By using the graphs above, a graph that represent h(x), given that function h(x) = f(x) + g(x) include the following: A. graph A.
What is the general form of a quadratic function?In Mathematics, the general form of a quadratic function is modeled by the following mathematical expression;
y = ax² + bx + c
Where:
a and b represents the coefficients of the first and second term in the quadratic function.c represents the constant term.Next, we would write quadratic functions that represent both f(x) and g(x) in standard form and with a leading coefficient of 1 as follows;
f(x) = (x + 3)(x + 1)
f(x) = x² + 3x + x + 3
f(x) = x² + 4x + 3
For the function g(x), we have the following:
g(x) = -(x - 3)(x - 1)
g(x) = -(x² - 3x - x + 3)
g(x) = -x² + 4x - 3
Therefore, a function that represent h(x) can be calculated as follows;
h(x) = f(x) + g(x)
h(x) = x² + 4x + 3 -x² + 4x - 3
h(x) = (x² - x²) + (4x + 4x) + (- 3 + 3)
h(x) = 8x
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2
3
2
x
=2
5
x=
PLEASE HELPPPPPP
Answer: can you put it in diffrent form beucase the way you have it is really confusing me thanks
Step-by-step explanation:
Translate this sentence into a inequality. The product of x and 4 is greater than or equal to 18
The inequality for the given sentence would be:
4x ≥ 18. This means that the product of x and 4 is greater than or equal to 18.
The inequality "4x ≥ 18" is read as "four times x is greater than or equal to 18". This means that the value of x must be equal to or greater than 4.5 for the inequality to hold true.
To solve the inequality, we can divide both sides by 4, which gives us:
x ≥ 4.5
This means that any value of x that is equal to or greater than 4.5 will satisfy the original inequality.
For example, x = 5 would satisfy the inequality because: 4(5) = 20, which is greater than or equal to 18.p
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A random sample of students was surveyed and asked to list their grade level and what movie genre they prefer. Results are shown in the table below.
Movie Genre
Superhero Comedy Drama
6th grade 17 11 10
7th Grade 16 17 13
8th Grade 15 15 13
What percent of the 6th graders prefer superhero movies? Round your answer to the nearest whole number percent.
Answer:
28%
Step-by-step explanation:
Answer: 45% of the 6th graders surveyed prefer superhero movies.
Step-by-step explanation:
To find the percentage of 6th graders who prefer superhero movies, we need to divide the number of 6th graders who prefer superhero movies by the total number of 6th graders, and then multiply by 100 to get a percentage.
According to the table, there are 17 6th graders who prefer superhero movies. The total number of 6th graders is:
10 + 11 + 17 = 38
Therefore, the percentage of 6th graders who prefer superhero movies is:
(17 / 38) x 100% = 44.74%
Rounded to the nearest whole number percent, the answer is:
45%
So approximately 45% of the 6th graders surveyed prefer superhero movies.
I need some help please
The solution of the inequality is x ≤ - 7 / 2 or x > 1
How to solve inequality?Inequalities are mathematical expressions involving the symbols >, <, ≥ and ≤.
Therefore, let's solve the inequalities. The variable in the inequality is x. A variable is a number represented with letter in an equality or inequality.
Therefore,
x + 1 / 2 ≤ - 3 or x - 3 > - 2
Let's solve them individually,
x + 1 / 2 ≤ - 3
subtract 1 / 2 from both sides of the inequality
x ≤ - 3 - 1 / 2
x ≤ - 7 / 2
Hence,
x - 3 > - 2
add 3 to both sides of the inequality
x - 3 + 3 > - 2 + 3
x > 1
Hence,
x ≤ - 7 / 2 or x > 1
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GEOMETRY Heron's formula states that the area of a triangle whose sides have lengths
1
a, b, and c is A = √s(s-a)(s - b)(s-c) where s =1/2 (a + b + c). If the area of
the triangle is 270 cm², s = 45 cm, a = 15 cm, and c = 39 cm, what is the length of side
b?
Answer:
Approximately 26.87 cm
Step-by-step explanation:
To find the length of side b using Heron's formula, we need to substitute the given values into the formula and solve for b:
A = √s(s-a)(s - b)(s-c)
270 = √45(45-15)(45-b)(45-39)
Simplifying the expression inside the square root:
270 = √45(30)(6)(6-b)
270 = 540√(6-b)
Squaring both sides:
72900 = 291600 - 54000b + 3240b^2
Rearranging:
3240b^2 - 54000b + 218700 = 0
Dividing both sides by 540:
6b^2 - 100b + 405 = 0
We can solve for b using the quadratic formula:
b = (-(-100) ± √((-100)^2 - 4(6)(405))) / (2(6))
b = (100 ± √13600) / 12
b ≈ 26.87 cm (rounded to two decimal places)
Therefore, the length of side b is approximately 26.87 cm.
you have some standard six-sided dice. what is the probability of rolling a total of ten when you roll three dice
You have some standard six-sided dice. So, the probability of rolling a total of ten when you roll three dice is 5/216.
To find the probability of rolling a total of ten when rolling three dice, we can use the formula:
P(event) = desired outcomes / total outcomes
Given that we have six-sided dice, we know that the total outcomes for rolling one die is six.
Therefore, the total outcomes for rolling three dice would be[tex]6^3[/tex]= 216.
To find the desired outcomes, we can use combinations.
There are three ways we can roll a total of ten with three dice:
1-3-62-4-43-5-24-3-34-2-45-1-5
Therefore, there are five combinations that result in a total of ten.
Therefore, the probability of rolling a total of ten when rolling three dice is:
P(event) = 5/216
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Find the area of the triangle whose vertices are (−2,3),(3,2) and (−1,−8) by using determinant method.
11 square units
Given the vertices of a triangle in coordinate geometry, find its area by using the determinant method. The given vertices of the triangle are (-2, 3), (3, 2), and (-1, -8).Step-by-step explanation: The formula for calculating the area of the triangle with given vertices using determinant method is given as, \[\frac{1}{2}\begin{vmatrix}x_1 & y_1 & 1 \\x_2 & y_2 & 1 \\x_3 & y_3 & 1 \\\end{vmatrix}\]Here, x1, y1, x2, y2, x3, y3 are the coordinates of the given vertices. Now, substitute the given values and evaluate the determinant as shown below. \[\frac{1}{2}\begin{vmatrix}-2 & 3 & 1 \\3 & 2 & 1 \\-1 & -8 & 1 \\\end{vmatrix}=\frac{1}{2}((-2)(2(-8)-(-1)(3))+3(1(-8)-(-1)(-1))+1(3(2)-(-1)(3)))\]After multiplying, we get, \[\frac{1}{2}(-16+29+9)=\frac{1}{2}(22)=11\] Therefore, the area of the triangle whose vertices are (-2, 3), (3, 2), and (-1, -8) is 11 square units.
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Lara deposits $49,000 to be compounded monthly at 15.3% for 2 years.
Which equation will she use to determine how much money she'll have after 2 years? i
After 2 years she'll have ___
The equation she will use to determine how much money she'll have after 2 years is: A = 49,000*(1+0.153/12)^(2*12).
After 2 years she'll have $70,960.36.
How do we calculate the future value?The formula for compound interest is: A = P * (1 + r/n)^(n*t). In the formula, we convert the annual interest rate to a monthly rate by dividing it by 12 (the number of months in a year), and we multiply the number of years by 12 to get the number of months.
Using this formula, we can calculate how much money Lara will have after 2 years:
A = 49000 * (1 + 0.153/12)^(12*2)
A = $70,960.36
Therefore, Lara will have $70,960.36 after 2 years of compounding her investment monthly at 15.3%.
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the lengths of human pregnancies (gestations) can be modeled by a bell-shaped distribution with mean 266 days and standard deviation 16 days. use the empirical rule to answer the questions below. what is the 84th percentile of the gestations?
The 84th percentile of gestations which can be ruled by standard deviation is 282 days.
The lengths of human pregnancies (gestations) can be modeled by a bell-shaped distribution with a mean of 266 days and a standard deviation of 16 days. Use the empirical rule to determine the 84th percentile of the gestations. The empirical rule, also known as the 68-95-99.7 percent rule, is a statistical guideline that states that within one standard deviation of the mean, 68 percent of the data is distributed.
Within two standard deviations of the mean, 95% of the data is distributed. Finally, 99.7 percent of the data is distributed within three standard deviations of the mean. As a result, it's necessary to locate the corresponding z-score for the given percentile to use the empirical rule.
Since we have the mean and standard deviation, we can use the following equation to compute the z-score using the formula: z = (X - µ)/σ where X is the value of interest, µ is the mean, and σ is the standard deviation. From the formula: z = (X - µ)/σX = µ + zσ Substituting the given values in the formula, we get: X = 266 + z(16)We need to find the 84th percentile.
This means that the remaining 16 percent of the data is distributed outside of the mean plus one standard deviation. As a result, the corresponding z-score can be found using a standard normal distribution table or calculator. The standard normal distribution table or calculator gives us the z-score of 1.00 for the 84th percentile. Using this, we can compute the value of X as follows: X = µ + zσX = 266 + (1.00)(16)X = 266 + 16X = 282
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shape R is reflected in the line x = -1 to give R'
a. what is the coordinates of C?
R' is then translated by by (-1, -6) to give R''
b. what is the coordinates of C?
When the shape R is reflected R' the coordinates of C (2, 5) when translated to R" C (1, -1).
What are Transformations:
Transformations are changes made to a geometric figure in a plane or space. There are three main types of transformations: translation, rotation, and reflection.
Rotation is a transformation where a figure is turned around a fixed point, called the center of rotation. This can be a clockwise or counterclockwise turn, and the degree of rotation is determined by the angle between the original and final positions of the figure.
Here we have a shape R
From the graph,
The coordinate of C is (-4, 5)
Shape R is reflected in line x = -1 to give R'
=> (x, y ) → (-x - 2, y)
=> (-4, 5) → (4- 2, 5)
=> Coordinates of C are (2, 5)
R' is then translated by (-1, -6) to give R''
Hence, the R is moved 1 unit left words and 6 units downwards
=> (2, 5) → (-1 + 2, 5 - 6)
=> (2, 5) → (1, -1)
Therefore,
When the shape R is reflected R' the coordinates of C (2, 5) when translated to R" C (1, -1).
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Kayla and Maria are selling cookie dough for a school fundraiser. Customers can buy packages of sugar cookie dough and packages of double chocolate cookie dough. Kayla sold 7 packages f sugar cookie dough and 1 package of double chocolate cookie dough for a total of $53. Maria old 1 package of sugar cookie dough and 1 package of double chocolate cookie dough for a total f $17. Find the cost each of one package of sugar cookie dough and one package of double hocolate cookie dough.
One package of sugar cookie dough costs $6 and one package of double chocolate cookie dough costs $11.
How to solve the variables?
Let's use the following variables:
Let x be the cost of one package of sugar cookie dough.
Let y be the cost of one package of double chocolate cookie dough.
We can create a system of two equations to represent the information given in the problem:
Equation 1: 7x + y = 53 (from Kayla's sales)
Equation 2: x + y = 17 (from Maria's sales)
We can solve for x and y by using the substitution method, which involves solving one equation for one variable and substituting the result into the other equation. Here's how we can do it:
Solve Equation 2 for y:
y = 17 - x
Substitute y = 17 - x into Equation 1 and solve for x:
7x + (17 - x) = 53
6x + 17 = 53
6x = 36
x = 6
Substitute x = 6 into Equation 2 and solve for y:
y = 17 - x
y = 17 - 6
y = 11
Therefore, one package of sugar cookie dough costs $6 and one package of double chocolate cookie dough costs $11.
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If it take me 5 hours to drive to grandmas house and I drive at a constant speed of 65 mph.
How far away is her house to mine?
Answer:
325 miles
Step-by-step explanation:
speed = distance/time
=> distance = speed x time = 65 x 5 = 325 miles
Step-by-step explanation:
If you drive at a constant speed of 65 miles per hour for 5 hours, you would cover a distance of:
Distance = Speed x Time
Distance = 65 mph x 5 hours
Distance = 325 miles
Therefore, your grandmother's house is 325 miles away from yours.
Pleaseeeeee helppp!!!!
Answer:
≈ 18.8 cm
Step-by-step explanation:
Since the circle is inscribed in the square, the diameter of the circle is equal to the side length of the square.
The area of the square is given as 36 cm^2, so we can find the side length of the square as:
side length = √(area) = √(36 cm^2) = 6 cm
The diameter of the circle is therefore also 6 cm, and the radius of the circle is half the diameter, or 3 cm.
The circumference of a circle is given by the formula:
circumference = 2πr
where r is the radius of the circle.
Substituting in our values, we get:
circumference = 2π(3 cm) = 6π cm
Using a calculator to approximate π to one decimal place, we get:
circumference ≈ 18.8 cm
Therefore, the circumference of the circle inside the square is approximately 18.8 cm.
Mariah's lunch bill was $13.00. What is the least amount
of bills she could use to pay for her lunch?
? QUESTION Divide. Write your answer in simplest form. 3-:(7)/(3) OO EXPLANATION
2/3 in its simplest form.
3-(7)/(3) can be simplified to 2/3 by performing the following steps:
1. First, divide 7 by 3 to get 7/3.
2. Then, subtract 7/3 from 3 to get 3-(7/3), which equals 2/3.
Therefore, the answer is 2/3 in its simplest form.
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A packet contains 126 sweets. The sweets are all red, yellow or green in the ratio of 6 : 4 : 4Find how many yellow sweets are in the packet
If he sweets are all red, yellow or green in the ratio of 6 : 4 : 4, there are 36 yellow sweets in the packet.
To solve this problem, we need to use the concept of ratios. The ratio of red, yellow, and green sweets is 6:4:4, which means that for every 6 red sweets, there are 4 yellow and 4 green sweets.
We can use this ratio to find out how many yellow sweets there are in the packet. Since the ratio of yellow sweets to the total number of sweets is 4:14 (6+4+4=14), we can write:
Yellow sweets / 126 = 4 / 14
To solve for the number of yellow sweets, we can cross-multiply and simplify:
Yellow sweets = 126 x 4 / 14
Yellow sweets = 36
We can also use the same method to find the number of red and green sweets:
Red sweets = 126 x 6 / 14
Red sweets = 54
Green sweets = 126 x 4 / 14
Green sweets = 36
To check our answer, we can verify that the total number of sweets is equal to the sum of red, yellow, and green sweets:
54 + 36 + 36 = 126
Therefore, our answer is correct.
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find the slope of -1,-12 and 1,-8
Answer: 2
Step-by-step explanation:
Please answer with formula and how to find it
The radius of a circle is half of the diameter. Therefore, the radius of the circle is 7 yards and the diameter of the circle is 14 yards.
How to find the radius and diameter of a square?The above shape is a circle. The area of the circle is given as 49πyards square. The radius of a circle is the distance of the circumference to the centre of a square. The diameter of a circle is twice the radius of the circle.
Therefore, let's find the radius and diameter of a circle as follows:
area of a circle = πr²
where
r = radiusArea of the circle = πr²
49π = πr²
divide both sides of the equation by π
r² = 49
square root both sides of the equation
r = √49
r = 7 yards
Therefore,
diameter = 7 × 2
diameter = 14 yards
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After the last ice age began, the number of animal species in Australia changed rapidly. The relationship between the elapsed time, ttt, in years, since the ice age began, and the total number of animal species, S(t)S(t)S, left parenthesis, t, right parenthesis, is modeled by the following function: S(t)=4,200,000⋅(0. 72)t Complete the following sentence about the yearly percent change of the number of animal species
The yearly percent change in the number of animal species is approximately -67.68%. This means that the number of animal species is decreasing by about 67.68% each year after the last ice age began.
The yearly percent change of the number of animal species after the last ice age began can be calculated by taking the derivative of the function given, S(t)=4,200,000⋅(0.72)t. Using the power rule, the derivative of this function is S'(t)=2,976,000⋅(0.72)t-1. This tells us that the yearly percent change in the number of animal species is -72%. This means that every year, the total number of animal species decreases by 72%.
The yearly percent change of the number of animal species can be determined by finding the derivative of the function [tex]S(t) = 4,200,000(0.72)^t.[/tex]
The derivative of the function can be calculated as follows:[tex]S'(t) = 4,200,000 ln(0.72) (0.72)^t[/tex] The yearly percent change can be calculated by finding the percentage change in the total number of animal species for each year. This can be done by finding the percentage change in the value of the function for each year.
The percentage change in the value of the function can be calculated using the formula:% change = [(new value - old value) / old value] x 100Substituting the values of the function for different years in the above formula, we can find the percentage change for each year.
For example, if we want to find the percentage change in the number of animal species after 10 years, we can substitute t = 10 in the function and calculate the new value of S(t). Then, we can use the above formula to find the percentage change in the value of the function for 10 years.S(10) = 4,200,000(0.72)^10 ≈ 1,357,747% change = [(1,357,747 - 4,200,000) / 4,200,000] x 100 ≈ -67.68%
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Solve the equation: 7x = 42
A. x = 7
B. x = 6
C. x = -7
D. x = -6
Answer:
x = 6
Step-by-step explanation:
7x = 42
To solve the equation, divide each side by 7.
7x/7 = 42/7
x = 6
Solve the following inequality. Please put it in sl 4y>12x-48
The inequality expression 4y > 12x - 48 when evaluated is y > 3x - 12
How to evaluate the inequalityFrom the question, we have the following parameters that can be used in our computation:
4y>12x-48
Express properly
4y > 12x - 48
Multiply 1/4 to both sides of the inequality
So, we have the following representation
1/4 * 4y > 12x * 1/4 - 48 * 1/4
Evaluate the products
y > 3x - 12
Hence, the solution is y > 3x - 12
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Drag the tiles to the correct boxes to complete the pairs.
angles congruent to 21
angles congruent to 26
DOOD
23,27,26
In the figure, line a and line b are parallel. Based on the figure, match each given angle with its congruent angles.
23,27,22
1/2
angles congruent to 22
24,28,25
3/4
23,26,22
5/6
7/8
-a
-b
angles congruent to 27
Angles congruent to ∠1= ∠4,∠8,∠5
Angles congruent to ∠2= ∠3,∠7,∠6
Angles congruent to ∠6= ∠3,∠7,∠2
Angles congruent to ∠7= ∠3,∠6,∠2
Define vertically opposite anglesThe opposing angles created by the connection of two straight lines are known as vertical angles or vertically opposed angles.
Part1)(Vertically opposite angle ∠1=∠4
Vertically opposite angle ∠8=∠5
consecutive exterior angle ∠4=∠8)
Angles congruent to ∠2= ∠3,∠7,∠6
Hence, Angles congruent to ∠1= ∠4,∠8,∠5
Part2)(Vertically opposite angle ∠2=∠3
Vertically opposite angle ∠7=∠6
consecutive exterior angle ∠3=∠7)
Angles congruent to ∠7= ∠3,∠6,∠2
part3)(Vertically opposite angle ∠7=∠6
Vertically opposite angle ∠2=∠3
consecutive exterior angle ∠6=∠2)
Hence, Angles congruent to ∠6= ∠3,∠7,∠2
Part4)(Vertically opposite angle ∠6=∠7
Vertically opposite angle ∠3=∠2
consecutive exterior angle ∠7=∠3)
Hence, Angles congruent to ∠2= ∠3,∠7,∠6
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The graph below represents the solution set of which inequality?
+
-5-4-3-2-1 0 1 2 3 4 5 x
Ox²-2x-8 <0
Ox²+2x-8 <0
Ox²-2x-8>0
Ox²+2x-8>0
Answer:
x^2-2x-8<0
Step-by-step explanation:
It is difficult visualizing the expressions, so lets change them to equations by substituting a "y" in place of the 0 of the inequality. This will allow us to graph the expressions. Then if we focus on only the y=0 line in the graph, we can find the correct inequality.
All four expressions are graphed with this substitution and included on the attached worksheet. Note the marked their marked differences. The two points on the given number line (-4,0) and (2,0) are marked on each graph.
What we should focus on first is which graphs actually intersect the two end values of x given on the number line: -4 and 2. Since we used y instead of "0" in the expressions, we are seeing everything, for all values of x. But what we really want are -4 and 2, which we can mark with (-4,0) and (2,0).
Only two graphs intersect (-4,0) and (2,0): the first and third (lower left). The first (x^2-2x-8<y) has the interior of the parabola colored blue - these are the valid points for the inequality. The number line between (-4,0) and (2,0) in included. The third (x^2-2x-8>y) is colored everywhere outside the parabola, and thus exclues the number line in the region we are interested. So the equation for this graph is not a valid possibility.
We may conclude that graph 1 is correct. The important section of the graph is expanded at the bottom. Since the graph line is dotted, the two points (-4,0) and (2,0) are not actually included on the line - they are simply a boundary, due to the < function. They would be included if the expression had said ≤ or ≥ (with the = sign).
The expression that represents the solution set is x^2-2x-8<0
Brian has $20,000 in a savings account that earns 5% annually. The interest is not
compounded. How much will he have in total in 5 years?
Answer:
Since the interest is not compounded, Brian will earn a simple interest of 5% per year on his initial deposit of $20,000. The formula for calculating simple interest is:
I = P * r * t
where I is the interest earned, P is the principal (initial deposit), r is the annual interest rate as a decimal, and t is the time in years.
Substituting the given values, we get:
I = 20,000 * 0.05 * 5 = 5,000
Therefore, Brian will earn $5,000 in interest over the 5-year period. Adding this to his initial deposit of $20,000, we get:
Total amount = $20,000 + $5,000 = $25,000
Therefore, Brian will have a total of $25,000 in his savings account after 5 years.
Answer:
$25,000
Step-by-step explanation:
The total amount Brian will have in 5 years can also be calculated using the formula for simple interest:
A = P(1 + rt)
where:
A = the total amount
P = the principal (initial balance)
r = the annual interest rate
t = the time period (in years)
In this case:
P = $20,000
r = 0.05 (since 5% is the annual interest rate)
t = 5 (since we're calculating the total amount after 5 years)
Plugging these values into the formula, we get:
A = $20,000(1 + 0.05 x 5)
A = $20,000(1.25)
A = $25,000
So we get answer of $25,000, which is the total amount Brian will have in 5 years.
The six balls can also fit exactly into a closed cylindrical container, as shown in the diagram. Find (i) the volume of the cylindrical container, Answer(c)(i) (ii) the volume of the cylindrical container not occupied by the balls, Answer(c)(ii) ‒‒‒‒‒‒‒‒‒‒‒‒‒‒ (iii) the surface area of the cylindrical container. 3 cm [3] cm³ [1]
The volume of the container is 127.23 cubic cm
The volume not occupied is 42.41 cubic cmThe surface area is 183.78 square cmThe volume of the containerThe given parameters are
Number of balls = 6
Height of ball = 3 cm
This means that
Height of cylinder, h = 6 * 3 cm = 18 cm
Radius of cylinder, r = 3/2 cm = 1.5 cm
So, we have
Volume = πr²h
Volume = π * 1.5² * 18
Volume = 127.23
The volume not occupied by ballsThe volume of a ball is
Ball = 4/3πr³
For 6 balls, we have
Balls = 6 * 4/3πr³
Balls = 8πr³
So, we have
Balls = 8π * 1.5³
Balls = 84.82
So, the unoccupied space is
Space = 127.23 - 84.82
Space = 42.41
The surface area of the cylindrical containerThis is calculated as
Area = 2πrh + 2πr²
So, we have
Area = 2π * 1.5 * 18 + 2π * 1.5²
Area = 183.78
Hence, the surface area is 183.78 square cm
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Given cot � = − 4 5 and that angle � A is in Quadrant II, find the exact value of sec � secA in simplest radical form using a rational denominator.
Therefore, the exact value of sec(θ) sec(A) in simplest radical form using a rational denominator is 41/16.
What is trigonometry?Trigonometry is based on the ratios of the sides of a right triangle, which are defined in terms of the angles of the triangle. The three main trigonometric functions are sine, cosine, and tangent, which are abbreviated as sin, cos, and tan, respectively. These functions are used to relate the angles of a triangle to the lengths of its sides, and can be calculated using a scientific calculator or a table of values.
Here,
We can start by using the definition of cotangent:
cot(θ) = adjacent / opposite
From the given information, we have cot(θ) = -4/5. Since θ is in Quadrant II, we know that the adjacent side is negative and the opposite side is positive. We can use the Pythagorean theorem to find the hypotenuse:
a² + b² = c²
(-4)² + 5² = c²
16 + 25 = c²
c² = 41
c = √(41)
Now we can use the fact that secant is the reciprocal of cosine:
sec(θ) = 1 / cos(θ)
cos(θ) = adjacent / hypotenuse
cos(θ) = -4 / √(41)
cos(A) = adjacent / hypotenuse
cos(A) = 4 / √(41)
sec(θ) sec(A) = (1/cos(θ))(1/cos(A))
sec(θ) sec(A) = (√(41) / -4)(√(41) / 4)
sec(θ) sec(A) = (41 / 16)
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WILL GIVE BRAINLEST
(dont worry about the name just put joe for the name)
1. Answer the following questions.
Questions
What is an amount between $2 and $10? (A) __________
What is an amount between $10 and $20? (B) __________
What is an amount greater than $50? (C) __________
What is your name? (D) ____________________
What is the name of an item that you will buy only once? (E) ____________________
What is the name of an item that you will buy more than once? (F) ____________________
2. Create a word problem that leads to an inequality by filling in the blanks with your corresponding answers.
Word Problem
(D) ____________________ is going shopping for (E) ____________________ and (F) ____________________. The cost of (E) ____________________ is (B) __________ and the cost of each (F) ____________________ is (A) __________.
If (D) ____________________ can spend at most (C) __________, how many (F) ____________________ can be purchased?
3. Write an inequality of the form Ax + B ≤ C to represent the word problem using your answers for A, B, and C. Solve the inequality and show your work.
4. Graph the solution to your inequality on a number line or describe, in words, how to graph the inequality on a number line.
5. Explain what the solution means in the context of the word problem.
The questiοn is an illustratiοn οf inequalities and mathematical οperatiοns the amοunt between $2 and $10 is $8.
The amοunt between $10 and $20 is $10
$100 is greater than $50
What is inequality?In mathematics, an inequality is a cοnnectiοn that is nοt equal between twο expressiοns οr values. Cοnsequently, imbalance leads tο inequity. In mathematics, an inequality cοnnects twο unrelated values. Inequality is distinct frοm equality. When twο values are nοt equal, the nοt equal sign is mοst usually used ().
Variοus inequalities are emplοyed tο cοntrast values, nο matter hοw small οr huge. Many basic inequalities can be sοlved by altering the twο sides until the variables are all that remain. Yet, a variety οf factοrs cοntribute tο inequality: Negative values οn bοth sides are split οr added. Trade οff the left and right.
(a) Amοunt between $2 and $10.
The amοunt is calculated as:
Hence, the amοunt between $2 and $10 is $8
(b) Amοunt between $10 and $20.
The amοunt is calculated as:
Hence, the amοunt between $10 and $20 is $10
(c) Amοunt greater than $50.
An amοunt greater than $50 is an amοunt that have an higher value.
Take fοr instance: $100
$100 is greater than $50, because it has a higher value.
There is nο enοugh infοrmatiοn tο sοlve the οther questiοns
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help me pleasee still stuck
Answer:
90*
Step-by-step explanation:
Answer: 90 degrees
Step-by-step explanation:
Not sure what its asking but x is at the angle part which is definitely 90 degrees
If f (x)=5x^3−44x^2 −13+36f(x)=5x 3 −44x 2 −13x+36 and x−9 is a factor of f (x), then find all of the zeros of f (x) algebraically.
On solving the above question, As a result, the polynomials f(x) zeros are x = 9 and x = 44/5.
what are polynomials?A polynomial is a mathematical statement composed of coefficients and variance that exclusively uses additions, subtractions, operations such as addition, and nonzero powers of variables. The form x2 4x + 7 indicates a single determinate x algebraic. A polynomial expression in mathematics is made up of determinants (also known as freshly made) and polynomials that may be multiplied, subtracted, repeated, and raised through negative integer ones of – anti. A polynomial is an algebraic statement that includes variables and coefficients. An expression can really only incorporate the operations addition, deletion, duplication, and non-negative integer factors. These expressions are referred to as polynomials.
If x - 9 is a factor of f(x), we get:
f(x) = (x - 9)g(x) (x)
g(x) denotes a polynomial.
When we plug this into the supplied f(x) equation, we get:
5x^3 - 44x^2 - 13x + 36 = (x - 9)g (x)
Using polynomial long division to expand the right side, we get:
x(g(x)) = 5x3 - 44x2 - 13x + 36 - 9g(x) (x)
When we multiply the coefficients of similar terms on both sides, we get:
5 = g(x) (x)
-44 = g'(x) (x)
-13 = g''(x) (x)
36 = -9g''(x) (x)
When we solve these equations, we get:
5 g'(x) = -44 g"(x) = -13/2 g"'(x) = -12
Hence, g(x) is a constant function, and g'(x) = -44 suggests that x = 44/5 is the sole real root of g(x).
As a result, the f(x) zeros are x = 9 and x = 44/5.
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Una congeladora industrial se mantiene a -8°C. Si de pronto aumenta su
temperatura en 5°C, ¿cuál es su nueva temperatura?
La nueva temperatura de la congeladora industrial es de -3°C.
Si una congeladora industrial se mantiene a -8°C y aumenta su temperatura en 5°C, podemos encontrar su nueva temperatura sumando -8°C y 5°C:
-8°C + 5°C = -3°C
Por lo tanto, la nueva temperatura de la congeladora industrial es de -3°C.
La temperatura es una magnitud física que mide el grado de calor o frío de un objeto, sustancia o ambiente. Esta magnitud está relacionada con la energía cinética promedio de las moléculas que componen el objeto o sustancia, y se expresa en unidades de medida como grados Celsius (°C), grados Fahrenheit (°F) o kelvin (K).
Es importante tener en cuenta que una temperatura de -3°C sigue siendo fría, pero es importante asegurarse de que la congeladora se mantenga a la temperatura adecuada para preservar los alimentos y evitar su descomposición.
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