Correctly written, your identity would tell you ...
... (sum of cubes) - 3·(product) = (sum of integers)·((sum of squares) - (sum of any two products))
Filling in the given numbers, you have ...
... 684 - 3·210 = (sum of integers)·(110 -107)
... 54 = (sum of integers)·3 . . . . . simplify
... sum of integers = 54/3 . . . . . . divide by the coefficient of the variable
... sum of integers = 18
_____
Integers 5, 6, and 7 meet these conditions.
Locating Zeros of Polynomial Function:
Describe how you find an upper bound and a lower bound for the zeros of a polynomial function
The value p is an upper bound on the real roots of the polynomial if division of the polynomial by (x-p) results in quotient terms that all have positive coefficients.
The value q is a lower bound on the real roots of the polynomial if division of the polynomial by (x-q) results in quotient terms that alternate signs.
_____
The division can be either synthetic division or long division.
_____ ______
An upper bound on the magnitude of the roots can be found this way:
Divide all coefficients by that of the highest-degree termFind the absolute value of the resultChoose the maximum of those results and increase it by 1There are various refinements, including finding the sum of the ratios of successive coefficients, or taking increasing roots of the ratios found above, then doubling the maximum of those.
Use synthetic division to find the values of the polynomial function for consecutive integers. An integer that produces no sign change in the quotient and the remainder is an upper bound. To find a lower bound of a function, find an upper bound for the function of -x. The lower bound is the negative of the upper bound for the function of -x.
That is the right answer as I just finished the 10 practice problems on E2020
Part 1: Create an equation of a line in point-slope form. Be sure to identify all parts of the equation before writing the equation.
Part 2: Using the equation of the line you wrote in part 1, write an equation of a line that is perpendicular to this line.
Part--1:
We know that a equation in point-slope form is represented by:
[tex]y-y_1=m(x-x_1)[/tex]
where m is the slope of the line and [tex](x_,y_1)[/tex] is a point through which the line passes.
Consider a equation in a point-slope form as:
[tex]y-5=2(x-1)[/tex]
This means that the slope of the line is: 5
and the line passes through the point (1,5).
Part--2:
Now as we know that if a line has a slope as m then the perpendicular line has a slope: -1/m
Since,
[tex]m\times \text{Slope\ of\ second\ line}=-1\\\\i.e.\\\\\text{Slope\ of\ second\ line}=\dfrac{-1}{m}[/tex]
Let this perpendicular line passes through (2,6)
Hence, the equation of a line in point slope form is given by:
[tex]y-6=\dfrac{-1}{2}(x-2)[/tex]
Answer:
Equation:
y-y1=m(x-x1)
y-2=4(x-1)
Part 2:
y=-1/4x +b
Step-by-step explanation:
Q #...10 somebody help me
It is -1, at least thats what i got i hope this helped
The slope of a line can be found, given two points, as follows:
[tex]P_{1}(-5.5,6.1) \\ \\ P_{2}(-2.5,3.1) \\ \\ m=\frac{y_{2}-y_{1}}{x_{2}-x_{1}} \\ \\ m=\frac{3.1-6.1}{-2.5-(-5.5)}=-1[/tex]
So this slope tells us the direction of a line and represents the vertical change divided by the horizontal change.
A ball rolling down a hill was displaced 19.6 m while uniformly accelerating from the rest. If the final velocity was 5.00m/s, what was rate of acceleration?
we are given
A ball rolling down a hill was displaced 19.6 m
so,
[tex]h=19.6m[/tex]
the final velocity was 5.00m/s
so, [tex]v=5m/s[/tex]
Since, a ball rolling down a hill was displaced
so, we get
[tex]u=0m/s[/tex]
we can use kinematic equation formula
[tex]v^2-u^2=2ah[/tex]
Here ,
v is final velocity
u is initial velocity
a is acceleration
h is height from which ball is dropped
now, we can plug our values
[tex]5^2-0^2=2a(19.6)[/tex]
[tex]2a\left(19.6\right)=5^2[/tex]
[tex]2a\left(19.6\right)=25[/tex]
[tex]a=0.63776m/s^2[/tex]................Answer
Using the equation of Motion, the rate of acceleration of the ball is 0.638 m/s²
Using the 2nd equation of Motion :
Height, h = 19.6 meters Final velocity, v = 5 m/sInitial Velocity, u = 0v² = u² - 2gh (downward motion)
5² = 0 - 2(19.6)a
25 = 0 - 39.2a
39.2a = 25
a = 25/39.2
a = 0.638 m/s²
Therefore, the rate of acceleration is 0.638 m/s²
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please help with7 thru 12
Help asap will mark as brainlyst
d because 0.7 is larger than 0.007
Solve the formula for the specified variable
N=(1/6)rm what is r
N=(1/6)rm
Solve for r
[tex]N = \frac{1}{6} rm[/tex]
[tex]N = \frac{1}{6}*r*m[/tex]
To remove the fraction 1/6, we multiply both side by reciprocal 6/1
[tex]N\frac{6}{1}= \frac{1}{6}*r*m\frac{6}{1}[/tex]
6N = rm
Now divide by m on both sides
[tex]\frac{6N}{m}= \frac{r}{m}[/tex]
[tex]\frac{6N}{m}= r[/tex]
We solved for r
[tex]r = \frac{6N}{m}[/tex]
Answer:
r = [tex]\frac{6N}{m}[/tex]
Step-by-step explanation:
Given an equation in terms of N on the left side and r, m variables on the right side.
Instead of N on left side we have to bring r on left side alone and other terms on right side to get formula for r.
For this multiply the given equation first by 6.
6N = rm
Now divide by m
r = [tex]\frac{6N}{m}[/tex]
This is the formula for r in terms of N, m.
11.57-n=7.51 write the unknown number for n
n = 4.06
isolate the term in n by subtracting 11.57 from both sides of the equation
- n = 7.51 - 11.57 = - 4.06
multiply both sides by - 1
n = 4.06
In a right triangle the length of a hypotenuse is c and the length of one leg is a, and the length of the other leg is b, what is the value of b, if Chapter Reference a=2 3 , c=2b ?
c = 2b
a = [tex]2\sqrt{3}[/tex]
b = ?
Use Pythagorean equality:
[tex]c^2 = a^2 + b^2\\b^2 = c^2 - a^2\\b^2 = 4b^2 - 12\\b^2 = 4\\[/tex]
b can be only positive so the solution is b=2
Please help me on my math?
As written, the inequality has a negative coefficient for the variable n. It can be convenient to add the opposite of the right side of the inequality to both sides, so the comparison is to zero:
... 25 +3(4n -3) > 0
... 25 + 12n -9 > 0 . . . . . . eliminate parentheses using the distributive property
... 12n + 16 > 0 . . . . . . . . . collect terms
... n + 4/3 > 0 . . . . . . . . . . divide by 12*
... n > -4/3 . . . . . . . . . . . . add the opposite of the constant (first of answer choices)
_____
1.6w -8 ≥ 22 . . . . . . . given
6w ≥ 30 . . . . . . . . . add 8
w ≥ 5 . . . . . . . . . . . .divide by 6* (second of answer choices)
_____
* When solving inequalities, solution can proceed in the same way it does for solving equations, with one exception. When multiplying or dividing by a negative number, the direction of the comparison changes. Consider the inequality
... 1 < 2
Now, see what happens when we multiply by -1:
... -1 > -2
You may note that we were always dividing by a positive number in the solutions above. That is intentional. In other words, we specifically chose the solution method for problem 3 so that we would avoid dividing by a negative number.
To find the x intercept pls help!
Answer:
x intercept is the point (0.3, 0)
Step-by-step explanation:
Just read it off the graph The line passes through the horizontal x axis halfway between 0.2 and 0.4 which is 0.3. Here x = 0.3 and y = 0.
the x-intercept is the point where the line crosses the x- axis.
From the graph this is where x = 0.3 or (o.3, 0 )
Find the perimeter of a triangle with sides 15 inches, 15 inches, and 21 inches length.
find the perimeter of a triangle with sides 15 inches, 15 inches, and 21 inches length
To find the perimeter of a triangle we add all the sides of the triangle
The length of the sides of the triangle are given as 15 inches, 15 inches, and 21 inches
Perimeter of a triangle =
15 inches + 15 inches + 21 inches = 51 inches
So 51 inches is the perimeter
Use the Internet to find the actual area of Ohio. Then find the actual population density of Ohio. How does this compare with your estimate? Why was your initial estimate greater or less than the actual population density?
Answer:
286.1 people per mile^2
Step-by-step explanation:
there are 11.69 million people in ohio
and ohio is 44,825 mi^2
so if you do 11.69 million / 44,825 = 268.1
Population density is calculated by dividing the population of an area by its size. The actual population density of Ohio can vary from estimates due to factors like population changes and migration. Researchers use various methods to calculate population size and density, especially for large areas.
Explanation:The subject of this question deals with population density, which in the context of geography, refers to the number of people per unit of area. To calculate the population density of Ohio, you would need to first find the actual area of Ohio, and then find the actual population of Ohio. Once you have these two pieces of information, you can calculate the population density by dividing the population by the area. The difference between your initial estimate and the actual population density could be due to various factors, such as fluctuations in population size, migration patterns, or changes in the area's ">demographic data.
Population size can often be estimated using life tables, but this can be a complex process. A straightforward way to estimate population size is to count all the inhabitants in a certain area. However, for large areas like Ohio, this isn't always feasible, which is why researchers often use other methods or statistics to make these estimations. Understanding how population densities are calculated and how they can vary is important in fields like urban planning, sociology, and environmental science.
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Write a word problem for this inequality
72-12a<24
Terence owes $5.00 to his mother and his father. Write the integer problem and determine the total amount he owes his parents. (50 PTS SUPER EASY)
$5 + $5 = $10
Terence owes both his parents a total of $10
Hope this helps you
-AaronWiseIsBae
please help.......... with number 1
I don't like algebra masquerading as geometry. Algebra and geometry are connected in interesting ways, but this is boring.
It just says the two little angles add to the big angle,
(2x + 6) + (10x - 5) = 73
Solving,
12x + 1 = 73
12x = 72
x = 6
SQR = 2x+6 = 18 degrees
PQR = 10x -5 = 55 degrees
Find the value of the expression 2x^4–5x^3+x^2+3x+2 for x=−5
Answer:
1887
Step-by-step explanation:
You can do this by putting the value -5 where x is in the expression, using synthetic division, or letting a calculator evaluate the function. (Likely a calculator is involved, regardless.)
Shown in the attachments are a couple of these methods.
A 30 Oz box of Lucky Charms cost $4.50 a 20 oz box cost $3.60 what is the unit price of each box
We need to find the unit price of each box.
So, a box that weighs 30 Oz costs $4.50.
lets say that 30 Oz box is named box 1. We can use unitary method to find out the unit price of box 1.
Unitary method is a process to find the value of a single unit.
Now,
30 Oz costs $4.50
therefore, 1 Oz should cost:
[tex]\frac{4.50}{30} =0.15[/tex] dollars
So, the unit price of box 1 is $0.15.
Now, lets say the 20 Oz box is named box 2. Again we can use unitary method to find out the unit price of box 2.
Now,
20 Oz box costs $3.60
therefore, 1 Oz should cost:
[tex]\frac{3.60}{20} =0.18[/tex] dollars
So, the unit price of box 2 is $0.18.
4- is there any price for which there are. I data
5-
4. There are no data for prices other than integer values in the range $11 to $16. For example, there is no data for a price of $11.50, or for a price of $17.
5. insufficient information
The length of a rectangular garden is 7 feet longer than its width. The garden's perimeter is 186 feet. Find the width of the garden.
We have a rectangular garden. The length of the garden is 7 feet longer than its width.
Lets say the width of the garden is 'x' feet. So, the length of the garden must be [tex](x+7)[/tex] feet.
Length [tex]=(x+7)[/tex] feet
Width [tex]=x[/tex] feet
We have been given that the perimeter of the garden is 186 feet.
Now as we know that the perimeter of the rectangle is:
[tex]2(length+width)[/tex]
Plugging the values of length and width in the equation, we get:
Perimeter [tex]= 2((x+7)+x)=2(2x+7)=4x+14[/tex]
We know that perimeter of the garden is equal to 186 feet,
So,
[tex]186=4x+14[/tex]
Solving for 'x' we get:
[tex]4x+14=186[/tex]
[tex]4x=186-14=172[/tex]
[tex]x=\frac{172}{4} =43[/tex]
We had assumed that the width of the garden is 'x' feet and now that we have the value of 'x'. We can say that:
The width of the rectangular garden is 43 feet.
The width of the garden is found by using the perimeter formula for a rectangle and the given information that the length is 7 feet longer than the width. Solving the resulting equation gives a width of 43 feet.
To find the width of the garden, we use the fact that the perimeter (P) of a rectangle is given by the formula P = 2l + 2w, where l is the length and w is the width. We are told that the length is 7 feet longer than the width, so we can express the length as w + 7. Substituting the given perimeter of 186 feet, we set up the equation as follows: 186 = 2(w + 7) + 2w. Simplifying further, we get 186 = 4w + 14. Subtracting 14 from both sides gives us 172 = 4w and dividing both sides by 4, we find w = 43. Therefore, the width of the garden is 43 feet.
please answer i dont understand
Remark
On the right, the deposits will build up and the river will have trouble depositing more material and still follow the path it is on. Eventually the river will want to take a short cut across the narrowest part or the neck.
Usually during flooding the water will cut across the narrowest part and an oxbow lake is formed. I think you are intended to answer B, but 50 years may not be enough time in which case D is the answer.
If you have notes on this event, find out what they say. I will choose B, but if you agree don't be surprised if it is D.
What is the coefficient in the expression 3x13+4?
co·ef·fi·cient
ˌkōəˈfiSHənt/Submit
noun
1.
MATHEMATICS
a numerical or constant quantity placed before and multiplying the variable in an algebraic expression (e.g., 4 in 4x y).
So your answer is 3
3 because the number 3 in 3x is a coefficient and the x is the variable.
hope that helps :)
Jennifer is making costumes for the school play she has 70 M of Ribbon if she beeds 54 percent of the ribbon for the costumes. how much ribbon does she need Will mark brainiest show your work
70 m * .54=37.8 METERS
is a fraction a numerical or algebraic
[tex] \frac{n}{4} [/tex]
Algebraic is your answer
In a numerical fraction, there can only be numbers and the operation that is connected with the numbers
In an Algebraic fraction, not only can you have numbers and operation, you can also have variables.
~Rise Above the Ordinary, Senpai
In a usually right-angled (x, y, z)-coordinate system, three planes are given by the following system of linear equations:
[tex]\alpha_1: x-y+(a-1)z=a\\\alpha_2: x+(a-1)y=0 \\\alpha_3: ax+ay+(a-1)z=0[/tex]
a ∈ R
a) Solve the equation system for [tex]a=2[/tex]
b) Find the value of [tex]a[/tex] for which the three planes intersection is a straight line and specify a parametric equation for the line.
c) Find the value of [tex]a[/tex] for which the three plans have no common point.
d) Is there a value of [tex]a[/tex] for which the three plans have the common intersection [tex](1, -\frac{1}{69}, \frac{4624}{4761})[/tex]?
Please, explain how you found the solutions :-)
Extra:
e) Illustrate questions a) and b) with Maple software.
Hint: The [tex]implicitplot3d[/tex] command can sure to be helpful. Also note that the argument [tex]orientation[/tex] can lock your plot in a favorable position for inspection.
Answer:
a) (x, y, z) = (1, -1, 0)
b) a = 0; L = {t, t, 0}
c) a = 1 . . or . . a = 3
d) No
Step-by-step explanation:
a) The solution using row-reduction techniques is shown in the first attachment, part (a). The generic solution is shown evaluated for a=2, the result being (1, -1, 0).
You will note that the solution gives indeterminate values for a=1 and a=3, which make the denominators zero.
b) For this, we use the point solution of part (a) together with the cross product of the normal vectors of planes 1 and 2. Said cross product will be in the direction of their line of intersection. We substitute the parametric equation for that line into the equation for plane 3 and solve for a. The result is a = 0.
The simplification of the resulting equation also gives a=1 and a=3, but we treat those as extraneous solutions because the corresponding common point of intersection of the planes does not exist.
c) The values a = 1 and a = 3 were found in part (a). These are values of a that make the common point indeterminate.
d) Substituting the given values for (x, y, z) gives three equations for a that have 3 different solutions. Hence there cannot be a value of a that makes this be a common point of intersection.
e) The second attachment illustrates part (a), with a=2. The third attachment illustrates part (b) with a=0.
The fourth attachment illustrates part (c). The first picture has the triangular tunnel between the planes in a vertical orientation (a=1). The second picture has the triangular tunnel extending from lower front to upper back (a=3).
The minimum of a parabola is located at (-1,-3). the point (0,1) is also on the graph. which equation can be solved to determine the a value in the function representing the parabola?
Answer:
The equation that can be used to solve for a is 1 = a(0=1)²-3.
Explanation:
In this case, I would model the parabola in vertex form. Vertex form is y = a(x-h)²+k, where (h,k) is the vertex of the parabola. Using the information from the question, we can plug in values to get 1 = a(0+1)²-3. (This could be simplified as 1 = a(1)²-3 ⇒ 1 = a-3 ⇒ a = 4, but we are only interested in finding the equation that can solve for a.)
Answer:
The correct answer is A, 1 = a(0 + 1)^2 – 3
Step-by-step explanation:
The verified guy made a typo, putting = instead of + :P
Will Give brainliest!
Examine the diagram.
Name two corresponding angles to ∠1.
∠6 and ∠15
∠5 and ∠6
∠13 and ∠15
∠5 and ∠13
Angle 1 is in the northwest corner of the intersection of lines. Other (corresponding) angles that are in the northwest corner are ∠5, ∠9, and ∠13.
The appropriate choice is ...
... ∠5 and ∠13
a team played 42 games and won 5/14 of them. how many games were lost?
27 games were lost
fraction of games lost = 1 - [tex]\frac{5}{14}[/tex] = [tex]\frac{14}{14}[/tex] - [tex]\frac{5}{14}[/tex] = [tex]\frac{9}{14}[/tex]
number of games lost = [tex]\frac{9}{14}[/tex] of 42
= [tex]\frac{9}{14}[/tex]× 42 = 27
The team played 42 games and won 5/14 of them, which equals 15 games. Subtracting the number of games won from the total number of games played gives the total number of games lost, which is 27.
Explanation:The team played 42 games and won 5/14 of them. To find out how many games were lost, we first have to find out how many they won. 5/14 of 42 games is 15 games. So, they won 15 games. Now, to find out how many games were lost, we need to subtract the number of games won (15 games) from the total number of games played (42 games). Therefore, 42 games - 15 games = 27 games. So, the team lost 27 games.
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What is the solution of sqrt x+12=x ? x = –3 x = 4 x = –3 or x = 4 no solution
x = 4 is the solution
given [tex]\sqrt{x+12}[/tex] = x ( square both sides )
x + 12 = x² ( rearrange into standard form )
x² - x - 12 = 0 ← in standard form
(x - 4 )(x + 3 ) = 0 ← in factored form
equate each factor to zero and solve for x
x - 4 = 0 ⇒ x = 4
x + 3 = 0 ⇒ x = - 3
substitute these values into the original equation and if both sides are equal then they are the solutions
x = 4 : [tex]\sqrt{4+12}[/tex] = [tex]\sqrt{16}[/tex] = 4 = x ← correct
x = - 3 : [tex]\sqrt{-3+12}[/tex] = [tex]\sqrt{9}[/tex] = 3 ≠ - 3 ← false
the solution is x = 4
Answer: x= 4
Step-by-step explanation:
Multiply and simplify: 3a(4a2 – 5a + 12) 7a3 – 2a2 + 15a 12a3 – 15a2 + 36a 12a2 – 15a + 36 7a2 – 2a + 15
Answer:
[tex]12a^{3}-15a^{2}+36a[/tex]
Step-by-step explanation:
To solve this problem you must apply the procccedure shown below:
1. You have the following expression:
[tex]3a(4a^{2}-5a+12)[/tex]
2. Then, you must apply the Distributive property. In other words, you need to multiply [tex]3a[/tex] by each term inside the parentheses.
3. You need to remember the properties of exponents. When you have equal base, you only need to multiply the coefficients, write the base and add the exponents. Therefore, you have:
[tex]3a(4a^{2}-5a+12)=12a^{(2+1)}-15a^{(1+1)}+36a=12a^{3}-15a^{2}+36a[/tex]