The solution to the linear equation is v = -36
How to solve the linear equation?
Here we have a simple linear equation:
v/3 + 3 = v/4
To solve this, we need to isolate the variable v.
First, let's move all the terms with "v" to the left and the terms without to the right side, so we get:
v/3 - v/4 = -3
Now we can solve this:
4v/12 - 3v/12 = -3
v/12 = -3
v = -3*12
v = -36
The solution to the linear equation is v = -36
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Christa had a music lesson every week for one year.
Each of the 52 lessons lasted for 45 minutes.
Calculate the total time that Christa spent in music lessons.
Give your time in hours.
Answer:
39 hours
Step-by-step explanation:
52 × 45 = 2340
2340 mins into hours = 39 hours
hope this helps :)
Trey Invested his savings in two Investment funds. The $12,000 that he invested in Fund A returned a 1% profit. The amount that he invested in Fund B returned a 6% profit. How much did he invest in Fund B, if both funds together returned a 3% profit?
The amount Trey invested in Fund B is $8,000.
Profit is a residual income, It is the gain amount from any kind of business activity. In short, if the selling price (SP) of the product is more than the cost price (CP) of a product, then it is considered as a gain or profit. while return is a total revenue. Profits may be negative, whereas returns, such as wages and interest are always positive.
amount invested in Fund A = $12,000 (given)
profit returned by Fund A = 1% of $12,000 (given)
= 1/100*$12,000
= $120
Let amount invested in Fund B = x (assumption)
profit returned by Fund B = 6% of x (given)
= 6/100*x
= $ 6x/100
Given that both funds A and B together returned a 3% profit, So the equation we get is
120+6x/100 = 3% of (12,000+x)
(12,000+6x)/100 = 3/100* (12,000+x)
12,000+6x = 3(12,000+x)
12,000+6x = 36,000+3x
6x-3x = 36,000-12,000 (bringing like terms on same side)
3x = 24,000
x = 24,000/3
x = $8,000
Therefore, we can conclude that the amount Trey invested in Fund B is $8,000
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Find the distance between the points. Give an exact answer and an approximation
to three decimal places.
(-1,-9) and (6, - 16)
The distance between the two points are-9.87 units.
What is referred as the distance formula?In coordinate geometry, we have a list of distance formulas that can be used to obtain the distance between two points, the distance between a point and a line, the distances between two vertical lines, this same distance between these two parallel planes, and so on.The Euclidean distance formula is another name for the distance formula used to calculate the distance between 2 points in a two-dimensional plane. Acknowledge two points in the 2D plane, A(x₁, y₁) and B, to derive the formula (x₂, y₂). Assume 'd' represents the distance from A to B.The distance formula is;
d² = (y₂ - y₁)² + (x₂ - x₁)²
Let the two given points be;
A(x₁, y₁) = (-1,-9)
B(x₂, y₂) = (6, - 16)
Put the values in the formula;
d² = (-16 + 9)² + (6 + 1)²
d² = (-7)² + (7)²
d² =2 (7)²
d = 7√2
d = 7×1.41
d = 9.87
Therefore, the distance between the two points is found as 9.87 units.
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The weight of an organ in adult males has a bell-shaped distribution with a mean of 340 grams and a standard
deviation of 35 grams. Use the empirical rule to determine the following.
(a) About 68% of organs will be between what weights?
(b) What percentage of organs weighs between 235 grams and 445 grams?
(c) What percentage of organs weighs less than 235 grams or more than 445 grams?
(d) What percentage of organs weighs between 270 grams and 375 grams?
According to the empirical rule, there are a answers of the given statement.
According to the statement
We have to find that the answers of the given statement.
So, For this purpose, we know that the
The empirical rule is a statistical rule which states that for a normal distribution, almost all observed data will fall within three standard deviations (denoted by σ) of the mean or average (denoted by µ).
From the given information:
The mean of 340 grams and a standard deviation of 35 grams.
Then
a) About 68% of organs weight between:
According to the empirical rule:
68% of the information values lie within 1 variance of the mean
95% of the info values lie within 2 variance of the mean
99.7% of the information values lie within 3 variance of the mean
Thus, 68% of the information values consist the range: Mean - 1 variance to Mean + 1 variance.
Using the values of Mean and variance, we get:
Mean - 1 variance = 320 - 20 = 300 grams
Mean + 1 variance = 320 + 20 = 340 grams
This means 68% of the organs will weigh between 300 and 340 grams.
And
b) In order to search out what percentage of organs weight between the given range, we'd like to seek out what proportion far these values are from the mean.
Since, mean is 320 and 280 is 40 but mean, we will write:
280 = 320 - 40
280 = 320 - 2(2)
280 = 320 - 2 Standard Deviations
Similarly,
360 = 320 + 40
360 = 320 + 2 Standard Deviations
So, we've got to inform what percentage of values lie within 2 variance of the mean. in step with the empirical law, this amount is 95%.
So, 95% of the organs weigh between 280 grams and 360 grams.
And
c) From the previous part we all know that 95% of the organs weight between 280 grams and 360 grams.
It is on condition that the distribution is bell shaped. the full percentage under a bell shaped distribution is 100%. So so as to calculate what proportion percentage of values are below 280 and above 360, we'd like to subtract the proportion of values that are between 280 and 360 from 100% i.e.
Percentage valuable outside the range = 100% - Percentage of values inside the range
So,
Percentage of organs weighs but 280 grams or over 360 grams = 100 - Percentage of organs that weigh between 280 grams and 360 grams
Percentage of organs weighs but 280 grams or quite 360 grams = 100% - 95% = 5%
So, 5% of the organs weigh but 280 grams or over 360 grams.
And
D) 300 is 1 variance below the mean and 360 is 2 standard deviations above the mean.
Previously it's been established that, 68% of the info values lie within 1 variance of the mean i.e
From 1 variance below the mean to 1 variance above the mean, the share of values is 68%. Since the distribution is bell shaped and bell shaped distribution is symmetric about the mean, therefore the percentage of values below the mean and above the mean must be the identical.
So, from 68% of the information values that are within 1 variance from the mean, 1/2 them i.e. 34% are 1 variance below the mean and 34% are 1 variance above the mean. Thus, percentage of values from 300 to 320 is 34%
Likewise, data within 2 standard deviations of the mean is 95%. From this half the information i.e. 47.5% is 2 standard deviations below the mean and 47.5% is 2 standard deviations above the mean. Thus, percentage of values between 320 and 360 grams is 47.5%
So,The total percentage of values from 300 grams to 360 grams = 34% + 47.5% = 81.5%
Therefore, 81.5% of organs weigh between 300 grams and 360 grams.
So, According to the empirical rule, there are a answers of the given statement.
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Can someone please help me. This is about indices
Answer:
x = 10/9
Step-by-step explanation:
Solve:
27^(3x-2) = 81
When solving equations in exponential form make sure the two bases on both sides are the same.
3^3(3x-2) = 3^4
Once the two bases are the same you cancel them out and used its exponent to solve the equation.
3(3x-2) = 4
9x-6 = 4
Add 6 to both sides.
9x-6+6 = 4+6
9x = 10
Divide both sides by 9.
x = 10/9
Therefore x = 10/9.
Using the pencil,plot the point (-3,-6)
Answer:
-3 will be on the -x axis n the -6 will be on the -y axis so both will meet at a point.
Step-by-step explanation:
that is all I understand am not sure if I am ryt
Evaluate the expressions when x = 3; y = 4 & z = -2
(x + y) * z, 2y + 3z + 4y - xz =
comma = separate
Answer:
Sub in the numbers given to x, y, z and use calculator to solve
-5/3,-2,-7/3,-8/3 arithmetic
Answer:
Step-by-step explanation:
comment on the comment section with a complete question I will help you there please
Two factory plants are making TV panels. Yesterday, Plant A produced 4 times as many panels as Plant B. Three percent of the panels from Plant A and 2% of the panels from Plant B were defective. How many panels did Plant B produce, if the two plants together produced 980 defective panels?
Answer:
7000 panels.
Step-by-step explanation:
Let x be the number of panels produced by Plant B.
Therefore:
4x = number of panels produced by Plant A.x = number of panels produced by Plant B.Given information:
Defective panels from Plant A = 3%Defective panels from Plant B = 2%Total number of defective panels = 980Create an equation with the given information and defined variables, remembering to write the percentages in their decimal form:
[tex]\implies 0.03(4x) + 0.02x = 980[/tex]
To find the number of panels Plant B produced, solve the found equation for x:
[tex]\implies 0.03(4x) + 0.02x = 980[/tex]
[tex]\implies 0.12x + 0.02x = 980[/tex]
[tex]\implies 0.14x = 980[/tex]
[tex]\implies \dfrac{0.14x}{0.14} = \dfrac{980}{0.14}[/tex]
[tex]\implies x=7000[/tex]
Therefore, Plant B produced 7000 panels.
How do you write 0.00007112 in scientific notation?
Answer:
7.112 x [tex]10^{-5}[/tex]
Step-by-step explanation:
You need to re-write the number so that it is 1 or larger but less than 10. To do that, we need to move the decimal 5 spaces to the right. The actually number is smaller. The [tex]10^{-5}[/tex] is telling me how much smaller the number actually is. To get the number in standard notation I would have to take 7.112 and divide it by 100,000.
Please help me with this question
Answer:
Step-by-step explanation:
f(x) = 1/x
Bob invested his savings in two investment funds. The amount he invested in Fund A was $8000 less than the amount he invested in Fund B. Fund A
returned a 2% profit and Fund B returned a 7% profit. How much did he invest in Fund B, if the total profit from the two funds together was $1730?
a = amount invested at 2%
how much is 2% of "a"? (2/100) * "a", namely 0.02a.
b = amount invested at 7%
how much is 7% of "b"? (7/100) * "b", namely 0.07b.
We know that fund A is less than fund B by 8000, that is a = b - 8000.
we also know that the yielded amount in interest is $1730, so if we simply add their interest, that'd be 0.02a + 0.07b = 1730.
[tex]\boxed{a = b - 8000} \\\\\\ 0.02a~~ + ~~0.07b~~ = ~~1730\implies 0.02(\stackrel{a}{b-8000})~~ + ~~0.07b~~ = ~~1730 \\\\\\ 0.02b-160+0.07b=1730\implies 0.02b+0.07b=1890\implies 0.09b=1890 \\\\\\ b=\cfrac{1890}{0.09}\implies \blacksquare~~ b=21000 ~~\blacksquare[/tex]
Which numbers are irrational?
A. √30
B. √16
C. √42
D. √169
Select all that apply.
In the figure, m ∠ 7 = 100 ° . Find the measure of ∠ 8 .
In the figure, m ∠ 7 = 100 °. The measure of angle 8 is 80°
What do you mean by an angle?An angle is a figure in the Euclidean geometry made up of two rays that share a common terminal and are referred to as the angle's sides and vertices, respectively. Angles created by the two rays are in the plane where the rays are located. The meeting of the two planes also creates angles. We refer to these as the dihedral angles. The angle formed by the rays lying perpendicular to the two crossing curves at the point of junction is another property of the intersecting curves.
Angle can also refer to length of a rotation or an angle. This metric represents relationship between a circular arc's length and radius. The arc is centered at the vertex and defined by sides in the case of a geometric angle. When there is a rotation, the arc is defined by any other point and rotation's image, and it is centered at the rotation's center.
Given,
∠7 = 100°
According to the given figure,
∠7+∠8= 180°
100°+ ∠8= 180°
∠8= 180°- 100° = 80°
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Can someone please break this down for me.
Answer:
length: 343 marea: 6418 m²Step-by-step explanation:
Given an oval track in the shape of a 48 m by 96 m rectangle with semicircular ends, you want the length of the track and the area enclosed.
Track LengthIf you remove the rectangle, you see that what remains is a circle of diameter 48. The length of that circular portion of the track is the circumference of the circle:
C = πd
C = π(48 m) = 48π m ≈ 151 m
Added to that length are the two 96 m sides of the rectangle. So, the total length of the track is ...
track length = curved length + straight length
track length = 151 m + 2×96 m = 343 m
The length of the track is 343 meters.
Enclosed areaThe area enclosed by the track includes the area of the circle we saw above, and the area of the rectangle.
The radius of the circular portion is half the diameter, or 24 m. Then the area is ...
A = πr²
A = π(24 m)² = 576π m² ≈ 1810 m²
The area of the rectangular portion is the product of length and width:
A = LW
A = (96 m)(48 m) = 4608 m²
The enclosed area is the sum of these areas:
enclosed area = area of circle + area of rectangle
enclosed area = 1810 m² +4608 m² = 6418 m²
The area enclosed by the track is 6418 square meters.
The length (perimeter) of the track is approximately equal to 342.796 meters and the area enclosed by the track is approximately equal to 6417.557 square meters.
What is the perimeter and the area enclosed by the track?In this problem we have a composite figure generated by a rectangle and two semicircles, of which we must determine its perimeter and area. The perimeter is the sum of the contour lengths of the semicircles and the rectangle and the enclosed area is the sum of areas of the two semicircles and a rectangle.
The perimeter of the composite figure is:
p = 2π · r + 2 · l
p = 2π · (24 m) + 2 · (96 m)
p ≈ 342.796 m
A = π · r² + l · (2 · r)
A = π · (24 m)² + (96 m) · (48 m)
A ≈ 6417.557 m²
The length (perimeter) of the track is approximately equal to 342.796 meters and the area enclosed by the track is approximately equal to 6417.557 square meters.
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You have four cards: Jack, Queen, King, and Ace. What is the probability of drawing a face card, not replacing it, and then choosing another face card?
Write in fraction form!
Step-by-step explanation:
if I understand you correctly, then we have the 4 described cards. 3 of these 4 cards are face cards (Jack, Queen, King).
a probability is always desired cases over totally possible cases.
so, for the first pull we have a probability of
3/4 = 0.75
we have 4 total possibilities, and 3 of them are the desired outcome.
for the second pull we have then only 3 cards left (we did not replace the first pulled card). and because the first pulled card was in this scenario a face card, 2 out of these 3 cards are face cards.
so, the probability to pull a face card here is
2/3 = 0.66666...
when we combine these 2 events into one connected event (we are creating event 1 AND event 2), we multiply the probabilities, giving us
3/4 × 2/3 = 6/12 = 1/2 = 0.5
If KL = 3, KM = 8, and MN = 24, what is LN?
Answer: LN=29
Step-by-step explanation:
LN=LM+MN
KM=KL+LM
KM-KL=KL-KL+LM
LM=KM-KL
LN=KM-KL+MN
LN=8-3+24
LN=5+24
LN=29
Sean mixes coconut oil with several other ingredients to make homemade toothpaste for his dog Rocky. He uses 1/2 cup of coconut oil to make 2/3 cup of toothpaste.
enter the sum of numbers as a product of their GCF
15 + 90
Answer:
15+90=3×18
Step-by-step explanation:
GCF= 5
Henry and Emma want to buy a total of 2.5 yards of fabric. The fabric costs $6.44 per yard. How much will each pay if they want to split the cost evenly?
$16.10
$14.10
$8.05
$4.03
A city places street lights at equal intervals along a city street beginning 3/8 mile from one end of the street. If the street is 7/8 mile long, how many street lights will the city use? Explain.
The number of street lights that will be needed is 3 street lights.
How to calculate the fraction?From the information, it was stated that the city places street lights at equal intervals along a city street beginning 3/8 mile from one end of the street. If the street is 7/8 mile long,
The number of street lights needed will be:
= 7/8 ÷ 3/8
= 7/8 × 8/3
= 7/3
= 3 street lights.
Therefore, the number of street lights that will be needed is 3 street lights.
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Express as a simplified fraction 5y - 20 = 0
Answer:
[tex]5y - 20 = 0 \\ 5y = 20 \\ y = \frac{20}{5} = 4[/tex]
your answer is 4what ratio is equivalint to 3:1
Answer:
3:1 = 6:2 = 12:4
Hope this helps :)
Answer:
3.1=12.4
Step-by-step explanation:
12.4
12/12+4=12/16=3/4.
so 3.1=12.4
Melatonin is fast-acting and has a half-life of approximately 30 minutes. If you take a 10 milligram tablet, write an exponential equation to model this after t time periods.
The exponential equation to model this after t time periods is:
N(t) = 10 ( 1/2 ) [tex]^\frac{t}{30}[/tex]
Given,
Melatonin is fast-acting and has a half-life of approximately 30 minutes.
10-milligram tablet is taken.
We need to write an exponential equation to model this after t time periods.
What is half-life?Half-life is the time required for a quantity to reduce to half of its initial value.
The formula is given as:
N(t) = [tex]N_{0} ~(\frac{1}{2})~^\frac{t}{t_{1/2}}[/tex]
Where
N(t) = quantity of the substance remaining
[tex]N_{0}[/tex] = initial quantity of the substance
[tex]t_{1/2}[/tex] = half-life of the substance
We have,
Half-life = 30 minutes
[tex]N_{0}[/tex] = 10 mg
The exponential equation to model this after t time periods is:
N(t) = 10 ( 1/2 ) [tex]^\frac{t}{30}[/tex]
Thus the exponential equation to model this after t time periods is:
N(t) = 10 ( 1/2 ) [tex]^\frac{t}{30}[/tex]
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Using the graph, find the following values of the function.
Select the correct choice below and, if necessary, fill in the answer box to complete your choice.
Answer:
f(1) = 1
f(4) = -2
f(0) = 2
Step-by-step explanation:
y = f(x)
The position of a body moving along the x-axis is given by s = t³ - 12t2+36t, with s in meters and t in seconds.
Find the total distance traveled by the body from t = 0 tot = 4.
Total distance =
The total distance travelled by the body is 48 meters
According to the question we have been given an equation of the position of a body moving along x-axis as
s = t³ - 12t² + 36t
where, s = distance in meters
t = time in seconds
We need to find the total distance traveled by the body from t=0s to t=4s
The formula for the total distance is given as :
S = |s(1) - s(0)| + |s(2) - s(1)| + |s(3) - s(2)| + |s(4) - s(3)|
Now we will find out the distance travelled in time 0s to 4s
when t = 0s , s = (0)³ - 12(0)² + 36*0
= 0m
t = 1s , s = (1)³ - 12(1)² + 36*1
= 25m
t = 2s , s = (2)³ - 12(2)² + 36*2
= 32m
t = 3s , s = (3)³ - 12(3)² + 36*3
= 27m
t = 4s , s = (4)³ - 12(4)² + 36*4
= 16m
Putting the required values in the above formula we get ,
S = |25-0|+|32-25|+|27-32|+|16-27|
S = 25 + 7 + 5 + 11 meters
S = 48 meters
Hence the total distance travelled by the body is 48 meters
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Write the quadratic function in standard form. f(x) = x^2 − 6x
The standard form of the given equation f(x) = 6x² − x + 1 is:
[tex]f(x)=6\left(x-\frac{1}{12}\right)^2-\frac{23}{24}[/tex]
What are quadratic functions?A quadratic function is one of the following: f(x) = ax² + bx + c, where a, b, and c are positive integers and an is not equal to zero. A parabola is a curve that represents the graph of a quadratic function. Parabolas can open up or down, and their "width" or "steepness" can vary, but they all have the same basic "U" shape.So, f(x) = 6x² − x + 1:
We must convert this to standard form, which is provided by:
[tex]f(x)=a(x-h)^2+k[/tex]Where x² is the co-efficient of the leading term and (h, k) is the curve's vertex (minimum and maximum point).
The formula h = -b/2a can be used to calculate h.
a = 6 and b = -1[tex]h=\frac{-(-1)}{2(6)}=\frac{1}{12}[/tex]We can find k by determining f(h), as k=f (h).
[tex]\begin{aligned}&k=f\left(\frac{1}{12}\right)=6\left(\frac{1}{12}\right)^2-\frac{1}{12}+1 \\&k=\left(6 \times \frac{1}{141}\right)-\frac{1}{12}+1 \\&k=\frac{1}{24}-\frac{1}{12}+1 \\&k=\frac{1-2+24}{24}=\frac{23}{24}\end{aligned}[/tex]
Therefore, the standard form of the given equation f(x) = 6x² − x + 1 is:
[tex]f(x)=6\left(x-\frac{1}{12}\right)^2-\frac{23}{24}[/tex]
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The correct question is given below:
Write the quadratic function in standard form.
f(x) = 6x² − x + 1
3. If m/E+mZF = 120°, which expression is equivalent to mZG?
A (7x)°
C (7x+4)°
B (8x)°
D (8x + 4)º
(7x + 2)°
(8x-2)
In a triangle of EFG we have ∠E+∠F = 120°,E=(8x-2)° and F=(7x+2)°.
Option B is true and angle of G is 60°.
Given that,
∠E+∠F = 120°
In the figure we have a triangle with EFG.
E=(8x-2)°
F=(7x+2)°
We know
∠E+∠F = 120°
8x-2+7x+2=120
15x=120
x=120/15
x=8
We got x =8
∠E=8[tex]\times[/tex]8-2=62°
∠F=7[tex]\times[/tex]8+2=58°
Now, we know in a triangle all angles are equal to 180°.
∠E+∠F+∠G=180°
62°+58°+G=180°
120°+G=180°
G=180°-120°
G=60°
We have 4 option
a) (7x)° which is false
b) (7x+4)° which is true (7[tex]\times[/tex]8+4=60°)
c)(8x)° which is false
d) (8x+4)° which is false
Therefore, option B is true and angle of G is 60°.
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If JK = 8, IL =31, and JL = 25, what is IK?
Answer: IK=14
Step-by-step explanation:
IK=IJ+JK
IL=IJ+JL
IL-JL=IJ+JL-JL
IJ=IL-JL
IK=IL-JL+JK
IK=31-25+8
IK=6+8
IK=14
The lowest form of this fraction 75/100