ANSWER:
130 flowers
STEP-BY-STEP EXPLANATION:
Let x be the total number of flowers, we can establish the following equation:
[tex]70\left(-50\%\right)+\left(x-70\right)\left(80\%\right)=x\left(10\%\right)[/tex]We solve for x:
[tex]\begin{gathered} 70\left(-0.5\right)+\left(x-70\right)\left(0.8\right)=x\left(0.1\right) \\ \\ -35+0.8x-56=0.1x \\ \\ 0.8x-0.1x=56+35 \\ \\ 0.7x=91 \\ \\ x=\frac{91}{0.7} \\ \\ x=130 \end{gathered}[/tex]The total number of flowers, that is, the ones it had at the beginning was 130
Show how Aaliyah can finish her work using complexnumbers. As a reminder, her last step before requiringassistance is:(x- 3)2=1Be sure to show ALL steps that lead to your finalsolution set!
aAs given by the question
There are given that the equation
[tex]x^2-6x+10=0[/tex]Now,
The solution of the Aaliyah is:
[tex](x-3)^2=-1[/tex]Then,
The next step of the given solution is:
[tex]\begin{gathered} (x-3)^2=-1 \\ x-3=\sqrt[]{-1} \end{gathered}[/tex]According to the concept of complex number
[tex]i=\sqrt[]{-1}[/tex]So,
[tex]\begin{gathered} x-3=\sqrt[]{-1} \\ x-3=i \\ x=i+3 \end{gathered}[/tex]A population of beetles are growing accordingto a linear growth model. The initial population (week 0) isPo = 5, and the population after 7 weeks is P = 82.Find an explicit formula for the beetle population after n weeks..Pn-After how many weeks will the beetle population reach 258?weeks
Answer:
P(n) = 5 + 11n
n = 23 weeks
Explanation:
The equation for the population as a linear growth model has the form
P = P0 + an
Where P0 is the initial population, n is the number of weeks and a is the rate of increase per week. We know that P0 = 5, so
P = 5 + an
Additionally, when n = 7 the value of P = 82, so we can use this to find the value of a as follows
82 = 5 + a(7)
82 = 5 + 7a
82 - 5 = 5 + 7a - 5
77 = 7a
77/7 = 7a/7
11 = a
Therefore, the equation for the population after n weeks is
P(n) = 5 + 11n
Finally, to know the number of weeks to reach a population of 258, we need to replace P by 258 and solve for n, so
258 = 5 + 11n
258 - 5 = 5 + 11n - 5
253 = 11n
253/11 = 11n/11
23 = n
So, after 23 weeks the population will be 258.
the diagram show a side (a) find the height of the top of the side(b) find the length of the side
Part a
Find out the height of the triangle of the figure
we have that
sin(70)=h/2 -----> by opposite side divided by the hypotenuse
solve for h
h=2*sin(70)
h=1.88 mPart b
Find the base of complete triangle
so
Let
x-----> the base of complete triangle
we have that
x=2*cos(70)+h/tan(40)
substitute the value of h
x=2*cos(70)+1.88/tan(40)
x=2.92 mFirst, rewrite8/9 and 7/8so that they have a common denominator
we have
8/9 and 7/8
9=3*3
8=2*2*2
LCM=9*8=72
therefore
8/9 multiply by 8/8-----> (8/9)*(8/8)=64/72
7/8 multiply by 9/9 ----> (7/8)*(9/9)=63/72
8/9 and 64/72 are equivalent fractions
7/8 and 63/72 are equivalent fractions
The answer and how to do it
Answer:
v ≈ 4 cm
Step-by-step explanation:
using the Sine rule in Δ VWX
[tex]\frac{v}{sinV}[/tex] = [tex]\frac{w}{sinW}[/tex]
where v = WX and w = VX
∠ W = 180° - (126 + 21)° = 180° - 147° = 33° , then
[tex]\frac{v}{sin21}[/tex] = [tex]\frac{6}{sin33}[/tex] ( cross- multiply )
v × sin33° = 6 × sin21° ( divide both sides by sin33° )
v = [tex]\frac{6sin21}{sin33}[/tex] ≈ 4 cm ( to the nearest cm )
Find the zeros of the function.7x^2-28=0
What is the relationship among proportional relationships, lines, rates of change, and slope? The graph of a (select) unit (select) is a line through the origin whose (select) is the
The graph of a proportional relationship.
Whose slope
is the unit rate of change
I need help with these two problems.Use the given functions solve:f(x)=6x+7. g(x)= -2x-4. h(x)= -3x/41. g(-6)2. h(-12)I also need help with this.I attached the graph that goes along with the questions.1. If Unit Produced is a function of Labor Hours,f(5)=?A. 3B. 4C. 8D. 102. What can be determined, when f(x)=8?A. Units produced are 5B. Labor hours are 5C. Units produced are 10D. Cannot be determined
We are given the following functions
[tex]f\mleft(x\mright)=6x+7\qquad g(x)=-2x-4\qquad h(x)=-\frac{3x}{4}[/tex]We are asked to find out g(-6) and h(-12)
1. g(-6)
it simply means that we have to plug x = -6 into the function of g(x)
[tex]\begin{gathered} g(x)=-2x-4 \\ g(-6)=-2(-6)-4 \\ g(-6)=12-4 \\ g(-6)=8 \end{gathered}[/tex]Therefore, g(-6) = 8
2. h(-12)
Once again we have to plug x = -12 into the function of h(x)
[tex]\begin{gathered} h(x)=-\frac{3x}{4} \\ h(-12)=-\frac{3(-12)}{4} \\ h(-12)=\frac{36}{4} \\ h(-12)=9 \end{gathered}[/tex]Therefore, h(-12) = 9
What is 2 8/10 in decimal form?
Okay, here we have this:
We are going to convert the following mixed number to decimal: 2 8/10, so we obtain the following:
[tex]\begin{gathered} 2\frac{8}{10} \\ =\frac{2\cdot10+8}{10} \\ =\frac{28}{10} \end{gathered}[/tex]Finally we obtain that 2 8/10 expressed as a fraction is equal to 28/10.
x^3-6x^2+12x-8=27
thnk kiu
x^3−6x^2+12x−8=0
⇔x^3−3x^2.2+3.x.2^2−2^3=0
⇔(x−2)^3=0
⇔(x−2)=0
⇔x=2
Kaizen is a Japanese word that means continuous development. It says that each day we should focus on getting1% better on whatever we're trying to improve.How much better do you think we can get in a year if we start following Kaizen today?Note: You can take tilf value of (1.01)365 as 37.78
If at day 1 we get 1% better than in the day 0, we will be:
[tex]\frac{101}{100}\times1=1.01\times1=1.01[/tex]1.01 better on day 1 than on day 0.
If we get 1% better on day 2 than on day 1, then by day 2 we would be:
[tex]\frac{101}{100}\times1.01=1.01\times1.01=(1.01)^2=1.0201[/tex]1.0201 times better on day 2 than on day 0.
After n days, we would have to multiply 1 by 1.01 n times, so by day n we would be:
[tex]1.01^n[/tex]times better than on day 0.
Calculate 1.01^365 to find how many times better we would be one year after day 0:
[tex]1.01^{365}=37.78343433\ldots[/tex]Therefore, we would get 37.78 times better by day 365, which is after one year.
what is the perimeter of 6.05m and 3.5m
Recall that the perimeter P of a rectangle is given as
P = 2(L + B)
where L is the length and B is the width of the rectangle
Given that the length is 6.05m and the width is 3.5m
Then the perimeter
= 2(6.05 + 3.5)
= 2 (9.55)
= 19.10m
what percent of 28 is 35? the answer is (blank)%
Find the slope of the line that passes through all of the points
on the table.
X
2
3
4
5
6
Y
3
13
23
33
43
Please help
84 is 75% of what number
Answer:
112
Explanation:
We need to find a number that represents 100% when 84 represents 75%, so we will use the following
[tex]100\text{ \% }\times\frac{84}{75\text{ \%}}=\frac{100\times84}{75}=\frac{8400}{75}=112[/tex]Therefore, 84 is 75% of 112.
Answer:112
Step-by-step explanation: - 84 is 75% of 112. 100% of 112 is 112, hope this helps
What is the approximate length of the edge that Tasha will cover with tile
Given:
length=16
width=12
radius=4.5
So total length is:
length of half circle is:
circumference of circle:
[tex]\begin{gathered} C=2\pi r \\ \text{half circle=}\frac{2\pi r}{2} \\ =\pi r \end{gathered}[/tex][tex]\begin{gathered} r=4.5 \\ =\pi r \\ =\pi(4.5) \\ =14.137 \end{gathered}[/tex]For there sides of circle is:
[tex]\begin{gathered} \text{length}+\text{width}+\text{width} \\ =16+12+12 \\ =40 \end{gathered}[/tex]for circle side length is:
[tex]\begin{gathered} =16-(\text{diameter of circle)} \\ =16-(2\times4.5) \\ =16-9 \\ =7 \end{gathered}[/tex]So total length is:
[tex]\begin{gathered} =14.137+40+7 \\ =61.137 \\ \approx61 \end{gathered}[/tex]Approximate length of the edge that Tasha will cover with tile is 61.
write the given equation in slope intercept form. 5x-3y = -9
Thae equation is given as :
5x - 3y = -9
The equation can be written in slope intercept form as;
y= mx + c where m is the gradient and c is the y-intercept
So this will be;
5x = 3y -9
5x + 9 = 3y
5/3 x + 9/3 = 3y/3
5/3 x + 3 = y
y= 5/3 x + 3
Answer
y = 5/3 x + 3
HEEEEELPPPP
The population of a town is modeled by the equation P=3485e0.12t, where “P” represents the population as of the year 2000.
According to the model, what will the population of the town be in 2010?
In approximately what year will the population reach 50,000 people?
Must answer and show appropriate work for both questions here.
show step bye step explanation
There are 11571 people in the world as of 2010, and would take about 22 years for that number to reach 50,000 of population.
What is termed as the exponential increase?An exponential function's curve is created by a pattern of data called exponential growth, which exhibits greater increases over time. Linear growth, which is additive, and geometric growth can be contrasted with exponential growth, which is multiplicative (that is raised to a power).Let P stand for the population in 2000 (or any other time period). Considering the equation:
P = 3485e∧0.12t,
The population in 2010 (t = 10 years) would be:
P = 3485e∧0.12×10
P = 3485e∧12
P = 11571
When there are 50,000 people in the population:
50,000 = 3485e∧0.12t,
Solving, by log property.
t = 22 years.
Thus, there are 11571 people in the world as of 2010, and would take about 22 years for that number to reach 50,000.
To know more about the exponential increase, here
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levon scored 38 points in the first half of the basketball game, and he scored p points in the second half of the game. write an expression to determine the number of points he scored in all. then, find the number of points he scored in all if he scored 20 points in the second half of the game.
By the given information you can raise the following equation, and since levon scored 38 points in the first half of the basketball game, then
[tex]\begin{gathered} TP=38+n \\ \text{Where} \\ TP\colon\text{ the number of points that he scored in total.} \\ n\colon\text{ the number of points that he scored in the second half of the game} \end{gathered}[/tex]So, if n=20
[tex]\begin{gathered} TP=38+n \\ TP=38+20 \\ TP=58 \end{gathered}[/tex]Therefore, if Levon scored 20 points in the second half of the game, in all he scored 58 points.
Fill in the blanks using these answer choices: always, never, sometimes, once.
The complete text would be as following:
Parallel lines cross never
Perpendicular lines cross once
Lines that are neither parallel or perpendicular cross once
Lines that are the same cross always
Perpendicular lines cross at a 90 degree angle
Help me simplify I don’t understand homework and I have to show work .
The Solution:
Given the expression below:
[tex]\frac{\left(sin\theta+cos\theta\right)^2}{1+2sin\theta\:cos\theta}[/tex]We are required to simplify the above expression.
[tex]\begin{gathered} (\sin \theta+\cos \theta)^2=\sin ^2\theta+2\sin \theta\cos \theta+\cos ^2\theta=\sin ^2\theta+\cos ^2\theta+2\sin \theta\cos \theta \\ =1+2\sin \theta\cos \theta \\ \text{ Since }\sin ^2\theta+\cos ^2\theta=1 \end{gathered}[/tex]So,
[tex]\frac{(sin\theta+cos\theta)^2}{1+2sin\theta\: cos\theta}=\frac{1+2sin\theta\: cos\theta}{1+2sin\theta\: cos\theta}=1[/tex]Therefore, the correct answer is:
[tex]\frac{(sin\theta+cos\theta)^2}{1+2sin\theta\: cos\theta}=1[/tex]Given the function and the graph below, which of the following best describes the continuity, interval of increase and interval of decrease?
Given the function:
[tex]f(x)=(-x-1)^2+3[/tex]As we can see, there is no restriction for x, it can be any real value. Additionally, looking at the graph, we do not see any discontinuity ("jumps" or "holes"). We conclude that the function is always continuous.
The vertex of the parabola is at (-1, 3), so x = 1 separates the intervals of increase and decrease. Going from -∞ to -1, we see a decrease in the y-values. Similarly, from -1 to +∞, we see an increment. Then:
Interval of increase: -1 < x < +∞
Interval of decrease: -∞ < x < -1
A trapezoid has legs that are 13 cm and 15 cm long. The parallel sides are 11 cm and 25 cm long. The distance between the bases is 12 cm. What is the area of the trapezoid?
The formula for the area of trapezoid is
[tex]A=\frac{1}{2}\times\sum ^{\square}_{}\text{parallel sides }\times base\text{ height.}[/tex]The area of trapezoid is
[tex]A=\frac{1}{2}\times(11+25)\times12=6\times36=216cm^2[/tex]
Suppose a jar contains 20 red marbles and 31 blue marbles. If you reach in the jar and pull out 2 marbles at random at the same time, find the probability that both are red.
The probability that they are both are red is 0.15.
What is probability?Probability is the occurence of likely events. It is the area of mathematics that deals with numerical estimates of the likelihood that an event will occur or that a statement is true.
The jar contains 20 red marbles and 31 blue marbles. The total marble is 51.
Therefore, the probability will be:
= P(red) × P(red)
= 20/51 × 19/50
= 380 / 2550
= 0.15
The probability is 0.15.
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what is the answer to 3+2q+6-q
To simplify the expression 3+2q+6-q, we have to combine like terms, we do this by combining the terms that are multiplied by the same variable (y) and the terms that are not being multiplied by any variable, we can do it, like this:
3+2q+6-q = (3 + 6) + (2q - q) = (9) + (q) = 9 + q
Then, the answer is 9 + q
………………………………………………………….
you made 66 dots or periods i
think
a. Reflect y = x^2 – 2 across the x-axis.
Given;
We are to reflect the function:
[tex]y=x^2\text{ -2}[/tex]Given a function f(x), the rule for reflecting across the x-axis is:
[tex]\begin{gathered} f(x)\text{ }\rightarrow\text{ -f'(x)} \\ \text{where the arrow represents the transformation} \end{gathered}[/tex]Hence, the reflection of the given function gives:
[tex]\begin{gathered} y=f(x)=x^2\text{ -2} \\ f^{\prime}(x)=-(x^2-2) \\ =-x^2+2 \end{gathered}[/tex]Thus the reflected function would be:
[tex]y^{^{\prime}}=-x^2+2[/tex]Write the sequence of transformations that changes figure ABCD to figure A’B’C’D. Explain your answer and write the coordinates of the figure obtained after each transformation. Are the two figures congruent? Explain your answer.
SOLUTION:
We can compare a point to get the translation.
We can use the point;
[tex]A(-4,4)[/tex]which transforms to;
[tex]A^{\prime}^^{\prime}(3,-4)[/tex]The first transformation is a reflection over the x-axis to map point A to;
[tex]A^{\prime}(-4,-4)[/tex]The next transformation is a translation 7 units to the right.
Therefore, the sequence of transformations are;
Part B: The two figures are congruent because the transformations used are non-rigid.
how to find the length of side x. really having a hard time on this
Since the figure is a square the diagonal divide it in two congruent right triangles. One of them is shown below:
Since we have right trisang
14. Hotel Rates You rent a hotel room for $72 a night. The hotel adds a charge for using its parking lot to the total bill, Afterstaying at the hotel for 3 nights, your total bill is $231.a. Write an equation in slope-intercept form that gives your total bill (in dollars) as a function of the number ofnights you stay in the room.b. How much of your bill was for the parking fee?c.How much does it cost to stay at the hotel for 7 nights?d. If your bill was $591, how many nights did you stay at the hotel?
Answer:
(a)y=72x+15
(b)$15
(c)519
(d)8 nights
Explanation:
Let the number of nights which you stay = x
The cost of renting a room for a night =$72
Therefore, the costs for x nights = $72x
If the charge for using its parking lot = c
Then, the total cost, y=72x+c
Part A
When the total bill = $231
x=3 nights
[tex]\begin{gathered} 231=72(3)+c \\ 231=216+c \\ c=231-216 \\ c=15 \end{gathered}[/tex]Therefore, an equation in slope-intercept form that gives your total bill as a function of the number of nights, x is:
[tex]y=72x+15[/tex]Part B
Your packing fee, c=$15
Part C
When the number of nights, x=7
[tex]\begin{gathered} \text{Total Cost,y}=72(7)+15 \\ =504+15 \\ =\$519 \end{gathered}[/tex]Part D
When the total cost, y = $591
[tex]\begin{gathered} 591=72x+15 \\ 72x=591-15 \\ 72x=576 \\ \frac{72x}{72}=\frac{576}{72} \\ x=8 \end{gathered}[/tex]If your bill was $591, you stayed for 8 nights.