The probability of selecting a boy then a girl is 24/91
What is probability?Probability is defined as the chance of occurrence of an event
E. It is the ratio of the number of required outcome over the total of all possible outcomes in an even.
the given parameters that will help us to determine the probabilities are
There are 8 boysThere are 6 girls on soccer teamTotal number of Students in the soccer = 8+6 = 14The probability of the event is
P(E) = Pr(B) Then Pr(G)
Pr(E) = 8/14 *6/13
Simplify the fractions to have 48/182
= 24/91
Conclusively the selection is 24/91
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What is the third angle of the triangle if the angles are 15 and 86
Answer:
79 degrees
Step-by-step explanation:
there are 180 degrees in a triangle
if you deduct the sum of 15 and 86, which is 101, the third angle must measure 79 degrees
Find a formula for the
n
th term,
T
n
, of the following arithmetic sequence:
−
9
,
−
18
,
−
27
,
−
36
,
.
.
.
Answer:
x+9
Step-by-step explanation:
for example x is 18 , add 9 to it will become 18+9=27
Translate to an algebraic expression: one-fifth of a number, k
The mathematical expression for the given algebraic expression is,
⇒ k / 5
What is an expression?Mathematical expression is defined as the collection of the numbers variables and functions by using operations like addition, subtraction, multiplication, and division.
We have to given that;
The algebraic expression is,
⇒ One-fifth of a number, k
Now, We can write the mathematical expression for the given algebraic expression is,
⇒ One-fifth of a number, k
⇒ 1/5 of k
⇒ 1/5 × k
⇒ k / 5
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What are the solutions of x² - 5x+7=0?
OA. x =
OB. x =
5+3² or x = 5-3i
2
2
5+√2 or x = 5-√2
3
3
5+i√2
2
O C. x =
O D. x = 5+√3
2
or x =
5-i√2
2
or x = 5-i√3
2
On solving the provided question, we can say that quadratic equation x² - 5x+7=0 => x = 1 , -3
What is quadratic equation?A quadratic equation is x ax2+bx+c=0, which is a quadratic polynomial in a single variable. a 0. The Fundamental Theorem of Algebra ensures that it has at least one solution since this polynomial is of second order. Solutions may be simple or complicated. An equation that is quadratic is a quadratic equation. This indicates that it has at least one word that has to be squared. The formula "ax2 + bx + c = 0" is one of the often used solutions for quadratic equations. where are numerical coefficients or constants a, b, and c. where the variable "X" is unidentified.
x² - 5x+7=0
x(x-1) +3(x-1)
(x-1)(x+3) = 0
x = 1 , -3
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Adrian grabbed a bag of mandarin oranges off the shelf and spilled them all out on the counter. He divided them into 4 piles, but there was 3 left over. He rearranged them into 5 piles but this time there were 2 left over. Then he tried putting them into six piles, but there were 3 left over. When he tried 7 piles there were 3 left over again. Finally he put them into 3 piles and he didn’t have any left over. If the number of mandarins in the bag was less than 100, how many mandarins were in the bag?
The number of mandarins in the bag is 3 * 33 + 3 = 102 mandarins.
How did we determine the values?This is a Diophantine equation problem, which is a type of mathematical problem that looks for integers that satisfy a given equation.
We know that the number of mandarins in the bag is equal to 4n + 3, 5m + 2 and 6p + 3 and 7q + 3 for some integers n, m, p and q.
We also know that the number of mandarins in the bag is equal to 3r, where r is an integer.
From the information provided, we can set up the following equation:
4n + 3 = 5m + 2 = 6p + 3 = 7q + 3 = 3r
Now we can use the information that when he finally put them into 3 piles and he didn't have any left over, meaning that the number of mandarins in the bag is divisible by 3, we can see that the remaining number in each case is 3.
Thus the number of mandarins in the bag is 3 * (some integer) + 3.
We can then use the information that the number of mandarins in the bag was less than 100, meaning the possible value of r is less than 34.
Testing values of r starting from 1, we can see that r = 33 satisfies the equation and the number of mandarins in the bag is 3 * 33 + 3 = 102 mandarins
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solve 3x+2y=10 , 3x-y=4 for graphing.
Answer:
im sorry but i need the points
Solve this problem please
Answer:
[tex]8x-10[/tex]
Step-by-step explanation:
[tex]5x+3(x-4)+2[/tex]
Distribute:
[tex]=5x+(3)(x)+(3)(-4)+2\\=5x+3x+-12+2[/tex]
Combine Like Terms:
[tex]=5x+3x+-12+2\\=(5x+3x)+(-12+2)\\=8x+-10\\= 8x - 10[/tex]
In \triangle QRS,△QRS, \overline{SQ}\cong \overline{RS} SQ ≅ RS and \text{m}\angle R = 21^{\circ}.m∠R=21 ∘ . Find \text{m}\angle Q.m∠Q
The measure of ∠Q is equivalent to 21°.
What are congruent triangles?Congruent triangles have both the same shape and the same size.
Given is that in △QRS, SQ ≅ RS and m ∠R=21°.
Now, it is given that SQ ≅ RS, this means that -
SQ = RS
Angles opposite to equal sides are equal.
∠R = ∠Q = 21°
Therefore, the measure of ∠Q is equivalent to 21°.
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ANSWER PROPERY OR ELSE
Turn the fractions into decimals.
Answer:
a. 2/3 < 5/3
b. 2 1/2 > 9/4
c. 2/5 < 3/7
a. 5/3 > 1 1/3
b. 2 1/2 = 10/4
c. 3 5/6 < 21/4
Step-by-step explanation:
2/3 = 0.6667 (Rounded Answer)
5/3 = 1.6667 (Rounded Answer)
2 1/2 = 2.5
9/4 = 2.25
2/5 = 0.4
3/7 = 0.4286 (Rounded Answer)
5/3 = 1.6667 (Rounded Answer)
1 1/3 = 1.3334 (Rounded Answer)
2 1/2 = 2.5
10/4 = 2.5
3 5/6 = 3.8334 (Rounded Answer)
21/4 = 5.25
Question 7 (5 points) Which is the area between the x-axis and y=x from x=3 to x=6
The area between the x-axis and y = x from x = 3 to x = 6 will be 13.50 square feet.
What is integration?Integration is a way of finding the total by adding or summing the components. It's a reversal of differentiation, in which we break down functions into pieces. This approach is used to calculate the total on a large scale.
The function is given below.
y = x
Integrate the function under the limit from x = 3 to x = 6 will be given as,
[tex]\begin{aligned} I &= \int^6_3 y dx\\\\ I &= \int^6_3x dx\\\\I &= \left [\dfrac{x^2}{2} \right ]^6_3 \\\\I &= \dfrac{6^2 - 3^2}{2} \end{aligned}[/tex]
Simplify the equation further, then we have
I = (36 - 9) / 2
I = 27 / 2
I = 13.50 square units
The area between the x-axis and y = x from x = 3 to x = 6 will be 13.50 square feet.
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Rewrite this number in standard (decimal) notation without the use of exponents or scientific notation:
6.758 x 10^10
Therefore , the solution of the given problem of expression comes out to be sixty-seven billion five hundred eighty million.
How is expression selected?Each variable must be replaced with a number and arithmetic operations must be performed to check an algebraic equation. Given that 6 + 6 equals 12, the answer variable in the aforementioned case is comparable to 6. We can substitute the variables values with those we know in order to evaluate the expression.
Here,
6.758 1010 in scientific notation
The scientific notation is = 6.758e10.
Engineering notation: 67.58 109 billion; prefix: giga- (G)
6.758 x 1010 standard form
10 Order of Magnitude for scientific notation and conventional forms
=>67580000000 (real number)
=>67,580,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000
sixty-seven billion five hundred eighty million
word form.
Therefore , the solution of the given problem of expression comes out to be sixty-seven billion five hundred eighty million.
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What are the features of the quadratic function graphed in the figure?
Vertex (3, -4) with x-intercepts (1, 0), (5, 0), and (0, 5) and an axis of symmetry of 3. As a result, choice B is the right response.
The characteristics of the quadratic function graphed in the figure must be identified.
f(x) = ax2 + bx + c, where a, b, and c are numbers and an is not equal to zero, is a quadratic function. A parabola is the shape of a quadratic function's graph. Vertex (3, -4) has an axis of symmetry of three and an x-intercepts of one, five, and five. Choice B is the appropriate response as a result.It is necessary to identify the traits of the quadratic function graphed in the figure.A parabola can have different "widths" or "steepnesses," as well as different opening directions, but they all have the same basic "U" shape.This is how the whole process occurs in the given featuresTo know more about quadratic functions here
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Aunt Janelle uses the ratio 5 cups of milk to 2 cups of cocoa for her hot chocolate recipe. If she used 8 cups of cocoa, how many cups of milk does she need?
The number of cups of milk that she will need would be = 20 cups.
What is a ratio?A ratio is defined as the expression that shows the relationship between two numbers of the same unit.
The ratio used by Aunt Janelle to make hot chocolate is as follows;
The quantity of milk to cocoa = 5 cups : 2 cups respectively.
Therefore the cups of milk to 8 cups would be = X
That is, 5 cup of milk = 2 cups of cocoa
X cup of milk = 8 cups of cocoa
make X the subject of formula;
X = 5 × 8/2
X= 40/2
X = 20
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Need help quick please.
y=2x²+4x+4 and y=3x²+6x+9 are two instances for the provided standard form, y=ax²+bx+c.
What is equation?In its most basic form, an equation is a mathematical statement that indicates that two mathematical expressions are equal. 3x + 5 = 14, for example, is an equation in which 3x + 5 and 14 are two expressions separated by a 'equal' sign. A condition on a variable (or variables) such that two expressions in the variable (variables) have equal value is referred to as an equation. • The solution or root of the equation is the value of the variable for which the equation is fulfilled.
Here,
given standard form,
y=ax²+bx+c
examples of this,
y=2x²+4x+4
y=3x²+6x+9
The 2 examples for given standard form, y=ax²+bx+c is y=2x²+4x+4 and y=3x²+6x+9.
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In quadrilateral QRST, point Q has coordinates (5, -6) and is
translated 6 units left and 5 units down. What are the coordinates
of the translated point Q'?
O (10,0)
By applying the required transformation, the coordinates of the translated point Q' are (-1, -11).
What is translation?A translation is a type of transformation in geometry that moves every point of a figure in a fixed direction and by a fixed distance, without changing its size or shape. It is one of the basic geometric transformations along with rotation, reflection, and dilation.
What are coordinates?Coordinates are a set of values that determine the position of a point in a certain space. In a two-dimensional space, coordinates are usually represented by an ordered pair of numbers (x, y), where x is the horizontal distance from a fixed point called the origin and y is the vertical distance from the origin. In a three-dimensional space, coordinates are represented by an ordered triple of numbers (x, y, z). Coordinates are often used to locate points in space, to describe the position of objects, and to plot graphs.
To find the coordinates of the translated point Q', we can use the rule that in a translation, the x-coordinate is decreased by the horizontal translation distance and the y-coordinate is decreased by the vertical translation distance.
Given that point Q has coordinates (5, -6) and is translated 6 units left and 5 units down, we can find the coordinates of the translated point Q' as follows:
x' = x - 6 (horizontal translation distance)
y' = y - 5 (vertical translation distance)
So the coordinates of the translated point Q' are:
x' = 5 - 6 = -1
y' = -6 - 5 = -11
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Suppose that the relation His defined as follows.
H={(−3, 1), (−4, −4), (1, −3), (0, 8)}
Give the domain and range of H.
Write your answers using set notation.
domain = []
range = 0
Domain of the relation will be {-3,-4,1,0} and
Range of the relation will be {1,-4,-3,8}.
What is range and domain of a function?
Domain
The set of all possible values which qualify as inputs to a function is known as the domain of the function, or it can also be defined as the entire set of values possible for independent variables. The domain can be found in – the denominator of the fraction is not equal to zero and the digit under the square root bracket is positive. (In the case of a function with fraction values).
Range
The set of all the outputs of a function is known as the range of the function or after substituting the domain, the entire set of all values possible as outcomes of the dependent variable.
Now,
As inputs in the given relation are {-3,-4,1,0}
and outputs are {1,-4,-3,8}.
Hence,
Domain of the relation will be {-3,-4,1,0} and
Range of the relation will be {1,-4,-3,8}
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HOW FAR FROM HOME PLATE
TO SECOND BASE?
The catcher at home plate often needs
to make a quick throw to second base.
According to the measurements shown on
the baseball diamond, the exact distance
is √16,200 feet. How far is that in decimal
form? (Round to the nearest hundredth.)(please hurry )
The catcher must throw the ball in a distance of 127.2 feet to force a runner out at second base.
What is the distance that the ball have to be throw?From the figure we understands that it is a right angled triangle.
A right triangle or right-angled triangle, or more formally an orthogonal triangle, formerly known as a rectangled triangle, is a triangle with one right angle, i.e. two perpendicular sides. Trigonometry is founded on the relationship between the sides and other angles of a right triangle.The hypotenuse of a right triangle is formed by the line from home plate to second base. The triangle's two sides are each 90 feet.
We can calculate the length of the hypotenuse using the Pythagorean theorem:
90² + 90² = c²
= 8100 + 8100 = c²
= 16200 = c²
c = √16200
c = 127.2
c = 127 feet
As a result, the distance that the catcher must throw the ball to get a runner out at second base is 127 feet.
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19 out of 36 in a class are girls calculate 19 as a percentage to 1 decimal point
The value of percent in 1 decimal point is, 52.7%.
What is mean by Percentage?A number or ratio that can be expressed as a fraction of 100 or a relative value indicating hundredth part of any quantity is called percentage.
Given that;
There 19 out of 36 in a class are girls.
Hence, The percentage of girls is,
⇒ 19 / 36 × 100 %
⇒ 1900/36 %
⇒ 52.7%
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Xochitl went into a movie theater and bought 6 bags of popcorn and 4 drinks, costing a total of $65. Alonso went into the same movie theater and bought 9 bags of popcorn and 8 drinks, costing a total of $107.50. Determine the price of each bag of popcorn and the price of each drink.
The cost of bag of popcorn is $7.5 and that of one drink is $5.
How to find the general equation of a Straight line?The formula for finding the general equation of a straight line is -
[y] = [m[y] = [m]x + [c]
where -
[m] → is slope of line which tells the unit rate of change of [y] with respect to [x].
[c] → is the y - intercept i.e. the point where the graph cuts the [y] axis.
We have Xochitl who went into a movie theatre and bought 6 bags of popcorn and 4 drinks, costing a total of $65, Alonso went into the same movie theatre and bought 9 bags of popcorn and 8 drinks, costing a total of $107.50.
Assume that the cost of one popcorn bag is $[x] and one drink is $[y].
Then we can write -
6x + 4y = 65
6x + 4y = 659x + 8y = 107.5
Plot the graph of both equations and the points of intersection would be the solution set. Refer to the graph below. We get x = $7.5 and y = $5.
Therefore, the cost of bag of popcorn is $7.5 and that of one drink is $5.
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Answer:
$7.5 and 5
Step-by-step explanation:
i did this on my assignment
Penny reads 14 pages in 1/4 hour. What is the unit rate for hours per page
Answer:
56 pages per hour
Step-by-step explanation:
Penny reads 14 pages in 1/4 of an hour.
An hour is 4 times more than 1/4 of an hour (you could think of it as 15 minutes compared to 60 minutes)
Multiply the amount penny reads in 1/4 of an hour (14 pages) by 4 to get the rate she reads in 1 hour.
14 x 4 = 56
Now add the rate of time (per hour) to get that she reads a total of 56 pages per hour.
Hope this helps!
The sum of three consecutive numbers is ninenty- nine. What is the smallest of the three numbers?
Answer: 32
Step-by-step explanation:
32+33+34 = 99
They are consecutive numbers.
9. Write 3 numbers that are divisible by
both 2 and 5.
In this question, we use the theory of LCM (Least Common Multiple) for finding the numbers which are divisible by 2,5 and 10. As we know, in arithmetic, the LCM is the smallest or least positive integer that is divisible by both a and b. So, in this question we need to calculate the LCM of 2,5
Which is divisible by 2 and 5?step 1
Solution
LCM of 2,5,10 is 10
So, if a number is divisible by 10 then it will be divisible by 2,5,10
Like 60,100,120,450,600
step-by-step answer:
For example, let us take two positive integers 4 and 6. Multiples of 4 are: 4,8,12,16,20,24… Multiples of 6 are: 6,12,18,24…. The common multiples for 4 and 6 are 12,24,36,48…and so on.
2, 5 and 10 (LCM by Division Method).
LCM of 2, 5 and 10 = 2X5
= 10
we get LCM of 2, 5 and 10 is 10.
So, if a number is divisible by 10
Then it will be divisible by 2,5,10.
Therefore, any number which is multiple of 10 or which is divisible by 10. We say it will be divisible by 2,5,10.
Like- 10, 20, 30, 40, 50, 60, 70, 80 etc.
Thus, 10, 20, 30, 40, 50 are 5 numbers which are divisible by 2,5 and 10.
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H(x) = (x-1)^2 -9 plot the x intercept
Answer:
x = -2 and 4
Step-by-step explanation:
You want a plot of the x-intercepts of H(x) = (x -1)² -9.
X-interceptsThe x-intercepts are the points where the graph crosses the x-axis, the points where H(x) = 0. Solving, we get ...
H(x) = (x -1)² -9
9 = (x -1)² . . . . . . . . add 9
±3 = x -1 . . . . . take the square root
±3 +1 = x = {-2, 4} . . . . . add 1
PlotThe attached graph shows the coordinates of the x-intercept points on the x-axis. The coordinates of the vertex of the parabola are also shown.
Kami needs to score at least an 83 on her quiz in order to make an A for the report card.Write the inequality.
The inequality for the expression is x≥83
What is inequality?inequality, In mathematics is a statement of an order relationship. The signs in inequality includes: greater than, greater than or equal to, less than, or less than or equal to—between two numbers or algebraic expressions.
greater than( >)
less than (<)
less than or equal to ≤
greater than or equal to ≥
Kami needs to score at least 83 on her quiz, this means that kami need to score a mark greater than or equal to 83 in her quiz.
If we represent the score of kami by x, this means the expression can be represented as:
x ≥ 83
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Which function increases at a faster rate on 0 to infinity, f(x) = x2 or g(x) = 2x? Explain your reasoning.
The function that increases at a faster rate on 0 to infinity is g(x) = 2ˣ
What is an average rate?
An average rate measure of how much the function changed per unit, on average, over that interval. It is derived from the slope of the straight line connecting the interval's endpoints on the function's graph.
The functions are given as:
f(x) = x² --- quadratic
g(x) = 2ˣ --- exponential
The exponential function has the same base as the power of the quadratic function.
This means that the exponential function would increase faster from the point where f(x) = g(x)
This is illustrated using the following table
x 0 1 2 3 4 5
f(x) 0 1 4 9 16 25
g(x) 1 2 4 8 16 3
Hence, the function that increases at a faster rate on 0 to infinity is g(x) = 2ˣ
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You are reducing a map of dimensions 2 ft by 3 ft to fit on a piece of paper 8 In by 10 in. What are the dimensions of the largest possible map
that can fit on the page?
A
2/3
in by 10 in
85 m by 10 m
Cam by 6 in
D. in by 10 in
Therefore , the solution of the given problem of area is largest map that may be utilized while still fitting on the page is 20/3 inches by 10 inches.
Area : What is it?The term "area" refers to how much room a 2D structure or surface occupies. We use these units to measure surface in cm2 or m2. By dividing the length by the breadth of a form, you can determine its area.
Area = length times breadth and Perimeter = 2 (length + width)
Here,
Given: 2 feet by 3 feet is the size of the map.
8 by 10 inches is the size of a sheet of paper; in inches:
12 inches per foot
24 inches are equal to two feet, or two times twelve.
36 inches are equal to three feet, or three times twelve.
Scale factor is 24/36, or two-thirds.
Paper's longer side equals ten inches.
Using the scale, determine how long the shorter side is:
2/3 = x/10
the cross-multiply
3x = 2 × 10
3x = 20
x = (20 ÷ 3)
x=6.23 inches
The largest map that may be utilized while still fitting on the page is 20/3 inches by 10 inches.
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2) A robot vacuum cleans a dirty floor using multiple passes. During each pass, 17% of the dirt is removed. If the floor initially has 460.0 ml of dirt, how much dirt will remain after 9 passes?
86 ml of dirt will remain after 9 passes
What is an equation?An equation is an expression showing the relationship between numbers and variables.
Let y represent the amount of dirt on the floor after x passes, hence:
y = abˣ
During each pass, 17% of the dirt is removed, therefore b = 100% - 17% = 0.83
If the floor initially has 460.0 ml of dirt, then a = 460.
The equation becomes:
y = 460(0.83)ˣ
After 9 passes:
y = 460(0.83)⁹ = 86
86 ml of dirt will remain
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(a)
Two friends, Jeanette and Zoe, are growing out their hair. They plan to cut it off at a certain point and donate it to a charity that makes wigs for people with cancer. Jeanette's hair is already 29 centimeters long and grows at a constant rate of 1 centimeter per month. Zoe's hair is 12 centimeters and growing at a speed of 2 centimeters per month. If the girls get their hair cut on a certain day, they will have exactly the same length to donate. How long will their hair be? How long will that take?
Part A:
Using the variables y for total growth and x for rate of change answer the questions below.
Create the equation for Jeanette's hair growth:
Create the equation for Zoe's hair growth
Answer:
Step-by-step explanation:
J: y = 29 cm + (1 cm/mo)x
Z: y = 12 cm + (2 cm/mo)x
29 cm + (1 cm/mo)x = 12 cm + (2 cm/mo)x
Solve for x to find how many months it will take for them to have the same length of hair:
29 cm - 12 cm = (2 cm/mo)x - (1 cm/mo)x
17 cm = (1 cm/mo)x
x = (17 cm) / (1 cm/mo) = 17 months
Plug this value for x (17 months) into the equations to find how long their hair will be:
J: y = 29 cm + (1 cm/mo)(17 mo) = 46 cm
Z: y = 12 cm + (2 cm/mo)(17 mo) = 46 cm
This shows that it will take 17 months for each girl's hair to be 46 cm long.
Using the maxima and minima of the function, produce upper and lower estimates of the integral
I=∫∫De^5(x2+y2)dA where D is the circular disk: x^2+y^2≤4
In calculus, we can find the maximum and minimum value of any function or variable without on looking at the graph of the function.
Maxima will be the giant point on the curve within the given range and minima would be the minimum point on the curve. The combination of both is extrema.
Since 0 ≤ x^2 + y^2 ≤ 6, we have e^ (6*0) ≤ e^ (6(x^2 + y^2)) ≤ e^ (6*6) on D.
So, ∫∫ 1 dA ≤ ∫∫ e^ (6(x^2 + y^2)) dA ≤ ∫∫ e^36 dA
==> 6π ≤ ∫∫ e^ (6(x^2 + y^2)) dA ≤ 6π * e^36, since the area of D is 6π.
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find the taylor series up to the degree 4 term at a = 8 for f(x) = ex.
The Taylor series up to the degree 4 terms is:
e^8 + (x - 8)e^8 + (x - 8)^2/2! e^8 + (x - 8)^3/3! e^8 + (x - 8)^4/4! e^8
The Taylor series of a function f(x) at point a is an infinite sum of terms that approximates the value of the function near point a. The general form of the Taylor series of f(x) at a is:
f(x) = f(a) + (x - a)f'(a) + (x - a)^2/2! f''(a) + (x - a)^3/3! f'''(a) + ...
Where,
f'(a) is the first derivative of f(x) at a.f''(a) is the second derivative of f(x) at a.f'''(a) is the third derivative of f(x) at a.In the case of e^x, the function is infinitely differentiable, so all its derivatives are equal to itself. Hence the Taylor series at a=8 is:
e^8 + (x-8)e^8 + (x-8)^2/2! e^8 + (x-8)^3/3! e^8 + (x-8)^4/4! e^8 + ....
by taking the degree 4 terms we can find the Taylor series of e^x at a = 8 up to the degree 4 terms, which is
e^8 + (x-8)e^8 + (x-8)^2/2! e^8 + (x-8)^3/3! e^8 + (x-8)^4/4! e^8
Learn more about the Taylor series here:
https://brainly.com/question/23334489
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