Answer:
D. The longer leg is √3 times as long as the shorter leg.E. The hypotenuse is twice as long as the shorter leg.Step-by-step explanation:
You want to know which of the listed statements is true of a 30°-60°-90° triangle.
Side lengthsThe ratios of side lengths in a 30°-60°-90° triangle are 1 : √3 : 2.
This makes the following statements true:
D. The longer leg is √3 times as long as the shorter leg.E. The hypotenuse is twice as long as the shorter leg.What cos is and what Sin is of this triangle
Answer:
cos65°= x/11
cos65° × 11=x
4.65=x
Answer:
25°x1165°x11Step-by-step explanation:
You want to know suitable equations that can be solved for x given that AC=x, AB=11, and ∆ABC is a right triangle with angle A=25° and C=90°.
Trig relationsThe mnemonic SOH CAH TOA reminds you that ...
Sin = Opposite/Hypotenuse
Cos = Adjacent/Hypotenuse
AnglesThe side marked 11 is the hypotenuse, and the side marked x is adjacent to the 25° angle and opposite angle B. We can find the measure of angle B as the complement of angle A:
∠B = 90° -25° = 65°
ApplicationThe cosine relation is ...
cos(A) = AC/AB
cos(25°) = x/11
The sine relation is ...
sin(B) = AC/AB
sin(65°) = x/11
These are equations you can solve to find x.
8. Choose all lengths that are equal to
6 feet 12 inches.
3 yd 1 ft
7 ft
7 ft 2 in.
2 yd 1 ft
1 yd 4 ft
By answering the presented questiοn, we may cοnclude that, the equatiοn lengths that are equal tο 6 feet 12 inches are: 7 ft and 2 yd 1 ft.
Thus, option b and d are correct.
Equatiοn: What is it?In mathematics, an equatiοn is a claim that twο expressiοns are equivalent. Twο sides that are separated by the algebraic symbοl (=) make up an equatiοn. As an illustratiοn, the claim "2x + 3 = 9" makes the claim that the cοmbinatiοn "2x + 3" equals the integer "9".
Finding the value οr values οf the variable(s) necessary fοr the equatiοn tο be true is the gοal οf equatiοn sοlving. Equatiοns can include οne οr mοre parts and be straightfοrward οr cοmplex, regular οr nοnlinear. Fοr example, the variable x is raised tο the secοnd pοwer in the equatiοn "x² + 2x - 3 = 0." In many different branches οf mathematics, including algebra, calculus, and geοmetry, lines are used.
6 feet 12 inches can be simplified tο 7 feet.
Sο, the lengths that are equal tο 6 feet 12 inches are: 7 ft
Also 7 ft is equal to 2yd 1ft
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3x-y=-27
12x+3y=4
substitution
Answer:
proofs attached to answer
Step-by-step explanation:
proofs attached to answer
A statistics professor plans classes so carefully that the lengths of her classes are uniformly distributed between 50.0 and 52.0 minutes. Find the probability that a given class period runs between 50.5 and 51.0 minutes.
0.25
Explanation:
The easiest way to answer this question is to recognize that a uniform probability distribution is essentially a rectangle with an area equal to 1.
Now find the area of a portion of this rectangle.
[tex]\dfrac{51-5.05}{52-50} =\dfrac{0.5}{2} =0.25[/tex]
[tex]1\times0.25=0.25[/tex]Help!!!! It’s due at 9:30 tomorrow
The two-column proofs of the segments are shown below
Proving that AG ≅ EDThe proof is as follows
Statement Reason
ABCD and BCDE are parallelogram Given
AG = BC Opposite sides of
parallelogram
ED = BC Opposite sides of
parallelogram
AG ≅ ED Substitution property (proved)
Proving that KLMN is a parallelogram
The proof is as follows
Statement Reason
KL || NM and ∠L ≅ ∠N Given
KN ≅ LM CPCTC
KL ≅ NM CPCTC
We've proved that the opposites sides are equal and parallel
So, KLMN is a parallelogram
Proving that STUV is a parallelogram
The proof is as follows
Statement Reason
ST || VU and W is midpoint of SU Given
SW = UW Definition of midpoint
VW = TW Definition of midpoint
VU = ST CPCTC
VS = UT CPCTC
We've proved that the opposites sides are equal and parallel
So, STUV is a parallelogram
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PLEASE HELP!
3. Leo designs a stand for the new statue on display at the local library. The stand is in the shape of a right trapezoidal prism. The base of the prism has an area of 40 ft2, and the prism stands 9 feet high. As Leo paints the stand, he calculates the surface area of the stand to be 203.8 ft2.
(a) Leo is asked to purchase roping that will be used to close off the area around the statue. He purchases a length that is four times the perimeter of the stand in roping.
How much roping does he purchase?
(b) Leo plans to add gold leaf to the sides of the stand but not to the two bases.
What percent of the area of the stand will have gold leaf? Round your answer to the nearest whole number.
Answer:
The total area that Leo plans to cover with gold leaf is 4*30.95 = 123.8 ft2. Leo plans to cover 61% of the area of the stand with gold leaf.
What is a right trapezoidal prism?A right trapezoidal prism is a three-dimensional solid with two parallel trapezoidal bases and rectangular lateral sides. The trapezoidal prism's bases are not perpendicular to its lateral sides, but rather slanted. A right trapezoidal prism is referred to as "right" if its lateral edges are perpendicular to its bases.
(a) Area of trapezoid = (a + b)/2 * h = 40
9a + 9b = 80
a + b = 80/9
Now, let the height of the trapezoid be h1, and the length of the shorter side be h2. Then we have:
[tex]h1^2 = (9/2)^2 + h2^2[/tex]
h2 = [tex]\sqrt{(h1^2 - (9/2)^2)}[/tex]
Finally, we can find the perimeter P of the base by adding up the lengths of all four sides:
P = a + b + 2*[tex]\sqrt{((a-b)/2)^2 + h2^2)}[/tex]
Now we can find the length of roping needed:
Length of roping = 4P = 4(a + b + 2*[tex]\sqrt{((a-b)/2)^2 + h2^2}[/tex])
Substituting a + b = 80/9 and h2 from above, we get:
Length of roping = 4(80/9 + 2[tex]\sqrt{((a-b)/2)^2}[/tex] + [tex]\sqrt{(h1^2 - (9/2)^2))}[/tex]
Length of roping = (320/9) + 8[tex]\sqrt{((a-b)/2)^2}[/tex] + 4*[tex]\sqrt{(h1^2 - (9/2)^2)}[/tex]
Length of roping = 37.14 ft
Therefore, Leo purchases 37.14 feet of roping.
(b) The total surface area of the stand is 203.8 [tex]ft^2[/tex]. The area of both bases combined is 2*40 = 80 [tex]ft^2[/tex]. Therefore, the area of the sides of the stand is:
203.8 - 80 = 123.8 [tex]ft^2[/tex]
The stand has four side faces, so the area of one face is:
123.8 / 4 = 30.95 [tex]ft^2[/tex]
The total area that Leo plans to cover with gold leaf is the sum of the areas of all four side faces, which is:
4*30.95 = 123.8 [tex]ft^2[/tex]
Therefore, the percent of the area of the stand that will have gold leaf is:
(123.8 / 203.8) * 100 = 60.73%
Rounding to the nearest whole number, Leo plans to cover 61% of the area of the stand with gold leaf.
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The height of a machine part should be 13. 15 millimeters (mm). The manufacturing tolerance is within 0. 07 mm.
Complete the statements.
NEXT QUESTION >
An absolute value equation that could be used to determine the maximum and minimum value of h, the height of the machine part, is [DROP DOWN 1]. The
minimum value the machine part could be is [DROP DOWN 2]. The maximum value the machine part could be is [DROP DOWN 3]
a) An absolute value equation that could be used to determine the maximum and minimum value of h, the height of the machine part, is: | h - 13.15 | ≤ 0.07
b) The minimum value the machine part could be is: 13.08 mm
c) The maximum value the machine part could be is: 13.22 mm
An absolute value equation that could be used to determine the maximum and minimum value of h, the height of the machine part, is
| h - 13.15 | ≤ 0.07
The minimum value the machine part could be is
13.15 - 0.07 = 13.08 mm
The maximum value the machine part could be is
13.15 + 0.07 = 13.22 mm
The absolute value equation represents the range of acceptable values for the height of the machine part, which is within 0.07 mm of the target height of 13.15 mm.
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erin burns 3.2 calories per minute while playing flag football if she plays the entire 40 minute half how many calories does she burn
Also please explain the steps to solving
Answer: To solve this problem, first multiply 3.2 calories by 40 minutes to find the total number of calories she burns in one half:
3.2 calories/minute x 40 minutes = 128 calories
Erin burns 128 calories while playing flag football during one 40 minute half.
Please help me! This is due at 2:15 PM!!!! A game has 15 balls for each of the letters B, I, N, G, O. The table shows the results of drawing balls 1,250 times.
Letter Frequency
B 247
I 272
N 238
G 241
O 252
For which letter is the experimental probability closest to the theoretical probability? Explain please.
In the given any letter should get drawn 250 times and the letter is the experimental probability closest to the theoretical probability is N.
What is probability?
Probability is a way of calculating how likely something is to happen. It is difficult to provide a complete prediction for many events. Using it, we can only forecast the probability, or likelihood, of an event occurring. The probability might be between 0 and 1, where 0 denotes an impossibility and 1 denotes a certainty.
Theoretically, each letter should have the same probability of occurring since there are 15 of each. There are 5 letters that can be drawn, so there is a total of 75 balls, and each letter has a probability is ,
=> [tex]\frac{15}{75}= \frac{1}{5}[/tex] of being drawn.
This means one would expect a theoretical frequency of
=> [tex]\frac{1250}{5}= 250[/tex]
Hence any given letter should get drawn 250 times and the letter is the experimental probability closest to the theoretical probability is N.
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todd can afford to pay $390 per month for the next 7 years in order to purchase a new car. the interest rate is 6.8 percent compounded monthly. what is the most he can afford to pay for a new car today? multiple choice $41,807.66 $26,008.50 $24,708.07 $26,875.45 $25,765.88
Todd can afford to pay 390 per month for the next 7 years in order to purchase a new car. the interest rate is 6.8 percent compounded monthly. The value of the most Todd can afford to pay for a new car today is 24,708.07. The correct option is d. 24,708.07.
To calculate this, we can use the present value formula for a monthly compounded loan:
[tex]PV = PMT \times ((1 - (1 + r/n)^(-nt))/(r/n)),[/tex]
where PV is the present value or the amount that Todd can afford to pay for a new car today PMT is the monthly payment (390) n is the number of times the interest is compounded in a year (12 for monthly) r is the annual interest rate (6.8%) t is the total number of years (7)
Now, we can substitute the values and solve for PV:
[tex]PV = 390 \times ((1 - (1 + 0.068/12)^(-12\times7))/(0.068/12))
= 24,708.07[/tex]
Therefore, Todd can afford to pay 24,708.07 for a new car today.
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the chance a 1-km segment of railroad track contains a defect is 0.01. assume the 1-km segments of track are independent. a. compute the probability that exactly 125 km of track need to be tested before a defect is found. b. on average, how many 1-km segments of railroad track have to be tested before a defect is found? 3. a geotechnical engineering company conducted a study that indicates there is a 20% chance a borehole in a certain neighborhood will find a layer of clay no more than 20 m deep. a. compute the probability that the third layer of clay within 20 m is found on the seventh borehole drilled. b. compute the mean and variance of the number of boreholes that must be drilled if the geotechnical engineering company wants to have three that find clay within 20 m. 4. dam failures are rare and are estimated to occur on average once every five years. a. compute the probability there will be at least one dam failure in the next 10 years. b. draw a pmf that describes the random variable x
The probability mass function (pmf) of the random variable x is:
Question 1: The chance a 1-km segment of railroad track contains a defect is 0.01. Assume the 1-km segments of track are independent. a. Compute the probability that exactly 125 km of track need to be tested before a defect is found. b. On average, how many 1-km segments of railroad track have to be tested before a defect is found?
Answer 1: a. The probability that exactly 125 km of track need to be tested before a defect is found is 0.000148. b. On average, 125.01 1-km segments of railroad track need to be tested before a defect is found.
Question 2: A geotechnical engineering company conducted a study that indicates there is a 20% chance a borehole in a certain neighborhood will find a layer of clay no more than 20 m deep. a. Compute the probability that the third layer of clay within 20 m is found on the seventh borehole drilled. b. Compute the mean and variance of the number of boreholes that must be drilled if the geotechnical engineering company wants to have three that find clay within 20 m.
Answer 2: a. The probability that the third layer of clay within 20 m is found on the seventh borehole drilled is 0.02. b. The mean and variance of the number of boreholes that must be drilled if the geotechnical engineering company wants to have three that find clay within 20 m are 15 and 75 respectively.
Question 3: Dam failures are rare and are estimated to occur on average once every five years. a. Compute the probability there will be at least one dam failure in the next 10 years. b. Draw a pmf that describes the random variable x.
Answer 3: a. The probability that there will be at least one dam failure in the next 10 years is 0.8187. b. The probability mass function (pmf) of the random variable x is:
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how many multiplications can the ibm compute per second?
The IBM computer can compute about 6 trillion (6 x 1012) multiplications per second
The IBM computer can perform around 6 trillion multiplications per second, making it one of the fastest computers in the world. Multiplication is a fundamental arithmetic operation that is used to calculate the total value when two or more numbers are combined.
Multiplication is used to calculate the total number of things when there are several equal groups. For example, 2 x 5 = 10 means that there are 10 items in two groups, each containing five items. The symbol "x" represents the multiplication operation.
The IBM computer can compute about 6 trillion (6 x 1012) multiplications per second. IBM's Summit computer, which is currently the world's most powerful computer, has a peak speed of 200 petaflops, or 200 quadrillion (2 x 1017) calculations per second. This makes it one of the fastest computers in the world.
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i’m stuck between A and D…
Nelson applies two transformations to WXYZ so that the final vertices of the transformed figure
are located at (-2,0), (2, 0), (2,-6) and (0,-2).
Which transformations could be the two transformations Nelson applies to WXYZ?
first transformation:
second transformation:
First transformation: Reflection across the y-axis
Second transformation: Vertical translation down by 12 units.
What is coordinate?A coordinate is a value that specifies the position of a point in a particular system or framework of reference. Coordinates are typically expressed as numerical values that describe the location of a point in relation to some predefined origin, axis, or set of reference points. The most common type of coordinate system is the Cartesian coordinate system, which uses two or three axes to describe points in a plane or in three-dimensional space, respectively. In this system, coordinates are typically expressed as ordered pairs (for two-dimensional points) or ordered triplets (for three-dimensional points), such as (x, y) or (x, y, z), where x, y, and z represent the distances along each axis from the origin. Other types of coordinate systems include polar coordinates, cylindrical coordinates, and spherical coordinates, which are used in various branches of mathematics and science to describe points in different contexts.
To find the two transformations, we can use the fact that applying multiple transformations to a figure is the same as applying a single transformation that is the composition of the individual transformations.
Let's start with the final vertices of the transformed figure: (-2,0), (2, 0), (2,-6), and (0,-2).
We can see that the first two vertices have the same x-coordinate and are located on the x-axis. This suggests a reflection across the y-axis, which would swap the x-coordinates of the vertices.
So, the first transformation is a reflection across the y-axis.
After this transformation, the transformed figure has vertices (-WXYZ).
Next, we need to find the second transformation that maps WXYZ to (-WXYZ) with the given final vertices.
We can see that the vertex (2,-6) has a lower y-coordinate than the other three vertices. This suggests a vertical translation that moves this vertex down to its final position.
To determine the amount of vertical translation, we can subtract the y-coordinate of the vertex in its initial position (6) from the y-coordinate of the vertex in its final position (-6), which gives a total downward movement of 12 units.
So, the second transformation is a vertical translation down by 12 units.
Therefore, the two transformations that Nelson applies to WXYZ are a reflection across the y-axis followed by a vertical translation down by 12 units.
First transformation: Reflection across the y-axis
Second transformation: Vertical translation down by 12 units.
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find length of side of Rhombous whose diagonals are 6cm and 12cm
Answer:
Step-by-step explanation:
Step-by-step explanation:
We know that diagonals of a rhombus perpendicularly bisect each other.
Therefore
Let side of rhombus be 'a' , then
[tex] {a}^{2} =( \frac{d1}{2} )^{2} + ( \frac{d2}{2} ) + = \frac{12}{2}^{2} + ( \frac{6}{2}) ^{2} = 36 + 9 \\ \\ a ^{2} = 45 = a = \sqrt[3]{5} [/tex]
Which is the best estimate for the percent equivalent of 7/15 21% 22% 46% 47%
Answer: 47%
Step-by-step explanation:
When you divide 7 out of 15 you get .4666666. But rounding to the percent you get 47%.
what is the probability that a card drawn randomly from a standard deck of 52 cards is a red queen? express your answer as a fraction in lowest terms or a decimal rounded to the nearest millionth.
The probability that a card drawn randomly from a standard deck of 52 cards is a red queen = 0.038
We know that the formula for the probability of an event is given by,
P = number of favourable outcomes / total number of possible outcomes of an event
Let us assume that event A : drawing a red queen card
Here, sample space is a standard deck of 52 cards.
So, n(S) = 52
We know that there are 2 queens of red color (red heart and red diamond)
So, n(A) = 2
Using probability formula,
P(A) = n(A) / n(S)
P(A) = 2/52
P(A) = 0.038
Therefore, the required probability is 0.038
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Estimate the amount of the tip by rounding the bill to the nearest dollar before calculating.
20% tip on a bill of $48.47?
The amount of the tip is approximately
Rounding the amount to the nearest dollar, we get $10.00 as the estimated tip amount.
Describe amount?In general, "amount" refers to a quantity or a sum of something. The specific context in which the term is used determines the meaning of the word more precisely.
In financial contexts, "amount" typically refers to a sum of money or other financial value, such as the amount of a payment, a loan, or an investment. In accounting, the amount may refer to the total value of assets, liabilities, or equity.
In scientific contexts, "amount" may refer to the quantity or volume of a substance or material, such as the amount of water in a solution, the amount of gas in a container, or the amount of a drug in a patient's bloodstream.
In general usage, "amount" can refer to a quantity of something that can be measured, counted, or expressed numerically, such as the amount of time spent on a task, the amount of food consumed, or the amount of work completed
$10.00.
Rounding the bill amount to the nearest dollar, we get $48. The 20% tip on $48 is $9.60. Rounding this amount to the nearest dollar, we get $10.00 as the estimated tip amount.
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which of the following shows the best way to set up the product of (7x-1) and (5-4x+6x³)
last choice
x² needs to be represented
so you have to put a 0 there
6x³+ 0x² -4x +5
7x - 1
Sheila is biking at a constant speed. She travels 54 meters in 9 seconds.
How many meters per second does Sheila travel?
Answer:
6 meters per second
Step-by-step explanation:
6 meters/ seconds
Step 1: Find the unit rate
total distance/total time
54/9
6 meters / seconds
Answer: 6 meters/ seconds
Matt and Noah are each going to buy a new video game. Noah’s video game costs $27.99 and Matt’s costs $21.99. If sales tax is 6.5%, how much will they each have to pay altogether including tax?
A) Noah's total cost with tax $
To calculate the total cost including tax for Noah's video game, we need to add the cost of the game to the sales tax.
Sales tax on Noah's game = 6.5% of $27.99 = $1.82
Total cost for Noah's game = $27.99 + $1.82 = $29.81
Similarly, for Matt's game:
Sales tax on Matt's game = 6.5% of $21.99 = $1.43
Total cost for Matt's game = $21.99 + $1.43 = $23.42
Therefore, Noah will have to pay $29.81 and Matt will have to pay $23.42 including tax.
at
9. Which figure has 1 curved face? Select all
that apply. 5.GR.1.2
cone
sphere
cylinder
right square pyramid
right triangular prism
Answer:
A **cone** and a **cylinder** each have 1 curved face.
The probability of drawing a red card from a stan
of 52 cards is. 1/2The probability of throwing a 4 on a die
is 1/6. What is the probability of drawing a red card and
throwing a 4?
The total probability that red card from a deck of 52 cards and 4 on dice will come: P(R and 4) = 1/12.
Explain about the total probability?A fundamental statistician's rule governing conditional and margin probabilities is the total probability rule, commonly known as the rule of total probability.
According to the rule, if the chance of a happening is unknown, its probability may be determined using the probabilities of numerous different occurrences that have already occurred.
For the given question:
Probability of drawing a red card say P(R) = 1/2.
Probability of throwing 4 on dice P(4) = 1/6.
Thus, total probability that red card and 4 on dice will come:
P(R and 4) = P(R)* P(4)
P(R and 4) = 1/2 * 1/6
P(R and 4) = 1/12
Thus, total probability that red card from a deck of 52 cards and 4 on dice will come: P(R and 4) = 1/12.
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ihi asa asj dwaoa sd jaoizjx ccosnoad waspdzixj coijsa sdjad
Answer:
Step-by-step explanation: ???
Locate the zero of the quadratic function
the zeros of the quadratic equation are approximately:-x ≈ -0.53 and x ≈ 1.03
What is quadratic equation ?
In algebra, a quadratic equation is a polynomial equation of degree 2. It is an equation in which the highest power of the variable is 2. The general form of a quadratic equation is:
ax² + bx + c = 0
where a, b, and c are constants, and x is the variable.
Quadratic equations can have one, two, or zero real solutions, depending on the values of a, b, and c. The solutions of a quadratic equation can be found using the quadratic formula:
x = (-b ± sqrt(b² - 4ac)) / 2a
or by factoring the quadratic expression into two linear factors, and then solving for x. The quadratic formula works for all quadratic equations, while factoring can only be used for some quadratic equations that have integer roots.
To locate the zero of a quadratic equation given the values of x and y, we can set the equation equal to zero and solve for x. Since the given data consists of x and y values, we can use the method of interpolation to find the quadratic equation that passes through these points. To do this, we can use the formula for the quadratic function:
f(x) = ax² + bx + c
where a, b, and c are constants that we need to find. We can use the given data to form a system of three equations:
14 = a(-1)² + b(-1) + c
2 = a(0)² + b(0) + c
-3 = a(1)² + b(1) + c
Simplifying each equation, we get:
a - b + c = 14
c = 2
a + b + c = -3
Substituting c = 2 into the first and third equations, we get:
a - b + 2 = 14
a + b + 2 = -3
Solving for a and b, we get:
a = -8
b = -13
Therefore, the quadratic function that passes through the given points is:
f(x) = -8x² - 13x + 2
To find the zero of this quadratic equation, we can set it equal to zero and solve for x:
-8x² - 13x + 2 = 0
Using the quadratic formula, we get:
x = (-(-13) ± sqrt((-13)² - 4(-8)(2))) / (2(-8))
Simplifying, we get:
x = (13 ± sqrt(249)) / 16
Therefore, the zeros of the quadratic equation are approximately:
x ≈ -0.53 and x ≈ 1.03
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Determine how many terms of the following convergent series must be summed to be sure that the remainder is less than 10−6. ∑[infinity]k=1(−1)kk4 (Round an answer to the nearest integer as needed.)
We need to sum at least one term to ensure that the remainder is less than[tex]10^{-6[/tex].
We know that the alternating series test states that if a series is alternating and its terms are decreasing in absolute value, then the series converges. We can see that the series ∑[infinity]k=1(−1)kk4 is an alternating series because the signs of the terms alternate, and the terms decrease in absolute value because [tex]k_4[/tex] > (k+1)4 for all k.
Now, we can use the remainder formula for an alternating series, which tells us that the remainder Rn of an alternating series ∑[infinity]k=1(−1)ka_k after n terms is less than or equal to the absolute value of the next term [tex]a_{n+1[/tex]:
|Rn| ≤ |[tex]a_{n+1[/tex]|
So, we want to find the smallest value of n such that |a_n+1| < 10^(-6). We have:
[tex]a_k = (-1)^k \times k^4[/tex]
[tex]a_{n+1} = (-1)^{(n+1)} \times(n+1)^4[/tex]
We want to find n such that:
[tex]|(n+1)^4| < 10^{(-6)[/tex]
Taking the fourth root of both sides, we get:
[tex]|n+1| < (10^(-6))^(1/4)[/tex]
|n+1| < 0.1
n+1 < 0.1 or -(n+1) < 0.1
n < 0.1 - 1 or n > -0.1 - 1
n < -0.9 or n > -1.1
Since n must be a positive integer, the smallest possible value of n that satisfies this inequality is n = 1. Therefore, we need to sum at least one term to ensure that the remainder is less than [tex]10^{(-6)[/tex].
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Select the action you would use to solve x-3 =12. Then select the property that justifies that action.
Select all that apply.
A. Action: Add 3 to both sides
B. Action: Multiply both sides by 3
C. Action: Subtract 3 both sides
D. Property: Addition property of equality
E. Property: Multiplication property of equality
F. Property: Subtraction property of equality
The property that justifies that action - A. Action: Add 3 to both sides, D. Property: Addition property of equality.
What is the addition property of equality?
The addition property of equality is a fundamental property of algebra which states that if the same value is added to both sides of an equation, the equality is still maintained. In other words, if a = b, then a + c = b + c for any value of c. This property is useful when we want to isolate a variable on one side of an equation, by adding or subtracting the same value from both sides until the variable is isolated.
To solve x - 3 = 12, we can use the addition property of equality, which says that if we add the same value to both sides of an equation, the two sides remain equal.
Starting with x - 3 = 12, we can add 3 to both sides to isolate the variable x:
x - 3 + 3 = 12 + 3
x = 15
Therefore, the solution to the equation x - 3 = 12 is x = 15.
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for 5 stars and thank do this easy question
The volume of the treasure chest is approximately 1.3153 [tex]m^{3}[/tex]
What is vοlume?A three-dimensional object's volume is determined by the amount of space it occupies. It is a scalar quantity that can be expressed in cubic metres (m³), cubic feet (ft³), litres (L), gallon (gal), or any other volume unit.
Before dividing the value by the length of the treasure chest to determine its volume, the area of the treasure chest's bottom section must be determined.
A semicircle and a rectangle form the cross section. Let's calculate each of their areas separately, then add them all together:
Area of rectangle EY:
height = 0.6m
breadth = 0.8m
area = height x breadth
= 0.6 x 0.8
= 0.48[tex]m^{2}[/tex]
Area of a semicircle:
radius = half of the breadth
= 0.8 / 2
= 0.4m
area = 1/2 x [tex]\pi[/tex] x radius² (since it's a semicircle)
= 1/2 x [tex]\pi[/tex] x [tex]0.4^{2}[/tex]
= 0.2513 [tex]m^{2}[/tex]
The total area of the crοss-sectiοn
=0.48 + 0.2513
= 0.7313[tex]m^{2}[/tex]
Nοw, we can find the volume οf the treasure chest by multiplying the crοss-sectiοnal area by its length:
volume = area x length
= 0.7313[tex]m^{2}[/tex] x 1.8[tex]m[/tex]
= 1.3153 [tex]m^{3[/tex]
Therefore, the volume of the treasure chest is apprοximately 1.3153[tex]m^{3}[/tex]
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1a)Solve the given equation. (Enter your answers as a comma-separated list. Let k be any integer. Round terms to two decimal places where appropriate.)
tan(theta) = − 2/3
theta = rad
1b)Find all solutions of the given equation. (Enter your answers as a comma-separated list. Let k be any integer. Round terms to two decimal places where appropriate.)
2cos^2(theta) − 1 = 0
theta = rad
1c)Solve the given equation. (Enter your answers as a comma-separated list. Let k be any integer. Round terms to three decimal places where appropriate. If there is no solution, enter NO SOLUTION.)
sin^2(theta) = 6 sin(theta) + 7
theta =
1d)Solve the given equation. (Enter your answers as a comma-separated list. Let k be any integer. Round terms to three decimal places where appropriate. If there is no solution, enter NO SOLUTION.)
sin(theta) cos(theta) − 7 sin(theta) = 0
theta =
please answer in correct format.
The οnly sοlutiοn is sinθ = 0, θ = kπ, where k is any integer.
What are trigοnοmetric functiοns?Trigοnοmetric functiοns are mathematical functiοns that relate tο the angles and sides οf a right-angled triangle. These functiοns can be used tο calculate the relatiοnships between the sides and angles οf a triangle.
1a) Using inverse tangent functiοn,
θ = tan^{-1}(-2/3) ≈ -0.93 + kπ οr 2.21 + kπ, where k is any integer.
1b) Using cοsine functiοn,
[tex]2cos^{2}\theta - 1 = 0[/tex]
[tex]cos^{2}\theta= 1/2[/tex]
cοsθ = ±√(1/2) = ±1/√2
Sο, θ = π/4 + kπ/2 οr 3π/4 + kπ/2, where k is any integer.
1c) Rearranging the equatiοn, we get
[tex]sin^{2}\theta - 6sin\theta- 7 = 0[/tex]
Using the quadratic fοrmula,
sinθ = [6 ± √(36 + 28)]/2 = 3 ± √19
Since -1 ≤ sinθ ≤ 1, the οnly sοlutiοn is
sinθ = 3 - √19
[tex]θ = sin^{(-1)(3 - \sqrt{19})} \approx 0.47 + 2k\pi[/tex] οr π - 0.47 + 2kπ, where k is any integer.
1d) Factοring οut sinθ frοm the equatiοn, we get
sinθ(cοsθ - 7) = 0
Sο, either sinθ = 0 οr cοsθ = 7. Since -1 ≤ sinθ, cοsθ ≤ 1, the οnly sοlutiοn is
cοsθ = 7 has nο real sοlutiοn, sο the οnly sοlutiοn is
sinθ = 0
θ = kπ, where k is any integer.
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Is my answer correct? If it isn't can I get an explanation?
Answer:
you are correct but it may want it unrounded in which case it would be 21.6333076528