Answer:
The given expression 3x2 -11(2y+1)+4 is a polynomial expression with two variables, x and y. It can be simplified by distributing the -11 to the terms inside the parentheses and combining like terms:
3x2 -11(2y+1)+4 = 3x2 -22y -11 +4
= 3x2 -22y -7
Therefore, the statement "the expression is a polynomial with two variables" is true, while the statements "the expression is in simplest form" and "the expression has a constant term of 11" are false.
Step-by-step explanation:
Question Content Area
At the beginning of the period, the Cutting Department budgeted direct labor of $37,260 and supervisor salaries of $43,370 for 4,140 hours of production. The department actually completed 4,500 hours of production.
Determine the budget for the department assuming that it uses flexible budgeting.
Answer:
To determine the flexible budget for the Cutting Department, we need to use the information provided to adjust the original budget for the actual level of production.
First, we need to calculate the variable cost per hour of production:
Variable cost per hour = Direct labor / Hours of production
Variable cost per hour = $37,260 / 4,140 hours
Variable cost per hour = $9
Next, we can use this variable cost per hour to calculate the flexible budget for the actual level of production:
Flexible budget = (Variable cost per hour x Actual hours of production) + Fixed costs
Flexible budget = ($9 x 4,500 hours) + $43,370
Flexible budget = $40,500 + $43,370
Flexible budget = $83,870
Therefore, the flexible budget for the Cutting Department, based on the actual level of production of 4,500 hours, is $83,870.
In a grocery store, a $12 case of soda is discounted 20%. How much will you save?
Answer: 9.60
Step-by-step explanation:
Labeled price = $ 12
Discount = 20% of labeled price = 12 x 20%
= 12 x 2 / 10 = 24 / 10 = $ 2.4
Sale price = Labeled price - Discount.
Sale price = $ 12 - $ 2.40 = $ 9.60
Thus the sale price of the case of soda is 9.60 $
A block of wood with dimensions 10 in. by 10 in. by 6 in. has a 2 in. by 2 in. square hole cut through the square face, as shown.
A top view of a square block shows the square face with sides 10 inches long. A square hole near the right side has sides 2 inches long. A side view shows that the square cut goes through the block, from the top face to the bottom.
Top View Side View
What is the volume of the resulting block of wood?
Responses
24 in3
24 in3
576 in3
576 in3
600 in3
600 in3
624 in3
624 in3
The volume of the resulting block of wood is 576 in³. The correct option is the second option 576 in³
Calculating the volume of the resulting block of woodFrom the question, we are to determine the volume of the resulting block of wood.
From the given information,
The dimensions of the block of wood is 10 in. by 10 in. by 6 in.
First, we will calculate the original volume of the block of wood.
The original block of wood has a volume of
V = 10 x 10 x 6
V = 600 in³
Now, we will determine the volume og the hole that was cut through
The dimensions of the hole is 2 in. by 2 in. by 6 in.
Volume of the hole = 2 x 2 x 6
Volume of the hole = 24 in³
The resulting block would have a volume of
Volume of resulting block = 600 - 24
Volume of resulting block = 576 in³
Hence, the volume is 576 in³.
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Help with math problems
Answer:
in absolute value you consider both the positive and negative side of the expression in the absolute bar.
The 12 students in the Environmental Club represent 2% of the students in the seventh grade. How many students are in the seventh grade?
Hence, in response to the provided question, we can say that Therefore equation there are 600 pupils in the seventh grade.
What is equation?An algebraic equation is a method of connecting two quotes by using the equals symbol (=) to express equality. In algebra, an explanation is a definitive expression that verifies the equivalency of two formula. For example, the identical character divides the numbers 3x + 5 and 14. A linear equation might be used to recognize the connection that existing between the texts written on separate sides of a letter. The product and application both frequently the same. 2x - 4 equals 2, for example.
Let's call the total number of pupils in the seventh grade "x".
We know that the 12 students in the Environmental Club account for 2% of the seventh-grade students, which means:
12 = 0.02x
To find x, we must isolate it on one side of the equation. This can be accomplished by dividing both sides by 0.02:
12 ÷ 0.02 = x
This boils down to:
600 = x
Therefore there are 600 pupils in the seventh grade.
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What is the value of the expression 9x^2−12x+4 when x=3?
Answer: 9·9 -36 +4.
Step-by-step explanation: 9x² -12x +4 for x=3. 9·3² -12·3 +4 = 9·9 -36 +4.
How to multiply polynomials
Answer:
To multiply polynomials, you can follow these steps:
Distribute each term of the first polynomial to each term of the second polynomial.
Combine like terms.
Simplify the resulting expression.
Here is an example:
(2x + 3)(x - 4)
Distribute:
2x(x - 4) + 3(x - 4)
Combine like terms:
2x^2 - 8x + 3x - 12
Simplify:
2x^2 - 5x - 12
So, (2x + 3)(x - 4) = 2x^2 - 5x - 12.
Step-by-step explanation:
Write the equation of the line that has a slope of 4 / 3 and passes through the point ( 0, - 3 ).
Answer: y = 4/3x -3
Step-by-step explanation:
Use the diagram below to answer the questions.
What are two other names for line WQ?
QW
What is another name for plane V?
What are three points that are collinear? What is a fourth point that is not collinear with those three points?
What is a point that is not coplanar with R, S, and T?
Answer:
Step-by-step explanation:
b-y=55
Describe the set of values that is greater than the quadratic function with zeros –5 and –13 and include the
point (–9, –32).
y>2(x+5)(x+13)
y>2(x−5)(x−13)
y≥- 8\77 (x+5)(x+13)
y≥- 8\77(x−5)(x−13)
The set of values that is greater than the quadratic function with zeros -5 and -13 and includes the point (-9, -32) is: y > 2(x+5)(x+13)
Define the term quadratic function?A quadratic function is a type of function in mathematics that can be represented by a quadratic equation, which is a polynomial equation of the second degree. It is an equation, for example, y = ax2 + bx + c, where a, b, and c are constants and x is the variable, that involves a variable raised to the power of two.
The factored form of the quadratic function with zeros -5 and -13 is as follows:
f(x) = a(x + 5)(x + 13)
where a is a constant.
Substituting the given point (-9, -32) into the quadratic function, we get:
-32 = a(-9 + 5)(-9 + 13)
-32 = -16a
a = 2
So, the quadratic function in factored form is:
f(x) = 2(x + 5)(x + 13)
we need to find the range of values that satisfy this inequality:
y > a(x + 5)(x + 13)
Therefore, the set of values that is greater than the quadratic function with zeros -5 and -13 and includes the point (-9, -32) is: y > 2(x+5)(x+13)
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Jenelle bought a home for $470,000, paying 18% as a down payment, and financing the rest at 5.4% interest
for 30 years. Round your answers to the nearest cent.
How much money did Jenelle pay as a down payment? $
What was the original amount financed? $
What is her monthly payment? $
If Jenelle makes these payments every month for thirty years, determine the total amount of money she
will spend on this home. Include the down payment in your answer. $
Video
Using percentage, we can find:
1- 84600
2- 385400
3- 20811.6
4- 7576776
What do you mean by percentage?A percentage's denominator, often referred to as a ratio's or a fraction's, is always 100. Sam, for instance, would have gotten 30 out of a potential 100 points if his math test score had been 30%. It is written as 30:100 in ratio form and 30/100 in fraction form. In this context, "%" is read as "percent" or "percentage" to represent a percentage. This percent symbol can always be converted to a fraction or decimal equivalent by "dividing by 100".
Now in the question,
Downpayment = 18% of 470000
= 84600
original amount financed =
470000-84600
= 385400
Monthly payment = 5.4% of 385400
= 20811.6
Total payment in 30 years = 7576776
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If the quotient of 3/8 and 1/4 is subtracted from the product of 2 1/4 and 1 1/7 what is the difference
Answer:
Step-by-step explanation:
(9/4 * 8/7) - (3/8*4/1) =
(72/28) - (12/8)
18/7 - 3/2
36/14 - 21/14
15/14 = 1 1/14
Solve for x. Round to the nearest tenth, if necessary.
x=
Step-by-step explanation:
For RIGHT triangles the cos of an angle = adjacent LEG / hypotenuse
so for THIS triangle cos 55° = x / 9.3
re-arrange to 9.3 * cos 55° = x
use calculator to find x = ~ 5.3 units (rounded)
Answer:
x = 5.3
Step-by-step explanation:
As triangle XYZ is a right triangle, and we have been given angle X, the side adjacent the angle, and the hypotenuse, we can use the cosine trigonometric ratio to solve for x.
[tex]\boxed{\begin{minipage}{9 cm}\underline{Cos trigonometric ratio} \\\\$\sf \cos(\theta)=\dfrac{A}{H}$\\\\where:\\ \phantom{ww}$\bullet$ $\theta$ is the angle. \\ \phantom{ww}$\bullet$ $\sf A$ is the side adjacent the angle. \\\phantom{ww}$\bullet$ $\sf H$ is the hypotenuse (the side opposite the right angle). \\\end{minipage}}[/tex]
Given:
θ = 55°A = xH = 9.3Substitute the given values into the formula and solve for x:
[tex]\implies \cos 55^{\circ}=\dfrac{x}{9.3}[/tex]
[tex]\implies x=9.3 \cos 55^{\circ}[/tex]
[tex]\implies x=5.3342608...[/tex]
[tex]\implies x=5.3\; \sf (nearest\;tenth)[/tex]
Therefore, the value of x is 5.3 to the nearest tenth.
can someone help?
Write an equation for the transformed logarithm shown below, that passes through (0,0) and (-5,3)
The equation for the logarithmic function that passes through (0,0) and (-5,3) is given as follows:
y = log2(-x + 1)
How to define the logarithmic function?First we must consider the vertical asymptote of the logarithmic equation, which is given as follows:
x = 1.
As the function is defined for the values to the left of the vertical asymptote, the function was reflected over the y-axis, hence:
y = logb(-x + 1) + d.
When x = -1, y = 1, hence we can have a logarithm of base 2 with a vertical shift of zero, hence:
y = log2(-x + 1)
Which is the logarithmic function for the function graphed in this problem.;
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quick Math Answer ok
Answer:
See below.
Step-by-step explanation:
For this problem, we are asked to find x, the hypotenuse.
There are a few ways to find the hypotenuse, but an easy way is to use the Pythagorean Theorem.
Represented as;
[tex]a^2 + b^2 = c^2\\(Short \ Leg)^2 + (Long \ Leg)^2 = (Hypotenuse)^2.[/tex]
We have 2 given values, the short leg and the long leg. We can begin solving for the hypotenuse.
Substitute:
[tex]40^2+42^2=c^2[/tex]
[tex]3364 = c^2[/tex]
Square Root the Equation:
[tex]\sqrt{3364} = \sqrt{c^2}[/tex]
[tex]c = 58.[/tex]
The Hypotenuse is 58. Our final answer is Letter D.
What is the perimeter and area of a right triangle, which has the measures of its sides, the horizontal 4m, the vertical 3m, and the diagonal 5m?
a) 12m and 6m²
b) 12m and 10m²
c) 21m and 21m²
d) 6m and 12m²
e) 6m and 7.5m²
Answer:
the answer is c because every side of a triangle sides are he same so c is your answer
PLS HURRY I AM GIVING BRAINLIEST!!!
the question is in the photo!!
1) The system of inequalities that models this scenario will be:
6x + 3y ≤ 24
6x + 3y ≥ 4
2)
i) the solution for y is y ≤ 5 - 2x.
ii) the solution for y is y ≥ 3 - x.
3) The graph is attached accordingly.
a)
Let's use the variables x and y to represent the number of Mickey pretzels and Mickey bars, respectively, that Mrs. Tobie can buy. We want to ensure that at least four children get one snack each, so the inequality for the total number of snacks should be greater than or equal to 4.
Also, Mrs. Tobie has a budget of S24, so the cost of the snacks should be less than or equal to S24. Putting these together, we get:
6x + 3y ≤ 24 (budget constraint)
6x + 3y ≥ 4 (at least four snacks)
So the system of inequalities that models this scenario is:
6x + 3y ≤ 24
6x + 3y ≥ 4
b)
To solve for y in each inequality, we need to isolate y on one side of the inequality sign.
For the first inequality, we have:
x + y ≥ 3
Subtracting x from both sides, we get:
y ≥ 3 - x
So the solution for y is y ≥ 3 - x.
For the second inequality, we have:
6x + 3y ≤ 15
Dividing both sides by 3, we get:
2x + y ≤ 5
Subtracting 2x from both sides, we get:
y ≤ 5 - 2x
So the solution for y is y ≤ 5 - 2x.
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Consider the function
f(t)=1−2t+4t2.
Give the largest value of t such that the percentage rate of change equals 100. Give your answer to one decimal place.
Answer:
The percentage rate of change of a function f(t) is given by:
(Δf / f) x 100
where Δf is the change in f and f is the original value of the function.
To find the largest value of t such that the percentage rate of change equals 100, we need to find the value of t for which:
(Δf / f) x 100 = 100
Simplifying, we get:
Δf / f = 1
This means that the change in f is equal to the original value of f.
So, we need to solve the equation:
f(t + Δt) - f(t) = f(t)
where Δt is the change in t.
Substituting the given function, we get:
[1 - 2(t + Δt) + 4(t + Δt)^2] - [1 - 2t + 4t^2] = 1 - 2t + 4t^2
Simplifying, we get:
-8tΔt + 8Δt^2 = 1
Since we are interested in the largest value of t, we can assume that Δt is a small positive number, such that Δt << t.
Ignoring the term Δt^2, we get:
-8tΔt = 1
Solving for Δt, we get:
Δt = -1 / (8t)
Substituting this value of Δt back into the equation -8tΔt + 8Δt^2 = 1, we get:
-8t(-1 / (8t)) + 8(-1 / (8t))^2 = 1
Simplifying, we get:
1 / t^2 = 1
Solving for t, we get:
t = 1
Therefore, the largest value of t such that the percentage rate of change equals 100 is t = 1.
In 1940, the average size of a privately owned farm in a particular country was 170 acres. In a recent year, the average size of a privately owned farm in the country had increased to 432 acres. What is this percent increase?
Answer:
154%
Step-by-step explanation:
First, we need to calculate the increase in size of the privately owned farm:
increase = new value - old value
increase = 432 - 170
increase = 262
Next, we can use the formula to calculate the percent increase:
percent increase = (262 / 170) x 100%
percent increase = 1.54 x 100%
percent increase = 154%
Therefore, the percent increase in the size of privately owned farms in the country is 154%.
ALGEBRA 1 HW!! I WILL GIVE BRAINLYEST
Answer: It looks like it could be III I'm not sure thought I hope it was right
Step-by-step explanation:
The length of a rectangle is 7 inches more than its width. The area of the rectangle is equal to 2 inches more than 2 times the perimeter. Find the length and width of the rectangle.
The width of the rectangle is x = 6 inches and the length of the rectangle is 13 inches.
What is area of a rectangle?The region contained inside the rectangle's perimeter is referred to as the area of the rectangle. In other terms, the area of a rectangle is the whole area that a rectangle encloses. Depending on the provided dimensions, this may be determined using the area of rectangle formula and a number of other techniques.
Let us suppose the width = x.
Then, length is given as:
l = x + 7
The area of the rectangle is:
A = lw
Substituting the values:
A = (x + 7)x
The perimeter of the rectangle is:
P = 2(l + w)
P = 2(x + 7 + x)
P = 2(2x + 7)
P = 4x + 14
Also, we have:
A = 2P
Substituting the values of area and perimeter:
4x + 14 = (x + 7)x
Simplifying the expression:
x^2 + 7x = 8x + 30
x^2 - x - 30 = 0
(x-6)(x+5) = 0
Since, width cannot be negative value we have:
x = 6.
l = 7 + 6 = 13 inches.
Hence, the width of the rectangle is x = 6 inches and the length of the rectangle is 13 inches.
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Please Help ASAP - 100 pts + Brainliest if the answer is correct!
The sum of the infinite geometric series is: ²/₅
How to find the sum of the infinite geometric series?The formula for the sum of an infinite geometric series is;
[tex]S_{\infty} = \frac{a}{1 - r}[/tex]
where;
a is first term
r is common ratio
The first term is; a = ⁴/₁₅
Common ratio; r = ⁴/₉ ÷ ⁴/₁₅ = ⁵/₃
r = ²⁰/₂₇ ÷ ⁴/₉ = ⁵/₃
Thus;
[tex]S_{\infty}[/tex] = ⁴/₁₅ ÷ (⁵/₃ - 1)
[tex]S_{\infty}[/tex] = ⁴/₁₅ ÷ ²/₃
= ²/₅
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Answer:
How to find the sum of the infinite geometric series?The formula for the sum of an infinite geometric series is;S_∞ = a/(1 - r)where;a is first termr is common ratioThe first term is; a = 4/15Common ratio; r = (4/9)/(4/15) = 5/3r = (20/27)/(4/9) = 5/3Thus;S_∞ = (4/15)/((5/3) - 1)S_∞ = (4/15)/(2/3) = 2/5
PLEASE HELP
I bought a pie. It cost somewhere between £1.30 and £2.99. I gave a 24% tip, and the total price was still an exact number of a pence. When I paid with a £5 note I received five coins in my change (the fewest I could have been given for that amount). What were the two possible amounts of change I could have been given?
The two possible amounts of change are 3 x £1 + 1 x 50p + 1 x 10p and 3 x £1 + 1 x 20p + 1 x 10p + 1 x 5p, which simplify to £3.60 and £3.25 respectively.
What is combination ?
Combination refers to the number of ways a selection of items can be made from a larger set of items without regard to their arrangement. In other words, combinations are a way to calculate the total number of possible groups of items that can be formed, regardless of the order in which the items are selected. The formula for calculating the number of combinations is nCr, where n is the total number of items and r is the number of items being selected.
According to the question:
Let's start by finding the possible prices of the pie. Since the price must be an exact number of pence, we can convert the price range to pence by multiplying each value by 100:
£1.30 = 130 pence
£2.99 = 299 pence
We know that the price plus the 24% tip must be an exact number of pence. If we let x be the price of the pie in pence, then we can write this as:
x + 0.24x = 1.24x
Since 1.24 is not divisible by 5 (which we'll need for the change), we need to find two values of x that differ by a multiple of 5. One way to do this is to start with the lower bound and add multiples of 5 until we get a valid value:
x = 130: 1.24x = 161.2
x = 135: 1.24x = 167.4
x = 140: 1.24x = 173.6 (valid)
x = 145: 1.24x = 179.8
x = 150: 1.24x = 186.0 (valid)
x = 155: 1.24x = 192.2
x = 160: 1.24x = 198.4
So the possible prices of the pie are 140p and 150p. To find the possible amounts of change, we need to subtract each price from 500p (the value of the £5 note) and express the result as a combination of coins. For example:
Price = 140p, change = 360p = 3 x £1 + 1 x 50p + 1 x 10p
Price = 150p, change = 350p = 3 x £1 + 1 x 20p + 1 x 10p + 1 x 5p
Therefore, the two possible amounts of change are 3 x £1 + 1 x 50p + 1 x 10p and 3 x £1 + 1 x 20p + 1 x 10p + 1 x 5p, which simplify to £3.60 and £3.25 respectively.
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Use the graphs of f and g to find (fg)(−2).
In this the point (-2,3) on the graph of f multiplied by the corresponding point (-2,2) on the graph of g yields the product (-2,6), which is equal to -8.
What is a coordinate plane?A coordinate plane is a two-dimensional surface composed of two number lines, one horizontal (x-axis) and one vertical (y-axis). It is used to graph points, lines, and other shapes. Each point is identified by a pair of numbers which indicate its position along the x and y axes. The x and y axes intersect at the origin and divide the plane into four quadrants.
The graph of fg can be found by first graphing both f and g on the same coordinate plane. From there, the graph of fg can be found by taking each point on the graph of f and multiplying it by the corresponding point on the graph of g. In this example, the point (x,y) on the graph of f is multiplied by the corresponding point (x,y) on the graph of g to form a new point (x,yz). This new point is then placed on the graph of fg.
Using the graphs of f and g provided, we can determine that (fg)(-2) = -8. To find this, first locate the point (-2,3) on the graph of f. Then, locate the corresponding point (-2,2) on the graph of g. The product of these two points is (-2,6). This means that (fg)(-2) = -8.
In summary, to find (fg)(-2) using the graphs of f and g, first graph both f and g on the same coordinate plane. Then, take each point on the graph of f and multiply it by the corresponding point on the graph of g. In this example, the point (-2,3) on the graph of f multiplied by the corresponding point (-2,2) on the graph of g yields the product (-2,6), which is equal to -8.
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The attendance at a concert was 335. Admission was $2.50 for adults and $1.25 for children. The receipts were $675. How many adults and children attended the concert? (Show steps)
In response to the question, we may say that 205 adults and 130 kids equation respectively attended the concert, for a total of 205 adults and 130 kids.
What is equation?The equals symbol (=), which indicates equivalence, connects two statements in a mathematical equation. An algebraic equation's mathematical assertion proves the equality of two mathematical propositions. The equal sign, for instance, places a gap between the numbers 3x + 5 and 14 in the equation 3x + 5 = 14. Use a mathematical formula to understand how the two sentences on opposite sides of a letter relate to one another. Usually, the logo corresponds to the particular programmed. An example would be 2x - 4 = 2.
Assume that "x" represents the proportion of adults who attended the performance and "y" represents the proportion of children.
The problem statement informs us that:
x + y = 335 —-(1) (1) (There are 335 persons present in all.)
The total amount of money gathered is $675 (2.5x + 1.25y).
1.25x + 1.25y = 418.75 —-(3) (3)
2.5x - 1.25x = 675 - 418.75
1.25x = 256.25
x = 205
205 + y = 335
y = 130
205 adults and 130 kids respectively attended the concert, for a total of 205 adults and 130 kids.
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Find the values of x and y. Write your answers in simplest form.
Answer:
y = 4
x = 4√2 or 5.66
Step-by-step explanation:
If the △ is a right △ with 1 angle 45o, then the other angle is also 45o. This △ will be isosceles right triangle with y = 4
Pythagorean theorem: c^2 = a^2 + b^2
x^2 = y^2 + 4^2
x^2 = 4^2 + 4^2
x^2 = 32
x = √32 = 4√2 = 5.66
Find an equation of the ellipse that has center (-1,-5) , a minor axis of length 2, and a vertex at (5,-5).
According to the given conditions, the equation of the ellipse is [tex]{\frac{(x+1)^2}{25}+(y+5)^2=1}$.[/tex]
What is equations ?An equation is a mathematical statement that shows the equality between two expressions. In other words, it is a way to describe a relationship between two or more variables or quantities.
According to given information :The center of the ellipse is (-1,-5), which means that the center of the ellipse is shifted from the origin. We can find the equation of the ellipse using the standard form equation:
[tex]$\frac{(x-h)^2}{a^2}+\frac{(y-k)^2}{b^2}=1$[/tex]
where (h,k) is the center of the ellipse, and a and b are the lengths of the semi-major and semi-minor axes, respectively.
Since the minor axis has length 2, we know that b=1. We also know that the vertex on the minor axis is (5,-5), which means that the semi-major axis has length 5. Therefore, a=5.
Substituting these values into the standard form equation, we get:
Simplifying, we get:
[tex]$\frac{(x+1)^2}{25}+(y+5)^2=1$[/tex]
Therefore, according to the given conditions, the equation of the ellipse is [tex]{\frac{(x+1)^2}{25}+(y+5)^2=1}$.[/tex]
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will give thanks
trig
The data in the triangle is not sufficient to find the asked values in the question.
Explain about the sine rule:The relationship in between sides and angles for non-right (oblique) triangles is known as the Law of Sines. It simply asserts that for all sides and angles of a given triangle, the ratio of the length of a side to the sine angle opposite this side is the same.
You must know between two angles but one side of the triangle (AAS or ASA) either two sides and an angle opposing one of them in order to employ the Law of Sines (SSA).
g/sinG = h/sinH = f/sinF
Where G, H and F are the angles and g, h and f are the angles' opposing sides.
Put the values:
g/sin136 = 13/sinH = 7/sinF
The three pairs of expression are-
HF/sin136 = 13/sinH ; 13/sinH = 7/sinF and g/sin136 = 7/sinF.
HF = 13*sin136/sinH
HF = 10.97/SinH
From the found 3 expression, each has two missing value.
Thus, the angles F and H is not possible to find.
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The average height of a boy in the United States, from birth through 60 months, can be modeled by y = 2.9square root of (x) + 20.1 where y is the average height, in inches, of boys who are x months of age. What would be the expected difference in height between a child 49 months of age and a child 16 months of age?
Answer:
Step-by-step explanation:
To find the expected difference in height between a child 49 months of age and a child 16 months of age, we need to first find the average height of each child and then find the difference between them.
For a child who is 49 months old, the average height can be found by substituting x = 49 in the given equation:
y1 = 2.9sqrt(49) + 20.1 = 42.7 inches
For a child who is 16 months old, the average height can be found by substituting x = 16 in the given equation:
y2 = 2.9sqrt(16) + 20.1 = 28.9 inches
Therefore, the expected difference in height between the two children would be:
y1 - y2 = 42.7 - 28.9 = 13.8 inches
So we can expect the child who is 49 months old to be, on average, 13.8 inches taller than the child who is 16 months old.
If two cards are chosen from a standard deck of cards one at a time and placed in your hands as you choose them, the probability of choosing a 7 and a jack is what?
As a result, the probability of selecting a 7 and a jack from a regular deck of cards, one at a time and without replacement, is about 0.006 or 0.6%.
What is probability?Probabilistic theory is a branch of mathematics that evaluates the probability of a certain occurrence or proposition occurring or being true. A danger is a number in the range between 0 and 1, whereas 1 signifies certainty and a probability of around 0 reflects how likely an event seems to be to occur. Probability seems to be a mathematical function for the likelihood or likelihood that a certain event will occur. Probabilities can also be expressed as numbers ranging from 0 to 1 or as percentages ranging from 0% to 100%. In relation to all other outcomes, the ratio of occurrences between equally as likely possibilities that result in a specific event.
The probability of selecting a 7 and a jack from a regular deck of cards, one at a time and without replacement, is as follows:
As a result, the odds of selecting a jack from the remaining cards are 4/51.
The product of these probabilities is the likelihood of selecting a 7 and a jack in sequence:
P(7) = P(7) x P(jack|7 not picked) = 4/52 x 4/51
When we simplify this expression, we get:
P(Jack and 7) = 16/2652
As a result, the likelihood of selecting a 7 and a jack from a regular deck of cards, one at a time and without replacement, is about 0.006 or 0.6%.
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