I'm not the best at math, but I tried.
x= the amount of months passed
The question asks for the population of fleas in 1 year, and 1 year = 12 months, then x would equal 12 months
Therefore, you substitute that x with 12
f(x)=250(2^x)-------f(x)=250(2^12)
Now you can solve that part of the problem:
2 to the power of 12= 4096
f(x)=250(4096)
now multiply that:
250×4096= 1024000
The answer is C. 1024000
The answer is 1,024,000 fleas.
The function f(x)=250(2^x) gives the population of fleas after x months. To find out how many fleas there will be after 1 year, substitute x=12 into the function:
f(12) = 250(2^12) = 250 * 4096 = 1,024,000 fleas.
Which of these is not random?
A. Getting recommended by a teacher
B. Choosing a card from a fair deck
C. Rolling a die
D. Flipping a coin
A. Getting recommended by a teacher
A getting recommended by a teacher the reason the reason why this is correct is because the teacher is not randomly picking you she already knows who she wants to recommend
Find m∠1 if m∠2=73°, m∠3=107°, m∠4=92°. Justify your response!
Answer:
92°
Step-by-step explanation:
The supplementary relationship between angles 2 and 3 means lines a and b are parallel. Since those lines are parallel, corresponding angles 1 and 4 are congruent.
m∠1 = m∠4 = 92°
factor 15x^3-5x^2+6x-2 by grouping. what is the resulting expression?
Answer: (5x^2 + 2)(3x - 1)
I'll break it down:
You start off with 15x^3 - 5x^2 + 6x - 2
You first group the first two terms together, and then the last two pairs together: (15x^3 - 5x^2) (6x - 2)
Then you simplify (just factor out as much as you can): 5x^2(3x - 1) 2(3x - 1)
Then you take the terms that you get from doing that.
To find the First Term:
5x^2(3x - 1) 2(3x - 1)
(5x^2 + 2)
To find the Second Term:
5x^2(3x - 1) 2(3x - 1)
(3x - 1)
So your terms are (5x^2 + 2) and (3x -1)
Final Answer: (5x^2 + 2)(3x - 1)
The resulting expression will be (5x² + 2)(3x - 1). The correct answer is option A.
What is an expression?Expression in maths is defined as the collection of the numbers variables and functions by using signs like addition, subtraction, multiplication and division.
The grouping of the given expression will be done as:-
You start off with 15x³ - 5x²+ 6x - 2
You first group the first two terms together, and then the last two pairs together: (15x³ - 5x²) (6x - 2)
Then you simplify (just factor out as much as you can): 5x²(3x - 1) 2(3x - 1)
Then you take the terms that you get from doing that.
To find the First Term:
5x² (3x - 1) 2(3x - 1)
(5x² + 2)
To find the Second Term:
5x²(3x - 1) 2(3x - 1)
(3x - 1)
So your terms are (5x² + 2) and (3x -1)
Therefore the resulting expression will be (5x² + 2)(3x - 1)
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What is the value of x to the nearest tenth?
First make a triangle by connecting the center point of the circle to one of the end points of the chord.
This will make a right triangle. The new formed line is the radius of the circle and will be the hypotenuse of the right triangle too.
Since one of the legs of the right triangle is half the chord, divide the chord in to two.
9.6 / 2 = 4.8
Now we can calculate for the hypotenuse.
Pythagorean theorem states that a²+b² = c²
So
√2.4² + 4.8² = c
√5.76 + 23.04 = c
√28.8 = c
5.4 = c
C is the hypotenuse and the hypotenuse is known as the radius of the circle.
So the radius is 5.4
The value of x can be any number between 1.5 to 4.5. Some translations imply that 'x' is being used in scientific notation or being adjusted by standard deviations in statistical calculations. Furthermore, finding 'x' in equations could result in more than one solution.
Explanation:The question is about finding the value of x, which is a mathematical variable. Without a proper equation or context, it is not possible to determine the specific value of x. However, some details were given, stating '1.5 ≤ x ≤ 4.5', meaning that the value of x can be any number between 1.5 and 4.5. Additionally, the concept of scientific notation or exponential notation appears in the data provided ('x x 10¹'). This can help express very large or small numbers in a simplified form. For instance, if 'x' is 8.4 and '10¹' indicates we have 14 placeholder zeros, the actual measurement value would be 8.4 followed by 14 digits (840,000,000,000,000).
Furthermore, the question has hints of statistics, shown when 'x' is increased and decreased by standard deviations, which are instructions to calculate different characteristic values from certain distributions (e.g., '(x + 1s)').
Remember that solving equations may result in more than one solution, pointing out the characteristic of quadratic equations that give two solutions. And finally, dividing and multiplying by powers of 10 simply means shifting decimal points right or left respectively, according to the number of zeros in the power of ten.
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Find the area of the irregular figure
Answer:
B
Step-by-step explanation:
A(rectangle) = 14 * 21 = 294
A(triangle) = ((21 - 12) * 16) / 2 = 72
A(figure) = 294 + 72 = 366
Answer:
B 366 cm²
Step-by-step explanation:
Multiply 21 by 14 to find area of the rectangle
21 × 14 = 294
Subtract 12 from 21
21 - 12 = 9
Multiply 9 by 16
144
Divide 144 by 2 to get area of triangle
144 ÷ 2 = 72
Add 72 with 294 to get final answer
72 + 294 = 366
Answer: B 366 cm²
The graph of y= - square root of x is shifted 2 units up and 5 units left. Which equation represents the new graph
Answer:
y = -√(x + 5) + 2.
Step-by-step explanation:
y = -√x
Shifting this 2 units up produces the equation:
y = -√x + 2
Moving it 5 units to the left gives:
y = -√(x + 5) + 2.
The equation of graph of [tex]y=-\sqrt{x}[/tex] is shifted 2 units up and 5 units left.
[tex]y=-\sqrt{x+5}+2[/tex]
Given :
The graph of [tex]y=-\sqrt{x}[/tex] is shifted 2 units up and 5 units left.
The parent equation of the graph is [tex]y=-\sqrt{x}[/tex]
The graph is shifted 2 units up
When any graph is shifted up then we add the units at the end
Graph shifted 'a' units up then f(x) becomes f(x) +a
when a graph is shifted 'a' units left , then we add the units with 'x'
Graph shifted 'a' units left then f(x) becomes f(x+a)
The graph of [tex]y=-\sqrt{x}[/tex] is shifted 2 units up and 5 units left.
Add 5 units with 'x' and add 2 units at the end
[tex]y=-\sqrt{x+5}+2[/tex]
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if F(x) = (1/8)(8^x) , What is F(3) ?
Substitute:
f(3) = (1/8)(8^(3))
Evaluating the function gives us the answer of 64.
f(3) = 64
What is the length of chord ST in P below
Answer:
A. 7 units
Step-by-step explanation:
Answer:
The correct option is A. The length of chord ST in P is 7 units.
Step-by-step explanation:
Given information: QR=7, distance between center and QR is 3.2 units and the distance between center and ST is 3.2 units.
If two chords are equidistant from the center of the circle, then the length of both chords are same.
From the given figure it is clear that the two chords QR and ST are equidistant from the center of the circle,so the length of both chords are same.
[tex]QR=ST[/tex]
[tex]7=ST[/tex]
The length of chord ST in P is 7 units. Therefore the correct option is A.
May somebody help me with this question? (It’s number 3) I would really appreciate it ! :) it gives you up to 50 points
Answer: Option D.
Step-by-step explanation:
You need to remember that the circumference of a circle can be calculated with this formula:
[tex]C=2\pi r[/tex]
Where "r" is the radius of the circle and [tex]\pi =3.14[/tex]
In this case the distance 150 feet (From the edge of the track to the center of the circle) is the radius.
Since she walks her horse 4 times around the track, you need to multiply the circumference by 4 to calculate the approximate number of feet that she and her horse will travel:
[tex]C=4[2(3.14)(150ft)]=3,768ft[/tex]
Which of the following is a rational number?
A.√10
B.√100
C.√1000
D.√10000
im not sure but I think it is b
There are two rational numbers on that list.
B. √100 = +10 and -10
D. √10,000 = +100 and -100
Graph the linear equation. Find three points that solve the equation, then plot on the graph. -2x-3y=-7
Graphing the linear equation -2x - 3y = -7: Identify three points satisfying the equation, such as (0, 3), (1, 1), and (2, 1). Plotting these points on the graph, connect them to depict the line representing the equation on the Cartesian plane.
To graph the linear equation -2x - 3y = -7, we can first rearrange it to solve for y:
-2x - 3y = -7
-3y = 2x - 7
[tex]\[ y = \frac{2}{3}x + \frac{7}{3} \][/tex]
Now, we can select three points to plot on the graph. For simplicity, let's choose some integer values for x to find corresponding y values:
1. When x = 0: [tex]\(y = \frac{7}{3}\)[/tex], giving the point [tex](0, \(\frac{7}{3}\))[/tex].
2. When x = 3: y = 3, giving the point (3, 3).
3. When x = -3: y = -1, giving the point (-3, -1).
Now, plot these three points on the graph and connect them to visualize the line represented by the equation.
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What is (a+b)(a-b) equal
Answer:a squared-b squared
Step-by-step explanation:
Answer:
[tex](a+b)(a-b)=a^{2} -b^{2}[/tex]
Step-by-step explanation:
This is a example of remarkable identities.
We know that the result of multiplication is called product and the values that multiply are called factors.
We call remarkable identities to certain algebraic expressions with binomial products very frequent in the calculation.
For this example, we got a Product of the sum for the difference of two binomials.
[tex](a+b)(a-b)[/tex]
The product of the sum for the difference of two binomials is equal to the square of the first quantity, minus the square of the second.
[tex](a+b)(a-b)=a^{2} -b^{2}[/tex]
Demostration:
[tex](a+b)(a-b)= a^{2} -ab+ab-b^{2}=a^{2} -b^{2}[/tex]
.
How do you solve this?
Answer:
There are 8 boys in the chorus and 16 girls in the chorus
The graph in the attached figure
Step-by-step explanation:
Let
x----> the number of boys
y----> the number of girls
we know that
[tex]y=2x[/tex] -----> equation A
[tex]x=y-8[/tex] ----> equation B
Solve the system of equations by graphing
Remember that the solution of the system of equations is the intersection point both graphs
The solution is the point (8,16)
see the attached figure
therefore
There are 8 boys in the chorus
There are 16 girls in the chorus
2. Solve the following system by any method.
8x + 9y = –5
–8x – 9y = 5
ANSWER
Infinitely many solutions.
EXPLANATION
The given system t;
8x + 9y = –5
–8x – 9y = 5
We use the elimination method:
Let us add the two equations to obtain:
-8x+8x+9y-9y=-5+5
This simplifies to:
0=0
This implies that, the system has infinitely many solutions because the two lines coincide.
A lighting products company has put a new brand of solar lightbulbs on the market. The graph shows the estimated revenue, in millions of dollars, as the selling price of the lightbulb varies. What selling price is expected to produce the maximum revenue? A. $2 B. $8 C. $5 D. $3
Answer:
$5
Step-by-step explanation:
Answer:
the answer is 5$
Step-by-step explanation:
someone please help me this is due tomorrow!!!
Let me know if you can see this photo
I need the measurement of each angle (please show work)
Answer:
∠E = ∠F = 41°
Step-by-step explanation:
The sum of the 3 angles in a triangle = 180°
Sum the 3 given angles and equate to 180
x + x + 98 = 180 ( subtract 98 from both sides )
2x = 82 ( divide both sides by 2 )
x = 41
Hence
∠E = ∠F = 41°
To the nearest hundredth, what is the value of x?
42.16
43.11
52.07
54.26
WHich of the following correctly completes the square for the equation below ? X^2 + 2x=19
Answer:
See below.
Step-by-step explanation:
x^2 + 2x = 19
(x + 1)^2 - 1 = 19
(x + 1)^2 = 20.
Answer:
(x+1)2+2x=19
Step-by-step explanation:
i just did it on a p e x
30 points PLEASE HELP WITH MATH PROBLEM
From this triangle we know:
THE AREA:
[tex]A=80cm^2[/tex]
THE HEIGHT:
[tex]H=B+12[/tex]
We know that the area, height, and base of a triangle are related according to the following formula:
[tex]A=\frac{BH}{2} \\ \\ Substituting \ H: \\ \\ A=\frac{B(B+12)}{2} \\ \\ Substituting \ A: \\ \\ 80=\frac{B(B+12)}{2} \\ \\ 2(80)=B(B+12) \\ \\ 160=B^2+12B \\ \\ B^2+12B-160=0[/tex]
Solving B by quadratic formula:
[tex]B_{12}=\frac{-b \pm \sqrt{b^2-4ac}}{2a} \\ \\ B_{12}=\frac{-12 \pm \sqrt{12^2-4(1)(-160)}}{2(1)} \\ \\ B_{12}=\frac{-12 \pm \sqrt{12^2-4(1)(-160)}}{2(1)} \\ \\ B_{1}=8 \ and \ B_{2}=-20[/tex]
Since we can’t have a negative value of the base, the correct option is:
[tex]B=8cm[/tex]
11) How long will it take the water balloon to hit the ground?We must use the formula:
[tex]h(t)=-5.2t^2+v_{0}t+h_{0}[/tex]
Since James drops the balloon from a height of 45m, then this is the initial height, so [tex]h_{0}=45m[/tex]. Moreover, at the very instant he drops the balloon the initial velocity is zero, so [tex]v_{0}=0[/tex]. When the ballon hit the ground [tex]h(t)=0[/tex]. Therefore:
[tex]0=-5.2t^2+45[/tex]
Solving this equation:
[tex]5.2t^2=45 \\ \\ t^2=\frac{45}{5.2} \\ \\ t^2=8.653 \\ \\ t=\sqrt{8.653} \\ \\ t=2.941s[/tex]
Rounding to the nearest tenth:
[tex]\boxed{t=2.9s}[/tex]
Finally, the water balloon will hit the ground after 2.9 seconds.
12) Height and initial velocityWe have the equation:
[tex]h(t)=-16t^2+32t+12[/tex]
But we know that this equation follows the form:
[tex]h(t)=-16t^2+v_{0}t+h_{0}[/tex]
According to this:
The height of the platform is [tex]h_{0}=12ft[/tex]
The initial velocity of the ball is [tex]v_{0}=32ft/s[/tex]
if the m∠2 = 40, what is the m∠5?
Answer: The answer is 100.
Step-by-step explanation: 40 divided by 2 = 20
x=20
20x5=100
Answer: answer is 140 on gradpoint.com
Steve can jog 14 miles in 2 hours. At this rate, how many miles can he jog in 1/4 hour?
Answer:
1 3/4 miles in 1/4 hour.
Step-by-step explanation:
Write and solve an equation of ratios:
x (1/4) hr
--------- = ------------
14 mi 2 hr
Cross multiplying, we get 2x = (1/4)(14), or
x = (1/4)(7), or x = 7/4
Steve can jog 7/4 miles in 1/4 hour. That's 1 3/4 miles in 1/4 hour.
Answer:
Step-by-step explanation:
Type the correct answer in each box. Consider the expressions shown below.
A -9x^2-2x+7
B 9x^2-2x+2
C 9x^2+2x-7
Complete the following statements with the letter that represents the expression.
(7x^2-5x+3)+(2x^2+3x-1) is equivalent to expression___ .
(3x^2-4x-4)+(-12x^2+2x+11) is equivalent to expression___ .
(4x^2-3x-9)+(5x^2+5x+2) is equivalent to expression ___ .
Answer:
B, A and C.
Step-by-step explanation:
(7x^2-5x+3)+(2x^2+3x-1) is equivalent to expression B .
(3x^2-4x-4)+(-12x^2+2x+11) is equivalent to expression A .
(4x^2-3x-9)+(5x^2+5x+2) is equivalent to expression C .
You combine like terms to arrive with the answer.
The answer is:
- The first operation match with the polynomial:
B. [tex]9x^{2} -2x+2[/tex]
- The second operation match with the polynomial:
A. [tex]-9x^{2}-2x+7[/tex]
- The third operation match with the polynomial:
C. [tex]9x^{2} +2x-7[/tex]
Why?In order to solve the given operations, we need to group the like terms.
Remember, like terms are terms that share the same variable and the same exponent.
For example:
[tex]x^{2} +2x^{2} +3x^{3} +2=3x^{2} +3x^{3} +2[/tex]
We only operate with the variables that shares the same exponent.
Also, we need to remember the distributive property:
[tex](a+b)(c+d)=ac+ad+bc+bd[/tex]
So, we are given the following polynomials:
[tex]A.9x^{2} -2x+7\\\\B. 9x^{2} -2x+2\\\\C. 9x^{2} +2x-7[/tex]
And we need to perform the following operations:
First operation,
[tex](7x^{2}-5x+3)+(2x^{2} +3x-1)=7x^{2} +2x^{2} -5x+3x+3-1\\\\7x^{2} +2x^{2} -5x+3x+3-1=9x^{2} -2x+2[/tex]
So, the first operation match with the polynomial:
B. [tex]9x^{2} -2x+2[/tex]
Second operation,
[tex](3x^{2}-4x-4)+(-12x^{2}+2x+11)=3x^{2} -12x^{2} -4x+2x-4+11\\\\3x^{2} -12x^{2} -4x+2x-4+11=-9x^{2}-2x+7[/tex]
So, the second operation match with the polynomial:
A. [tex]-9x^{2}-2x+7[/tex]
Third operation,
[tex](4x^{2} -3x-9)+(5x^{2} +5x+2)=4x^{2}+5x^{2} -3x+5x-9+2\\\\4x^{2}+5x^{2} -3x+5x-9+2=9x^{2} +2x-7[/tex]
So, the second operation match with the polynomial:
C. [tex]9x^{2} +2x-7[/tex]
Have a nice day!
Find the rate of change of the function h(x) = 2 x on the interval 2 ≤ x ≤ 4. The rate of change is a0.'
Answer:
Step-by-step explanation:
Answer:
2
Step-by-step explanation:
The rate of change of a linear function is the slope m
h(x) = 2x is a linear function with slope m = 2
Hence rate of change is 2
There are 4 semi- trailer truck park a line at the stop. After the first truck, each in the line weights 2 tons more than the truck before it. The truck weight a total of 32 tons. How many pounds does each truck weight?
Let's say the first truck weighs x tons
Then, the weight of 2nd truck = x+2 tons
The weight of 3rd truck = (x + 2) + 2 = x+4 tons
The weight of 4th truck = (x + 4) + 2 = x+6 tons
Total weight of 4 trucks:
x + (x+2) + (x+4) + (x+6) = 32
which can be solved easily to give x = 5
A circle has a radius of 16 inches. to the nearest inch, what is the the length of an arc of the circle that is intercepted by a central angle of 80 degrees
[tex]\bf \textit{arc's length}\\\\ s=\cfrac{\theta \pi r}{180}~~ \begin{cases} r=&radius\\ \theta =&angle~in\\ °rees\\ \cline{1-2} r=16\\ \theta =80 \end{cases}\implies s=\cfrac{(80)\pi (16)}{180}\implies s=\cfrac{64\pi }{9} \\\\\\ s\approx 22.34\implies \stackrel{\textit{rounded up}}{s=22}[/tex]
Final answer:
The length of the arc intercepted by a central angle of 80 degrees in a circle with a radius of 16 inches is approximately 22 inches to the nearest inch.
Explanation:
To find the arc length of a circle that is intercepted by a central angle of 80 degrees, we first need to know the formula for the circumference of a circle, which is 2πr.
In a full circle, which is 360 degrees, the arc length is equal to the circumference. However, because we are only dealing with an 80-degree angle, we need to find the fraction of the circumference that corresponds to this angle. The formula to calculate the arc length (As) for any given angle (Θ) in degrees is:
As = (2πr * Θ) / 360
Given a radius (r) of 16 inches, and a central angle of 80 degrees, the arc length is:
As = (2π * 16 * 80) / 360 ≈ (100.53 inches * 80) / 360 ≈ 8033.6 / 360 ≈ 22.3 inches
Therefore, to the nearest inch, the length of the arc is 22 inches.
The table below models the cost, y, of using a high-efficiency washing machine and a standard washing machine over x number of years.
Answer:
i) y = 25x + 500
ii) y = 30x + 400
iii) The washing machines would cost the same amount after 20 years of use
iv) Standard machine
Step-by-step explanation:
i)
We are to determine a straight line equation that models the cost of High-Efficiency washing machine over the years;
The first step step is to determine the slope of the line,
( change in y) / ( change in x ) = (550 - 525) / ( 2 - 1) = 25
The equation is slope-intercept form will be;
y = 25x + c
Where y is the cost of the High-Efficiency washing machine and x the number of years. To determine the y-intercept, c, we use any pair of points given in the data table;
when x = 1, y = 525
525 = 25(1) + c
c = 500
Therefore;
y = 25x + 500
ii)
The straight line equation that models the cost of Standard washing machine over the years;
Slope = (460 - 430) / (2 - 1) = 30
The equation is slope-intercept form will be;
y = 30x + c
when x = 1, y = 430
430 = 30(1) + c
c = 400
Therefore;
y = 30x + 400
Where y is the cost of the standard washing machine and x the number of years.
iii)
Given the cost functions for both machines over the number of years, we simply equate the two equations and determine the value of x when both machines would cost the same amount;
We have the cost functions;
y = 25x + 500
y = 30x + 400
Equating the two and solving for x;
25x + 500 = 30x + 400
500 - 400 = 30x - 25x
100 = 5x
x = 20
Therefore, the washing machines would cost the same amount after 20 years of use.
iv)
In order to determine which machine would be the more practical purchase if kept for 9 years we use the cost functions obtained in i) and ii)
The cost function of the High-Efficiency washing machine is;
y = 25x + 500
To determine the cost, we solve for y given x = 9
y = 25(9) + 500
y = 725
The cost function of the Standard washing machine is;
y = 30x + 400
We solve for y given x = 9
y = 30(9) + 400
y = 670
Comparing the two values obtained, the cost for the Standard washing machine is more practical.
1) y=25x+500
2) y=30x+400
3) 20
4) standard machine
Solve the equation. −4x+3=19
Answer:
[tex]\large\boxed{x=-4}[/tex]
Step-by-step explanation:
[tex]-4x+3=19\qquad\text{subtract 3 from both sides}\\\\-4x+3-3=19-3\\\\-4x=16\qquad\text{divide both sides by (-4)}\\\\\dfrac{-4x}{-4}=\dfrac{16}{-4}\\\\x=-4[/tex]
Step 1: Combine like terms ( 3 and 19) by subtracting 3 to both sides
-4x + (3-3) = 19 -3
-4x = 16
Step 2: Isolate x by dividing -4 to both sides
[tex]\frac{-4x}{-4} =\frac{16}{-4}[/tex]
x = -4
Hope this helped!
30 points for this question!| Mr. O’Hara found that on a recent trip his car used 12 gallons of gas to drive 396 miles. Assume that m represents the number of miles driven and g represents the number of gallons of gas used. What value makes the equation m=_*g represent the relationship between gallons of gas and miles driven?
Answer:
m = 33*g.
Step-by-step explanation:
The consumption of gas = 396 / 12
= 33 miles / gallon.
m = 33*g (answer).
If your in k12 online school are exams at home online or a building
Answer:
a building
Step-by-step explanation:
Your exams? Probably at home, unless it’s AZmerit or CAmerit.