Answer:
angle sum of a triangle’Formula
Step-by-step explanation:
N stands for the number of edges, - 2 is the result after finishing, 2 has no special significance. Because the sum of outer angles is a constant n-edge shape with 360 degrees, take n flat angles 180n = inner angle and + 360, so the sum of inner angles = 180n-360 = 180 (n-2)
That formula tells you what is the sum of the interior angles of a polygon with n sides.
So, for example, a triangle has n=3 sides, and in fact the sum of its interior angles is
[tex](3-2)\cdot 180=180[/tex]
As another example, the sum of the interior angles of a polygon with 15 sides is
[tex](15-2)\cdot 180=13\cdot 180=2340[/tex]
what is 8x+4y=24 in slope intercept form.
Answer:
Slope: 2y- int: −6
Explanation:
We can easily find the slope and
y -intercept of this line by converting it to slope intercept form
y=mx + b, with slope m and a
y- intercept of b.
Let's subtract
8x
from both sides to get
−4y=−8x+24
Next, we divide all terms by
−4 to get y=2x−6
Now that our equation is in this form, we see that our slope is
2, and our y -intercept is −6.
-Hope this helps you
It costs $3 per hour to park in a parking lot, with a maximum cost of $12.
Explain why the amount of time a car is parked is not a function of the parking cost
Answer:
It is not a function because there is a maximum.
Step-by-step explanation:
With 12 as the maximum it will not go on forever and functions do.
The amount of time a car is parked is not a function of parking cost since the cost of parking cannot exceed the maximum amount of $12 no matter how long the car is parked in the lot.
Given:
the rate of cost of parking in a lot, R = $3 per hour
maximum cost of parking in a lot, C = $12
To explain:
why the amount of time a car is parked is not a function of the parking costThe cost of parking in a lot can be calculated as;
Cost = cost rate x time
let the time = t
Cost = 3t
When time, t = 1 hourCost = 3 x 1 = $3
When time, t = 2 hoursCost = 3 x 2 = $6
When time, t = 3 hoursCost = 3 x 3 = $9
When time, t = 4 hoursCost = 3 x 4 = $12
When time, t = 5Cost = 3 x 5 = $15
(notice, $15 has exceeded $12, but the maximum cost has to be $12)
Thus, time is not a function of cost of parking since the maximum cost cannot exceed $12 no matter how long the car is parked in the lot.
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Find all values of x such that [tex]\sqrt{4x^2} -\sqrt{x^2}= 6[/tex]
Please help me I will give brainliest !
Fully answer the question below.
Hello,
Much love for using Brainly Today.
We need to simplify the fraction, once done you solve it from there. It's the main step, when you're done figure out who made a mistake (if someone does) and fix it.
Here's a reminder on how to simplify a fraction,
Find a common factor of the numerator and denominator. A common factor is a number that will divide into both numbers evenly. Two is a common factor of 4 and 14.
Divide both the numerator and denominator by the common factor.
Repeat this process until there are no more common factors.
The fraction is simplified when no more common factors exist.
Another method to simplify a fraction
Find the Greatest Common Factor (GCF) of the numerator and denominator
Divide the numerator and the denominator by the GCF
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Have an amazing day!
Line segment Y A is an altitude of ΔXYZ. What is the length of Line segment Y A?
5 StartRoot 3 EndRoot units
10 StartRoot 3 EndRoot units
15 units
20 units
Answer:
A on edge
Step-by-step explanation:
Answer:
Plug in the Pythagorean Theorem and you get 5[tex]\sqrt{3}[/tex]
Step-by-step explanation:
We know that 5 is half of ten, so square those two.
a+25=100
a=75
[tex]\sqrt{75}[/tex]=5[tex]\sqrt{3}[/tex]
The answer is A, 5[tex]\sqrt{3}[/tex].
Hope this helps :)
Given that x=-1+4i is a zero of f (x)= x^3+x^2+15x-17 find all the zeroes of f
Answer:
All the zeroes of f(x) are x = 1, x = -1 + 4i and x = -1 - 4i.
Step-by-step explanation:
Given that f(x) = x³ + x² + 15x - 17
Now, we have to find all the zeroes of the function.
Given that x = - 1 + 4i is a zero of the function.
So, x = - 1 - 4i must be another zero of the function.
Therefore, (x + 1 - 4i)(x + 1 + 4i) will be factor of the function.
Hence, (x + 1 - 4i)(x + 1 + 4i)
= x² + 2x + (1 - 4i)(1 + 4i)
= x² + 2x + [1² - (4i)²]
= x² + 2x + 17
Assume that (x + a) is another factor of f(x).
Therefore, we can write f(x) = x³ + x² + 15x - 17 = (x + a)(x² + 2x + 17)
⇒ x³ + x² + 15x - 17 = x³ + (a + 2)x² + (2a + 17)x + 17a
Hence, comparing the coefficients we can write
a + 2 = 1
⇒ a = -1
Therefore, f(x) =x³ + x² + 15x - 17 = (x - 1)(x² + 2x + 17)
So, all the zeroes of f(x) are x = 1, x = -1 + 4i and x = -1 - 4i (Answer)
Find two consecutive odd integers such that 87 more than the lesser is six times the greater.
Final answer:
To find two consecutive odd integers, we can set up an equation based on the information given and solve for the variables. In this case, the lesser integer is 15 and the greater integer is 17.
Explanation:
To find two consecutive odd integers, let's represent the lesser integer as 'x' and the greater integer as 'x+2'. According to the given information, 87 more than the lesser integer is six times the greater integer. Mathematically, we can represent this as: x + 87 = 6(x+2).
To solve this equation, we can simplify and solve for 'x': x + 87 = 6x + 12. Simplifying further, we get 5x = 75, which leads to x = 15. Therefore, the lesser integer is 15 and the greater integer is 17.
what pattern do you notice in the placement of the decimal point when multiplying 0.36 by 10 and by 100
Answer:
The pattern is that the decimal point moves the same number of decimal points to the right as zeros the power of ten has.
Step-by-step explanation:
To multiply a decimal number by a power of ten (such as 10, 100, 1,000, etc.), count the number of zero in the power of ten. Then go to the right the decimal point the same number of positions.
For example, 0.36 * 10 = 3.6. The multiplier 10 has one zero, so you move the decimal point in 0.36 one position to the right to get the product 3.6.
A second example, 0.36 * 100 = 36. The multiplier 100 has two zeros, so you move the decimal point in 0.36 two positions to the right to get the product 36.
So, the pattern is that the decimal point moves the same number of decimal points to the right as zeros the power of ten has.
Answer:
To multiply a decimal number by a power of ten (such as 10, 100, 1,000, etc.), count the number of zero in the power of ten. Then go to the right the decimal point the same number of positions.
Step-by-step explanation:
is this a function ? helpppp
Answer:
yes
Step-by-step explanation:
In order to be a function, x values should not be repeated.
For example. (0,2) and (2, 2) would work.
(0,2) and (0,8) would not because there are two values for 0.
In this case, each x-value (0, 2, 7, and 9) are only used once so it is a function
Answer:
yes
Step-by-step explanation:
For this relation to be a function
Each value of x from the domain ( values on left ) must map to exactly one value of y in the range ( values on right )
Here
0 → 11
2 → 9
7 → 4
9 → 2
This is the case here thus represents a function
a base ball pitcher won 80% of the games he pitched. if he pitched 35 ball games how many games did he win?
Answer:
He has won 28 games.
Step-by-step explanation:
Since he wins 80% of the games he pitched, we need to find 80% of 35.
80% as a decimal is 0.8.
[tex]0.8 * 35 = 2.8[/tex]
Now we need to convert the product to a whole number.
[tex]2.8 * 10= 28[/tex]
80% of 35 is 28.
The baseball player won 28 games he pitched in.
The baseball pitcher won 28 games out of the 35 games he pitched by calculating 80% of the total games pitched.
To calculate how many games a baseball pitcher won after knowing he won 80% of the 35 games he pitched, you can use a simple percentage calculation. First, convert 80% to a decimal by dividing 80 by 100, which equals 0.80. Then, multiply the total number of games (35) by 0.80 to find out the number of games won:
Number of games won = Total games pitched imes Win percentage
Number of games won = 35 imes 0.80 = 28
So, the pitcher won 28 games out of the 35 games he pitched.
You estimate that a tree is 45 ft tall. It is actually 58 ft tall.
The percent error in estimating the tree's height is 22%.
To find the percent error, follow these steps:
Calculate the absolute error: Absolute error = |actual value - estimated value|
In this case, absolute error = |58 ft - 45 ft| = 13 ft.
Calculate the percent error: Percent error = (absolute error / actual value) * 100%
Percent error = (13 ft / 58 ft) * 100% ≈ 22.41%
Round to the nearest percent: Round 22.41% to the nearest integer, resulting in 22%.
Therefore, the percent error in estimating the tree's height is 22%.
Complete question:
Find the percent error in each estimation. Round to the nearest percent.
You estimate that a tree is 45 ft tall. It is actually 58 ft tall.
The side lengths of the Australian flag are in a ratio of 1:2. If the flag is 5 feet long, what is it’s height?
height:length
1:2
x feet: 5 feet
You know the length and the ratio of the dimensions. From the ratio you know that the length is twice the height. So height = 5/2 = 2.5 ft.
Z3
26. The entrance of the old town library is 2.3 feet
above ground level. A ramp from the ground
level to the library entrance is scheduled to be
built. The angle of elevation from the base of the
ramp to its top is to be 15º. Find the length of
the ramp.
The length of ramp is 8.9 meters approximately.
Solution:Given that, the entrance of the old town library is 2.3 feet above ground level.
A ramp from the ground level to the library entrance is scheduled to be built.
The angle of elevation from the base of the ramp to its top is to be 15º
We have to find the length of the ramp.
Let the length of ramp be “n” feet.
Now, if we observe there forms a right angle triangle with ramp as hypotenuse and height of entrance as opposite side for angle of elevation 15 degrees.
The diagram is attached below
In the figure,
AC = length of ramp
AB = height above ground level = 2.3 feet
angle of elevation = 15 degree
Then, we know that,
[tex]\sin \theta=\frac{\text {opposite side}}{\text {hypotenuse}}[/tex]
where θ is angle of elevation.
[tex]\begin{array}{l}{\sin 15^{\circ}=\frac{2.3 \text { feet }}{n \text { feet }}} \\\\ {\rightarrow 0.2588=\frac{2.3}{n}} \\\\ {\rightarrow n=\frac{2.3}{0.2588}} \\\\ {\rightarrow n=8.8865}\end{array}[/tex]
Hence, the length of the ramp is 8.9 meters approximately.
If you can, please explain the step by step process to finding the answer.
Answer:
20% peanuts are there in the mixture of nuts.
Step-by-step explanation:
Total weight of the mixture =25 lbs(10+15)
In the 25 lbs mixture of nuts, 68 % is peanuts, therefore finding the total weight of peanuts.
68 % of 25 lbs= 17 lbs.
There is a total 17 lbs of peanuts in the mixture .
15 lbs of peanuts was exclusively added, therefore the rest 2 lbs must have come from the mixture of nuts.
Therefore, there is a total of 2 lbs of peanuts in 10 lbs of mixture of nuts.
[tex]\frac{2}{10} *100[/tex] =20 %
20% peanuts are there in the mixture of nuts.
Terms that have the same variables with the same exponents on the variables are called?
Answer: Like terms
Example: 7x+9x are like terms because they both have an x with the same exponent of 1. We can combine them to get 7x+9x = 16x. This is like saying you have 7 boxes and you add on 9 boxes to get a total of 16 boxes.
Like terms are terms that have the identical variables and exponents. They can be combined or simplified in an expression. An example of like terms is 3x2 and 2x2 in the expression 3x2 + 2x2.
Explanation:Terms that have the same variables with the same exponents on the variables are called like terms. In other words, like terms can be combined together because they have identical variable parts. For instance, in the expression 3x2 + 2x2, 3x2 and 2x2 are like terms because they both contain the variable x raised to the power of 2. Therefore, they can be simplified or added together, resulting in 5x2.
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Plzzzzzz help me plz plz plz plz plz
Answer: Dominant. The answer is dominant.
William has $22 to buy strings for his guitar. Each set of strings costs $4.
How many sets of strings can he buy? Do not include units in your answer.
Answer: 5
Step-by-step explanation:
5x4=20 and you cant have half a pack of strings so it 5 packs.
Goes through the given
point
Gven the lines below, create a line that is parallel, one that is perpendicular
and one that is neither
Line
Parallel Perpendicular
Nether
11. y = 3x4
= -10
12 2x-y=8
(1.3)
13 3x + 4y + 12=0
-3.5
14 y = 3
Creating parallel and perpendicular lines involves understanding that parallel lines share the same slope, while perpendicular lines have slopes that are negative reciprocals of each other. A line that is neither parallel nor perpendicular to a given line simply has a slope that does not meet these conditions.
Explanation:Given the lines in your question, you're asked to create a parallel, perpendicular, and neither parallel nor perpendicular line. Let's consider the first line: y = 3x.
1) A line parallel to y = 3x will have the same slope, so the equation of such a line can be y = 3x + b. You can choose any value for b, as it shifts the line up or down but doesn't change its slope.
2) A line perpendicular to y = 3x would have a slope that is the negative reciprocal of 3, which is -1/3. So, such a line can be represented by the equation y = -1/3x + b. Again, any value of b will work.
3) A line that is neither parallel nor perpendicular to y = 3x could have any slope that's not equal to 3 or -1/3. For instance, the line y = 2x + b is neither parallel nor perpendicular to y = 3x.
Do the same for all the remaining lines by understanding these principles.
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What is the value of 27*3. State in the form of an equation.
Answer:
81
Step-by-step explanation:
An airplane traveling 245 m/s east experiences turbulence, so the pilot slows down to 230 m/s. It takes the pilot 7
seconds to slow down to this speed. What is the acceleration of the plane? Round your answer to the nearest
hundredth
2.14 m/s2
-2.14 m/s2
67.86 m/s2
-67.86 m/s2
The acceleration rounded off to the nearest 100th is: -2.14 m/s^2
Step-by-step explanation:
Acceleration can be defined as the change in velocity over time.
The acceleration is negative in case of slowing down as the velocity goes from a higher value to lower value.
The formula for acceleration is:
[tex]a=\frac{Change\ in\ velocity}{time}\\a=\frac{v_f-v_i}{t}\\Here,\\v_f\ is\ final\ velocity\\v_1\ is\ initial\ velocity\\t\ is\ time[/tex]
Given
v_f = 230 m\s
v_i = 245 m\s
t = 7
Putting the values
[tex]a=\frac{230-245}{7}\\=\frac{-15}{7}\\=-2.14\ ms^{-2}[/tex]
Hence,
The acceleration rounded off to the nearest 100th is: -2.14 m/s^2
Keywords: Velocity, Acceleration
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Mary sent out invitations to her wedding last week. The invitations were heavy, so put more than just one stamp on each envelope. She use 255 stamps and mailed out 85 invitations. If she used an equal amount of stamps on each envelope, how many stamps did she place on each envelope?
Answer:
she used 3 on each
Step-by-step explanation:
255/85=3
Julie’s cell phone is 9 centimeters long. How many millimeters long is her cell phone?
Answer: 90 millimeters
Step-by-step explanation: To convert centimeters to millimeters, multiply centimeters by 10. 9x10=90.
Three more than the quotient of a number and 8 is equal to 7 .
Step-by-step explanation:
"Three more than" means +3"Quotient" means dividing, its asking for x ÷ 8And it says the answer is equal to 7Your equation is:
[tex] \frac{x}{8} + 3 = 7[/tex]
Subtract 3 on both sides and get:[tex] \frac{x}{8} = 4[/tex]
Multiply both sides by 8 because you wanna get rid of the fraction:[tex]x = 32[/tex]
The student's question involves solving the algebraic equation x/8 + 3 = 7 to find the value of the unknown variable x. The solution to the equation is x = 32.
Explanation:The question asks us to solve an equation involving the unknown variable, which is a common type of problem in algebra. According to the question, 'Three more than the quotient of a number and 8 is equal to 7'. This can be translated into the equation x/8 + 3 = 7, where x is the number we are trying to find.
To solve for x, we need to isolate it on one side of the equation. We start by subtracting 3 from both sides of the equation:
x/8 + 3 - 3 = 7 - 3x/8 = 4Next, we multiply both sides of the equation by 8 to solve for x:
(x/8) × 8 = 4 × 8x = 32Therefore, the unknown number is 32.
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Steve, Jerry, and Ron were paid $29.25 to remove garden gnomes. They each worked four hours, except for Ron, who was 45 minutes late. How much of the $29.25 should Ron receive?
Ron worked for 3.25 hours and the total payment is $29.25 for 11.25 hours of combined work, which equates to an hourly wage of $2.60. Therefore, Ron should receive $8.45.
To calculate Ron's share of the $29.25 payment for removing garden gnomes, we first need to determine the total amount of time worked by all three individuals. Since Steve and Jerry worked 4 hours each and Ron was 45 minutes late, Ron worked 3 hours and 15 minutes, or 3.25 hours. We can convert 45 minutes to a decimal by dividing 45 by 60, which gives us 0.75, and since Ron was late by that duration, we subtract it from 4 hours (4 - 0.75 = 3.25).
Total hours worked by all = (Steve's hours + Jerry's hours + Ron's hours) = 4 + 4 + 3.25 = 11.25 hours.
To find the hourly rate, we divide the total payment by the total hours worked: $29.25 / 11.25 hours = $2.60 per hour. Finally, we multiply Ron's hours worked by the hourly rate to find his share: 3.25 hours * $2.60 per hour = $8.45.
mike, paul, and charlie went fishing. Everyone caught salmon and pike. Mike caught 1 pike and 4 salmon; Charlie caught 5 pike and 2 salmon. Paul caught half the number of pike that both Charlie and Mike caught combined, and 1 less salmon than Charlie caught. How many of each kind of fish did Paul catch? what was the total number of fish the three boys caught?
Paul caught 3 pike and 1 salmon
The total number of fish the three boys caught is 16
Solution:
According to question,
Mike caught 1 pike and 4 salmon
Charlie caught 5 pike and 2 salmon
Paul caught half the number of pike that both Charlie and Mike caught combined, and 1 less salmon than Charlie caught
Pike caught by Paul = half of number of pike that both charlie and mike caught combined = [tex]\frac{1}{2} (5 + 1) = 3[/tex]
Salmon caught by Paul = 1 less salmon than Charlie caught = 2 - 1 = 1
Thus, Paul caught 3 pike and 1 salmon
Total of numbers Pike caught by three boys are
5 + 1 + 3 = 9 pikes
Total of numbers salmon caught by three boys are
4 + 2 + 1 = 7 salmons
Hence , the total number of fish caught are
9 + 7 = 16 fishes
The solution to 2X -2+5 = 13 is
Answer:
Step-by-step explanation:
2x -2+5=13
2x +3 =13
2x = 13-3
2x = 10
x = 10/2
x = 5
Find the Vertex of the function glven below?
y = x^2-4x+1
Answer:
The vertex of the function is (2, -3).
Step-by-step explanation:
Given:
[tex]y=x^{2}-4x+1[/tex]
So, to find the vertex of the function we will get the equation in the form:
[tex]y=ax^{2} +bx+c[/tex]
[tex]y=1x^{2}+(-4)x+1[/tex]
So, [tex]a=1,b=-4,c=1[/tex]
Then, we calculate the x-coordinate of the vertex:
[tex]x=\frac{-b}{2a}[/tex]
[tex]x=\frac{-(-4)}{2\times1}\\x=\frac{4}{2}[/tex]
[tex]x=2[/tex]
And now, we get the [tex]y[/tex] value of vertex of the function:
[tex]y=1x^{2}-4x+1[/tex]
[tex]y=1\times 2^{2}+(-4)\times (2)+1[/tex]
[tex]y=1\times 4-8+1[/tex] (when the opposite signs multiply the result is negative)
[tex]y=4-8+1[/tex]
[tex]y=-3[/tex]
Therefore, the vertex is at [tex](x,y)=(2,-3)[/tex].
Wahab wants to donate at least $6000 in books and pairs of shoes. Let B represent the number of books and S represent the number of pairs of shoes that Wahab must donate to achieve his goal. 20B+50S≥6000. Wahab donates 100 pairs of shoes. What is the least number of books he should donate to achieve his goal?
Wahab has to donate at least 50 books to reach his goal
Solution:Given that, Wahab wants to donate at least $6000 in books and pairs of shoes.
Let "B' represent the number of books
Let "S" represent the number of pairs of shoes that Wahab must donate to achieve his goal.
20B+50S ≥ 6000 ⇒ this is the inequality for total donation.
Wahab donates 100 pairs of shoes.
Now, as he donated 100 pairs of shoes, S = 100, so substitute this in inequality.
20B + 50(100) ≥ 6000
20B + 5000 ≥ 6000
20B ≥ 6000 – 5000
20B ≥ 1000
B ≥ 50
Hence, wahab has to donate at least 50 books to reach his goal.
Which equations will help you solve this problem?
There are 25 lettuce plants. If you split them equally among 5 rows, how many lettuce plants are in each row?
Select the three correct equations below.
5 × ? = 25
25 ÷ 5 = ?
? ÷ 25 = 5
25 ÷ ? = 5
5 × 25 = ?
Final answer:
To solve the problem, three equations can be used: 25 ÷ 5 = ?, 5 × ? = 25, and 25 ÷ ? = 5.
Explanation:
The correct equations to help solve the problem are:
25 ÷ 5 = ?5 × ? = 2525 ÷ ? = 5To find the number of lettuce plants in each row, you need to divide the total number of lettuce plants, which is 25, by the number of rows, which is 5. So the first equation, 25 ÷ 5 = ?, will give you the answer. The second equation, 5 × ? = 25, can also be used to find the number of lettuce plants in each row by solving for the missing value. Finally, the third equation, 25 ÷ ? = 5, can be used as an alternative way to find the number of lettuce plants in each row.
Answer both with STEPS
Answer:
7 )
x = [tex]\frac{3\sqrt{2} }{2}[/tex]
[tex]y= 3[/tex]
8 )
[tex]x=6\sqrt{6}[/tex]
[tex]y= 9\sqrt{2}[/tex]
Step-by-step explanation:
7 ) 8)
In Δ ABC In Δ XYZ
∠ C = 45° ∠ X = 60°
∠ A = 90° ∠ Y = 90°
[tex]AC= \frac{3\sqrt{2} }{2}[/tex] [tex]XY= 3\sqrt{6}[/tex]
To Find :
x = ?
y = ?
Solution:
We Know
In Δ ABC
∠ C = 45°
∠ A = 90°
∴ ∠ B = 45° ......Angle sum property of a triangle i.e 180°
∴ Δ ABC is an Isosceles Triangle
∴ AC = AB = x = [tex]\frac{3\sqrt{2} }{2}[/tex]
Now appplying Trignometry identity we get
[tex]\sin C = \frac{\textrm{side opposite to angle C}}{Hypotenuse}\\\\\sin 45 = \frac{AC}{BC}\\\\\frac{1}{\sqrt{2} } =\frac{\frac{3\sqrt{2} }{2}}{y}\\\\y=\frac{3\times \sqrt{2}\times \sqrt{2} }{2}\\\\y= 3[/tex]
Now In Δ XYZ
∠ X = 60°
∠ Y = 90°
∴∠ Z = 30° . .....Angle sum property of a triangle i.e 180°
Now appplying Trignometry identity we get
[tex]\tan X = \frac{\textrm{side opposite to angle X}}{\textrm{side adjacent to angle X}}[/tex]
[tex]\tan 60 = \frac{YZ}{XY}\\\\\sqrt{3} =\frac{y}{3\sqrt{6} }\\ y= 3\sqrt{3} \sqrt{6} \\y= 9\sqrt{2}[/tex]
Now,
[tex]\sin X = \frac{\textrm{side opposite to angle C}}{Hypotenuse}\\\\\\\sin 60 = \frac{YZ}{XZ}\\ \\\frac{\sqrt{3} }{2} =\frac{9\sqrt{2} }{x} \\\\x=\frac{18\sqrt{2} }{\sqrt{3} } \\\textrm{after fationalizing the denominator root 3 we get}\\\\x=6\sqrt{6}[/tex]