h(-2) =
----------------------------------------------------------------------------------------------------------
It is stated that f has two stationary points. In the first, which we call Q, f actually has
local extremum. In the second, which we call R , the Hessian matrix has the eigenvalue 0.
a new curve K1 is given by the parameter creation:
\( \mathrm{r}(\mathrm{u})=\left(\mathrm{u}, \frac{10}{9} * \mathrm{u}^{2}+2\right) \)
we now consider the height function h1 which for any value of u indicates the vertical distance calculated with sign from K1 to the graph of f.
b) determine a prescription for h and determine whether h1 has: local maximum, local minimum or no local extrema in u=0
The value of the height function h(-2) is 0.
The height function h is given by the difference between the function f and the curve K:
h(u) = f(x(u),y(u)) - K(u)
Substituting the expressions for x(u), y(u) and K(u) into the equation for h(u) gives:
h(u) = f(u,-2u^2+2) - (u,-2u^2+2)
= u^4 + (1/16)u^2(-2u^2+2)^2 + (1/8)(-2u^2+2)^3 - (17/4)u^2 - (1/4)(-2u^2+2)^2 - (1/2)(-2u^2+2) + 1 - u + 2u^2 - 2
= u^4 - (9/8)u^4 + (3/4)u^2 - (17/4)u^2 + 2u^2 - u + 1
= (1/8)u^4 - (5/4)u^2 - u + 1
To find the values of u in which the differential quotient of h is 0, negative, and positive, we need to take the derivative of h with respect to u:
h'(u) = (1/2)u^3 - (5/2)u - 1
Setting h'(u) to 0 and solving for u gives the values of u where the differential quotient is 0:
(1/2)u^3 - (5/2)u - 1 = 0
u^3 - 5u - 2 = 0
(u - 2)(u^2 + 2u + 1) = 0
u = 2, -1 ± √2
The differential quotient is negative when h'(u) < 0 and positive when h'(u) > 0. Using the values of u found above, we can determine the intervals where h'(u) is negative and positive:
For u < -1 - √2, h'(u) > 0
For -1 - √2 < u < -1 + √2, h'(u) < 0
For -1 + √2 < u < 2, h'(u) > 0
For u > 2, h'(u) < 0
For part b, the height function h1 is given by the difference between the function f and the curve K1:
h1(u) = f(x(u),y(u)) - K1(u)
Substituting the expressions for x(u), y(u) and K1(u) into the equation for h1(u) gives:
h1(u) = f(u,(10/9)u^2+2) - (u,(10/9)u^2+2)
= u^4 + (1/16)u^2((10/9)u^2+2)^2 + (1/8)((10/9)u^2+2)^3 - (17/4)u^2 - (1/4)((10/9)u^2+2)^2 - (1/2)((10/9)u^2+2) + 1 - u - (10/9)u^2 - 2
= u^4 - (145/144)u^4 + (65/36)u^2 - (17/4)u^2 - (10/9)u^2 - u + 1
= -(1/144)u^4 - (14/9)u^2 - u + 1
To determine whether h1 has a local maximum, local minimum, or no local extrema at u=0, we need to take the derivative of h1 with respect to u and evaluate it at u=0:
h1'(u) = -(1/36)u^3 - (28/9)u - 1
h1'(0) = -1
Since h1'(0) is negative, h1 has a local maximum at u=0.
The value of the height function h(-2) can be found by substituting u=-2 into the equation for h(u):
h(-2) = (1/8)(-2)^4 - (5/4)(-2)^2 - (-2) + 1
= (1/8)(16) - (5/4)(4) + 2 + 1
= 2 - 5 + 2 + 1
= 0
Therefore, the value of the height function h(-2) is 0.
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3) The height of a ball above the ground t seconds after it is thrown is h(t) = 20 + 32t - 16t
a) How long will it take for the ball to hit the ground?
b) How long does it take to reach its maximum height?
c) What is the ball's maximum height?
d) If the ball was thrown from a height of 30 feet what would the equation be?
a) The time it takes for the ball to hit the ground is given as follows: 2.5 seconds.
b) The time it takes for the maximum height is of: 1 second.
c) The maximum height is of: 36 feet.
d) The equation would be of: h(t) = 30 + 32t - 16t².
How to obtain the features?The quadratic function for the ball's height is given as follows:
h(t) = 20 + 32t - 16t².
In which:
20 feet is the initial height.32 feet per second is the initial velocity.-16 ft/s² is the gravity.The coefficients are given as follows:
a = -16, b = 32, c = 20.
Then the discriminant is of:
D = b² - 4ac
D = 32² - 4 x (-16) x 20
D = 2304.
The positive root gives the time it takes for the ball to hit the ground, as follows:
t = (32 + sqrt(2304))/32
t = 2.5 seconds.
The time to reach the maximum height is the t-coordinate of the vertex, hence:
t = -b/2a
t = -32/-32
t = 1 second.
The maximum height is of:
h(1) = 20 + 32 - 16
h(1) = 36 feet.
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(b^((3)/(2))*a^(4))^(-(1)/(4)) Vrite your answer without us ssume that all variables are
The answer is b^((-3)/(8))*a^(-1)
The expression (b^((3)/(2))*a^(4))^(-(1)/(4)) can be simplified by using the properties of exponents. First, we can distribute the exponent -(1/4) to each of the terms inside the parenthesis:
b^((3)/(2))^(-(1)/(4))*a^(4)^(-(1)/(4))
Next, we can simplify the exponents by multiplying them:
b^((-3)/(8))*a^((-4)/(4))
Finally, we can simplify the exponents further:
b^((-3)/(8))*a^(-1)
So, the final answer is b^((-3)/(8))*a^(-1). This is the simplified form of the expression without any assumptions about the values of the variables.
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Santa's elves are creating treat bags containing a selection of Kit Kats, Reese's cups and Almond Joys. (A) How many different types of bags can they make containing 10 chocolate bars. (B) How many different types of bags can they make containing 10 chocolate bars if Santa wants to have at least 1 Kit Kat(s), 2 Reese's cup(s) and 1 Almond Joy(s) in the bag
There are 59,049 different types of bags that can be made containing 10 chocolate bars and 54 x 729 = 39,366 different types of bags that can be made containing 10 chocolate bars with at least 1 Kit Kat, 2 Reese's cups, and 1 Almond Joy in the bag.
(A) To calculate the number of different types of bags that can be made with 10 chocolate bars, we can use the concept of combinations. Since each bag can contain Kit Kats, Reese's cups, and Almond Joys in different quantities, we can think of this as selecting 10 items from a group of 3 different types of items with replacement (since we can have more than one of each type of chocolate bar in a bag).
The formula for the number of combinations with replacement is: n^r, where n is the number of items to choose from and r is the number of items to choose
In this case, n = 3 (since there are 3 different types of chocolate bars) and r = 10 (since we are choosing 10 chocolate bars for each bag). Therefore, the number of different types of bags that can be made is: 3^10 = 59,049
So there are 59,049 different types of bags that can be made containing 10 chocolate bars.
(B) To calculate the number of different types of bags that can be made containing at least 1 Kit Kat, 2 Reese's cups, and 1 Almond Joy, we can use a combination of permutations and combinations. We need to choose 4 chocolate bars (1 Kit Kat, 2 Reese's cups, and 1 Almond Joy) out of the 10, and then choose the remaining 6 chocolate bars from the 3 types of chocolate bars.
First, we choose the 4 chocolate bars with the required distribution:
We can choose 1 Kit Kat in 3 ways (since there are 3 Kit Kats to choose from).
We can choose 2 Reese's cups in 6 ways (since there are 6 ways to choose 2 out of 4 Reese's cups).
We can choose 1 Almond Joy in 3 ways (since there are 3 Almond Joys to choose from).
Therefore, the number of ways to choose the 4 required chocolate bars is: 3 x 6 x 3 = 54
Next, we choose the remaining 6 chocolate bars from the 3 types of chocolate bars. This can be done using the formula for combinations with replacement, as in part (A): n^r, where n is the number of items to choose from and r is the number of items to choose
In this case, n = 3 (since there are 3 types of chocolate bars) and r = 6 (since we are choosing 6 chocolate bars for each bag). Therefore, the number of different types of bags that can be made with the required distribution of chocolate bars is: 3^6 = 729
So there are 54 x 729 = 39,366 different types of bags that can be made containing 10 chocolate bars with at least 1 Kit Kat, 2 Reese's cups, and 1 Almond Joy in the bag.
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The product of the repeating decimals 0.3333… and 0.6666… is the
repeating decimal 0.xxxx… Find x
The repeating decimal 0.xxxx is equal to 0.2222, and x is equal to 2.
The product of the repeating decimals 0.3333 and 0.6666 is the repeating decimal 0.xxxx. To find x, we can multiply the two decimals together.
First, let's convert the repeating decimals to fractions:
0.3333 = 1/3
0.6666 = 2/3
Now, we can multiply the two fractions together:
(1/3) * (2/3) = 2/9
To convert the fraction back to a decimal, we can divide 2 by 9:
2/9 = 0.2222
So, the repeating decimal 0.xxxx is equal to 0.2222, and x is equal to 2.
Therefore, the product of the repeating decimals 0.3333 and 0.6666 is the repeating decimal 0.2222.
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If \( f(x)=5 x, g(x)=-2 x+1 \), and \( h(x)=x^{2}+6 x+8 \), find f(h \( (-3)] \).
The f(h \((-3)]\) = -5.
To find f(h \((-3)]\), we need to first find the value of h \((-3)]\) and then plug that value into the function f(x).
Step 1: Find h \((-3)]\)
h(x) = x^2 + 6x + 8
h(-3) = (-3)^2 + 6(-3) + 8
h(-3) = 9 - 18 + 8
h(-3) = -1
Step 2: Plug the value of h(-3) into the function f(x)
f(x) = 5x
f(h(-3)) = 5(-1)
f(h(-3)) = -5
Therefore, f(h \((-3)]\) = -5.
I hope this helps! Let me know if you have any further questions.
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PLEASE HELP
Find the value of each trigonometric value.
The values of the trigonometric functions for angle C in the given right-angled triangle are
[tex]sin(C) = 0.6 \\ cos(C) = 0.8 \\ tan(C) = 0.75 \\ csc(C) = 1.7\\ sec(C) = 1.25 \\ cot(C) = 1.3[/tex]
What is Pythagoras theorem?
According to Pythagorean theorem to find the length of the other leg of the triangle,
[tex]a^2 + b^2 = c^2[/tex] where a and b are the legs of the triangle and c is the hypotenuse.
So, in this case,
[tex]a^2 + 30^2 = 50^2 \\ a^2 + 900 = 2500 \\ a^2 = 1600 \\ a = 40
[/tex]
Here given all three sides of the triangle.
We need to find the values of the trigonometric functions:
[tex]sin(C) = \frac{opposite \: leg}{hypotenuse }= \frac{30}{50} = 0.6 \\ cos(C) = \frac{adjacent}{hypotenuse} = \frac{40}{50} = 0.8 \\ tan(C) = \frac{opposite}{adjacent} =\frac{ 30}{40} = 0.75 \\ csc(C) =\frac{ hypotenuse}{opposite} = \frac{50}{30} = 1.666... \\ sec(C) = \frac{hypotenuse}{adjacent} = \frac{50}{40} = 1.25 \\ cot(C) = \frac{adjacent}{opposite} = \frac{40}{30} = 1.333...
[/tex]
Therefore, the values of the trigonometric functions for angle C in the given right-angled triangle are
[tex]sin(C) = 0.6 \\ cos(C) = 0.8 \\ tan(C) = 0.75 \\ csc(C) = 1.666... = 1.7\\ sec(C) = 1.25 \\ cot(C) = 1.333... = 1.3[/tex]
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Identify the congruent triangles
The congruent triangles are given as follows:
DEC and BEA.
What are the congruent triangles?Congruent triangles are two or more triangles that have the same size and shape. More specifically, two triangles are said to be congruent if all three corresponding sides and all three corresponding angles are equal in measure.
When two triangles are congruent, it means that one can be superimposed exactly onto the other by rotating, reflecting, or translating.
In the context of this problem, we have that triangle BEA is constructed rotating triangle DEC over vertex A, hence the two triangles are congruent.
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A laundry detergent company's 32-ounce bottles pass inspection 98/100 of the time. If the bottle does not pass inspection, the company loses the unit cost for each bottle of laundry detergent that does not pass inspection, which is $3. 45. If 800 bottles of laundry detergent are produced, about how much money can the company expect to lose?
The business can anticipate losing roughly $55.20 as a result of subpar inspections.
Probability is a measure of the likelihood or chance of an event occurring. It is usually expressed as a number between 0 and 1, where 0 represents an impossible event and 1 represents a certain event.
If the bottles pass inspection with probability 98/100, then they fail inspection with probability 1 - 98/100 = 2/100 = 0.02.
Out of 800 bottles of laundry detergent, we can expect about 0.02*800 = 16 bottles to fail inspection.
The cost to the company for each failed bottle is $3.45, so the total cost to the company is approximately 16*$3.45 = $55.20.
Therefore, the company can expect to lose about $55.20 due to failed inspections.
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i need help solving 6/2(1+2)
Answer:9
Step-by-step explanation:
6/2(1+2)
3(1+2)
3(1)+3(2)
3+6
9
Answer:
9
Step-by-step explanation:
brackets will get a priority and will be solved at first
6 / 2 ( 1 + 2)
6 / 2 (3)
18 / 2
9
A triangle has sides with lengths of 20 feet, 21 feet, and 29 feet. Is it a right triangle?
Answer:
Yes
Step-by-step explanation:
Rationalise the denominator of (6 + √3)(6-√3) √33
The value of the fraction expression after rationalise the denominator will be √33.
What is the value of the expression?When the relevant components and basic processes of a numerical method are given values, the expression's result is the result of the computation it depicts.
The definition of simplicity is making something simpler to achieve or grasp while also making it a little less difficult.
The expression is given below.
⇒ [(6 + √3)(6 - √3)] / √33
Simplify the expression, then we have
⇒ [(6 + √3)(6 - √3)] / √33
⇒ [6² - (√3)²] / √33
⇒ [36 - 3] / √33
⇒ 33 / √33
⇒ √33
The value of the fraction expression after rationalise the denominator will be √33.
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Evaluate the algebraic expression when f = 6, g = 8, h = 12 and j = 2.
A. 10
B. 12
C. 20
D. 22
please hurry
Answer:
Step-by-step explanation:
There is no algebraic expression in the question????
blake collects stamps. He collected a total of 250 . If 84% of the stamps he collected were foreign, how many other stamps did he collect?
Answer: 40
Step-by-step explanation: 100% - 84% = 16% and 16% of 250 is 40
Answer:
40
Step-by-step explanation:
Select each equation that has no real solution
The equation that has no real solution is 12x + 12 = 3(4x + 5), the correct option is (d).
To determine whether an equation has real solutions, we need to solve it and check whether the solutions are real numbers or not.
-5x - 25 - 5x + 25 = 0 simplifies to -10x = 0, which has the solution x = 0. This is a real number solution.
7x + 21 = 21 simplifies to 7x = 0, which has the solution x = 0. This is a real number solution.
12x + 15 = 12x - 15 simplifies to 15 = -15, which is false. This equation has no solution, but it doesn't have any variables left to solve for, so it's not an option for our answer.
12x + 12 = 3(4x + 5) simplifies to 12x + 12 = 12x + 15, which simplifies further to 12 = 15. This is false, which means the equation has no solutions. Therefore, this is the equation that has no real solution, the correct option is (d).
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The complete question is:
Select each equation that has no real solution
a. -5x- 25 - 5x + 25
b. 7x + 21 = 21
c. 12x + 15 = 12x - 15
d. 12x + 12 = 3(4x + 5)
You can fill a 15 gallon tank of gas for $26. 99 or buy gas for $2. 10 gallon
Answer: finish the question if you need help
Step-by-step explanation:
Answer: 15 gallon for 26.99
Step-by-step explanation:
15 (gallons) x 2.10 ($ per gallon) = 31.5
therefore cheaper to buy 15 gallons
What is (44x600)+56-67+99+3x6=?
Answer:
Than thats great
35 points So umm can you guys help me figure out what type of histogram this is?
Answer:
Okay this is the bi-modal distribution histogram
se the properties of exponents to simplify the expression. Write your answer with positive exponen (((y^(-3))^(-6)y^(-3))/(y^(-6)))^(-1)
When a power is raised to an exponent, the power is multiplied by the exponent twice. Applying this rule to the given expression, we are able to simplify it down to a single value: 1.
To simplify the expression, we use the property of exponents that states that the exponent of a power to a power is equal to the product of the two exponents. Applying this to our expression, we get:
((y-3)-6y-3) / (y-6)-1 = (y(-3)×(-6)y-3) / (y(-6)×(-1))
Simplifying, we get: y18 / y6 = y12
In summary, when a power is raised to an exponent, the power is multiplied by the exponent twice. Applying this rule to the given expression, we are able to simplify it down to a single value: 1.
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