Answer:
m∠A = 39.5°
Step-by-step explanation:
* Lets revise how to find the measure of an angle by using the cosine rule
- In any triangle ABC
# ∠A is opposite to side a
# ∠B is opposite to side b
# ∠C is opposite to side c
- The cosine rule is:
# a² = b² + c² - 2bc × cos(A)
# b² = a² + c² - 2ac × cos(B)
# c² = a² + b² - 2ab × cos(C)
- To find the angles use this rule
# m∠A = [tex]cos^{-1}\frac{b^{2}+c^{2}-a^{2}}{2bc}[/tex]
# m∠B = [tex]cos^{-1}\frac{a^{2}+c^{2}-b^{2}}{2ac}[/tex]
# m∠C = [tex]cos^{-1}\frac{a^{2}+b^{2}-c^{2}}{2ab}[/tex]
* Lets solve the problem
∵ a = 14 , b = 17 , c = 22
∵ m∠A = [tex]cos^{-1}\frac{b^{2}+c^{2}-a^{2}}{2bc}[/tex]
∴ m∠A = [tex]cos^{-1}\frac{17^{2}+22^{2}-14^{2}}{2(17)(22)}[/tex]
∴ m∠A = [tex]cos^{-1}\frac{289+484-196}{748}[/tex]
∴ m∠A = [tex]cos^{-1}\frac{577}{748}[/tex]
∴ m∠A = 39.5°
Answer:
∠A = 39.52°
Step-by-step explanation:
In Δ ABC,
a = 14, b = 17 and c = 22 then we have to find the measure of ∠A.
Since a² = b² + c² - 2.b.c.cosA [ From cosine law]
(14)² = (17)²+ (22)² - 2(17)(22)cosA
196 = 289 + 484 - (748)cosA
196 = 773 - (748)cosA
748(cosA) = 773 - 196 = 577
cosA = [tex]\frac{577}{748}=0.7714[/tex]
A = [tex]cos^{-1}(0.7714)[/tex]
A = 39.52°
Evaluate the expression and place your answer in the space provided 3^2+(-2+3)•5
Answer:
14
Step-by-step explanation:
Evaluate exponents, followed by brackets, multiplication and addition
Given
3² + (- 2 + 3) × 5
= 9 + 1 × 5 ← exponents and bracket
= 9 + 5 ← multiplication
= 14 ← addition
Answer:
The correct answer is 14.
Step-by-step explanation:
I'll give you an a hint. You'd need to know about the order of operations is parenthesis, exponent, multiply, divide, add, and subtract.
First, do parenthesis.
(-2+3)=1
3²+1*5
Next, exponent.
3²=3*3=9
9+1*5
Then, multiply.
5*1=5
Finally, add.
9+5=14
So, the correct answer is 14.
I hope this helps!
Classify ABC by its angles if mA=x, mB=2x and mC=3x
Answer:
All 3 angles of any triangle have a sum = 180. Therefore, x + 2x + 3x = 180 6x = 180 x = 180/6 = 30. So It is a 30-60-90 special right triangle!!
Step-by-step explanation:
solution to m^2- 36=0
Answer:
m=(-6,6)
Step-by-step explanation:
m^2 -36 = 0
Reorder the terms:
-36 + m^2 = 0
Solving for variable 'm'.
Add '36' to each side of the equation.
-36 + 36 + m^2 = 0 + 36
Combine like terms: -36 + 36 = 0
0 + m^2 = 0 + 36
m^2 = 0 + 36
Combine like terms: 0 + 36 = 36
m^2 = 36
Simplifying
m^2 = 36
Take the square root of each side:
√m^2=+/-√36
m=(+/-)6
m = {-6, 6}
using the discriminant, how many solutions and what type of solution(s) does 3p-9p^2=6 have?
a. 2; irrational
b. 2; rational
c. 1; rational
d. no real solutions
Answer:
d. no real solutions
Step-by-step explanation:
3p − 9p² = 6
0 = 9p² − 3p + 6
0 = 3p² − p + 2
The discriminant of ax² + bx + c is b² − 4ac.
If the discriminant is negative, there are no real roots.
If the discriminant is zero, there is 1 real root.
If the discriminant is positive, there are 2 real roots.
If the discriminant is a perfect square, the root(s) are rational.
If the discriminant isn't a perfect square, the root(s) are irrational.
Finding the discriminant:
a = 3, b = -1, c = 2
(-1)² − 4(3)(2) = -23
The discriminant is negative, so there are no real roots.
Final answer:
After rewriting the equation 3p-9p²=6 in standard quadratic form and calculating the discriminant, we find that the discriminant is negative, indicating the equation has d. no real solutions.
Explanation:
To determine the number and type of solutions the equation 3p-9p²=6 has using the discriminant, we first need to rewrite the equation in standard quadratic form, which is ax² + bx + c = 0. Moving all terms to one side gives us -9p² + 3p - 6 = 0, where a = -9, b = 3, and c = -6. The discriminant of a quadratic equation is defined as b² - 4ac.
A discriminant greater than zero indicates two real solutions, equal to zero indicates one real solution, and less than zero indicates no real solutions. Calculating the discriminant for our equation: (3)² - 4(-9)(-6)=9-216=-207, which is less than zero. Therefore, the equation -9p²+ 3p - 6 = 0 has d. no real solutions.
About 99.7% of sixth-grade students will have
heights between _____ inches and _____ inches. the mean is 58 inches and standard deviation is 2.3 inches.
Answer: About 99.7% of sixth-grade students will have
heights between 51.1 inches and 64.9 inches.
Step-by-step explanation:
According to the empirical rule, 99.7% of data falls within the three standard deviations from the mean.
Given : Mean: [tex]\mu=58\text{ inches}[/tex]
Standard deviation:= [tex]\sigma=2.3\text{ inches}[/tex]
Then, the 99.7% of sixth-grade students will have heights between
[tex]\mu-3\sigma[/tex] inches and [tex]\mu+3\sigma[/tex] inches
i.e. [tex]58-3(2.3)[/tex] inches and [tex]58+3(2.3)[/tex] inches
i.e. 51.1 inches and 64.9 inches.
Answer:
About 99.7% of sixth-grade students will have
heights between 51.1 inches and 64.9 inches.
Step-by-step explanation:
Got it right :/
A parallelogram has base 20 cm and height 9 cm. What is its area?
To find the area, you multiply b×h. (Base × height) b=20 and h=9. Multiply it and you will get 180. The answer is 180 cm².
The area of the parallelogram is equal to 180 square meters.
What is an area?The space occupied by any two-dimensional figure in a plane is called the area. The space occupied by the parallelogram in a two-dimensional plane is called as the area of the parallelogram.
Given that a parallelogram has a base of 20 cm and a height of 9 cm. The area of the parallelogram is calculated by the formula,
Area of the parallelogram = Base x Height
Area of the parallelogram = 20 x 9
Area of the parallelogram = 180 square meters
Therefore, the area of the parallelogram is equal to 180 square meters.
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Simplify (-2/3)/(-7/4)
Answer:
8/21
Step-by-step explanation:
(-2/3)/(-7/4)
When dividing, reciprocate the dividend then multiply to the divisor.
Reciprocate
-4/7
Multiply
-2/3 * -4/7
8/21
Answer
8/21
To simplify (-2/3)/(-7/4), we first convert the division operation into multiplication by using the reciprocal of the second fraction. This results in (-2/3)×(-4/7). We, then, multiply the numerators together and the denominators together, leading to the final simplified fraction of 8/21.
Explanation:To simplify this expression, (-2/3)/(-7/4), it is useful to first understand that division is the same as multiplying by the reciprocal. The reciprocal of a fraction is obtained by switching the numerator and the denominator. The reciprocal of (-7/4) is thus (-4/7). Therefore, the expression becomes (-2/3)×(-4/7).
The next step is to multiply the numerators together and the denominators together. So (-2 × -4) / (3 × 7) gives 8/21. The negative signs cancel each other out as a negative time a negative equals a positive.
So therefore (-2/3)/(-7/4) simplifies to 8/21.
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72% of high school students at Wilson High School are attending the homecoming dance. There are 325 students at the school. How many of them ae going to the dance
Answer:
[tex]\large\boxed{234\,\text{students}}[/tex]
Step-by-step explanation:
In this question, we're trying to find how many students are going to the homecoming dance.
To find the answer, we need to use some information that was provided to us from the question.
Important information:
72% of high school students are attending the homecoming danceThere are 325 students at the schoolWith the information above, we can solve the question.
To make this simple, we're going to need to figure out how much of 325 is 72%, due to the fact that we need to find the 72% of students that are going to the dance (out of 325 students).
To do this, we would multiply 325 by 0.72
[tex]325*0.72=234[/tex]
When you multiply, you should get 234.
This means that 234 students from the school are going to the dance.
I hope this helped you out.Good luck on your academics.Have a fantastic day!Approximately 234 out of 325 students at Wilson High School, which constitutes about 72% of the whole body, are attending the homecoming dance.
Explanation:The subject of this question is mathematics, specifically a practical application of percentage calculations. In this scenario, we need to determine the number of students from Wilson High School attending the homecoming dance if 72% of the total student body, which comprises 325 students, is attending.
To solve this, we multiply the total number of students (325) by the percentage of students attending the dance in decimal form (0.72). So, 325 * 0.72 will give us the number of students attending the dance.
After calculating, we find that 234 (rounded to the nearest whole number) students are planning to attend the homecoming dance at Wilson High School.
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the sum of to numbers is 15 and their quotient is 2.
PLEASE HELP MEEE
Answer:
The two numbers are 5 and 10.
Step-by-step explanation:
We need to solve the following system of equations:
We know that:
A + B = 15
A/B = 2
Solving the system of equations we have:
A/B = 2 ⇒ A = 2B
Then:
2B + B = 15 ⇒ 3B = 15 ⇒ B = 5
Then, we need to find A:
A = 10
Answer:
The two numbers are 5 and 10
Step-by-step explanation:
Let x be one number and y be the other number
Their sum is 15
x+y = 15
The quotient is 2
x/y =2
Rewriting this equation by multiplying by y
x/y * y = 2*y
x = 2y
Substitute this into the first equation
2y+ y = 15
Combine like terms
3y = 15
Divide by 3 on each side
3y/3 =15/3
y=5
Now we can find x
x = 2y
x =2(5)
x=10
verify that sin2x=2cotsin^2x is an identity
Answer:
Vertify is an identity
Sin2x=2cotx(sin^2x)
starting from the right-hand side
2cotx(sin^2x)
=2(cosx/sinx)(sin^2x)
=2(cosx/sinx)(sin^2x)
=2sinxcosx=sin2x
ans:right-hand side=left-hand side
Step-by-step explanation:
Step-by-step explanation:
sin^2x = 2cotx sin^2x
Rewrite right side as fractions:
sin^2x = [tex]\frac{2}{1}[/tex] * [tex]\frac{cosx}{sinx}[/tex] * [tex]\frac{(sinx)(sinx)}{1}[/tex]
Multiply together [tex]\frac{cosx}{sinx}[/tex] and [tex]\frac{(sinx)(sinx)}{1}[/tex] :
sin^2x = [tex]\frac{2}{1}[/tex] * [tex]\frac{(cosx)(sinx)(sinx)}{sinx}[/tex]
Cancel out sinx on top and bottom:
sin^2x = [tex]\frac{2}{1}[/tex] * [tex]\frac{(sinx)(cosx)}{1}[/tex]
Multiply together 2 and (sinx)(cosx):
sin^2x = 2sinxcosx
Substitute sin^2x in for 2sinxcosx:
sin^2x = sin^2x
Marvin is buying a watch from his brother
for $130. His brother tells him that he
can pay $30 down and the rest in 10
equal installments.
Answer:
$30 down
and 10 installments of $10 each
Step-by-step explanation:
paying $30 down means the left price to divide into installments is : 130-30 = 100
since he will pay the rest in equal installments, we divide by the number of installments to get how much each one will be :
100/10 = $10
Which of the following is the coordinate for the image of point M(3, –7) after a 90° clockwise rotation?
Answer:
(-7,-3)
Step-by-step explanation:
The rule of 90° clockwise rotation is given below:
If a point (x,y) is rotated 90° clockwise, the new point would be (y, -x)
Since the point M is given as (3,-7), the rotated point will be (-7,-3).
Note: you can graph and check also
Answer:
(-7, -3)
Step-by-step explanation:
Jennifer sold 57 pieces of art if she sold twice as many paintings as sculptures how many painting did she sell??
so we know she has sculptures and paintings, if she sold twice as many paintings as sculptures, that means that for every 2 paintings, she sold 1 sculpture, so the paintings and sculptures are on a 2:1 ratio.
we know she sold a total of 57, so we'll need to split 57 in a 2:1 ratio, we'll simply divide the whole amount of 57 by (2+1) and distribute accordingly.
[tex]\bf \cfrac{paintings}{sculptures}\qquad 2:1\qquad \cfrac{2}{1}\qquad \qquad \cfrac{2\cdot \frac{57}{2+1}}{1\cdot \frac{57}{2+1}}\implies \cfrac{2\cdot 19}{1\cdot 19}\implies \cfrac{\boxed{38}}{19}[/tex]
solve 8x + 3y = 13 3x + 2y = 11 by using elimination. SHOW ALL WORK!! PLEASE HELP!!! THANK YOU SO MUCH!! :)))))
Answer:Y=7
Step-by-step explanation:
-8x-3y = -13 (eq 1)
-3x-2y = -11 (eq 2)
First, multiply equation 1 by 2.
-16x-6y = -26
Second, multiply equation 2 by 3.
-9x-6y = -33
Subtract the system of equations:
-16x-6y = -26
-9x-6y = -33
-7x = 7
x = -1
Substitute this value into one of the original equations to solve for y
-3x-2y = -11
-3(-1)-2y = -11
3-2y = -11
-2y = -14
y = 7
Really hope this helps :)
Hey There!
We have been given:
[tex]8x + 3y = 13 \\ 3x + 2y = 11[/tex]
Find the lcm of 3 and 2 to eliminate one equation:
3 * 2 = 6
2 * 3 = 6
Multiply each equation to get to 6:
[tex]2(8x + 3y = 13)\\ 16x + 6y = 26[/tex]
[tex]3(3x + 2y = 11)\\ 9x+6y=33[/tex]
Eliminate:
[tex]16x + 6y = 26\\ -(9x+6y=33)\\ -9x - 6y=-33[/tex]
Simplify:
[tex]16x + 6y = 26\\ -9x - 6y=-33 \\ 7x = -7[/tex]
Solve for x by dividing 7 in both sides:
[tex]7x = -7\\ x = -1[/tex]
Solve for y by substituting x in any equation with -1:
[tex]8(-1) + 3y = 13[/tex]
Simplify:
[tex]-8 + 3y = 13[/tex]
Add 8 in both sides:
[tex]3y = 21[/tex]
Solve for y by dividing 3 in both sides:
[tex]y = 7[/tex]
The value of x is -1 and the value of y is 7
Our answers:
x = -1
y = 7
Really don’t understand help. With picture
[tex]\bf \textit{Jim's Gym}\\\\ \begin{array}{cccll} initial~fee&visits&cost\\ \cline{1-3} 300&1&300+3(1)\\ &2&300+3(2)\\ &3&300+3(3)\\ &4&300+3(4)\\ &x&300+3(x) \end{array}\implies y = 300+3x \\\\[-0.35em] ~\dotfill\\\\ \textit{Sally's Salon}\\\\ \begin{array}{cccll} initial~fee&visits&cost\\ \cline{1-3} 250&1&250+5(1)\\ &2&250+5(2)\\ &3&250+5(3)\\ &4&250+5(4)\\ &x&250+5(x) \end{array}\implies y = 250+5x[/tex]
when are the plans equal?
[tex]\bf \stackrel{Jim's}{300+3x}~~=~~\stackrel{Sally's}{250+5x}\implies 50+3x=5x \\\\\\ 50=2x\implies \cfrac{50}{2}=x\implies 25=x[/tex]
So, we can start off by just listing the facts.
The Initial fee for Jim's Gym has an initial fee of $300, and Sally's Salon has an initial fee of $250. Every visit to Jim's Gym costs $3, and Sally's Salon costs $5.
The question is using the variable x, in which x represents the number of visits that person has made.
So the equation for Jim's Gym is 300 + 3x (since, like we've established earlier, it costs $3 per visit.
The equation for Sally's Salon is 250 + 5x (since it costs $5 per visit)
Since we're trying to equalize costs, make the entire equation
300 + 3x = 250 + 5x
Subtract both sides by 250
50 + 3x = 5x
Subtract both sides by 3x
50 = 2x
Divide both sides by 2
x = 25
Option D is the answer.
Which equation can be used to find the measure of angle BAC?
Answer:
Step-by-step explanation:
let angle [tex]B[/tex] . be [tex]y[/tex] then,
using angle sum property,
x+y+90=180 (angle c is 90 because its given)
hence you have the equation
Answer:
Cos() = AC / AB
So in this case: Cos() = 5 / 13
A bag contains 5 blue marbles , 2 black marbles and 3 red marbles .a marble is randomly drawn from the bag the probability of not drawing a black marble is . The probability of drawing a red marble is
Answer: not a black marble: 4/5
Red marble: 3/10
Step-by-step explanation: Count the number of marbles.
5+2+3=10
The total number of marbles that aren’t black are 8 out of 10. The fraction is 8/10. It can be simplified to 4/5.
The number of red marbles is 3 out of 10. As a fraction, it’s 3/10.
Help with number two
Answer:
y = -2x+1
Step-by-step explanation:
We have a point and a slope, so we can use the point slope form of a line
y-y1 = m(x-x1) where m is the slope and (x1,y1) is the point
y-3 = -2(x--1)
y-3=-2(x+1)
Distribute the 2
y-3 = -2x-2
Add 3 to each side
y-3+3 = -2x-2+3
y = -2x+1
This is in slope intercept form
In the formula for average rate of change, what does the triangle in front of the x and y stand for?
Answer:
It a delta notation that change in y over change in x
Answer:
C
Step-by-step explanation:
Edge 2021
Lisa's dog is 11 pounds heavier than Marcia's dog. Let m represent the weight of Marcia's dog. Write a variable expression to represent the weight of Lisa's dog.
Answer:
The required variable expression is [tex]L= M + 11[/tex]
Step-by-step explanation:
Consider the provided information.
Let m represent the weight of Marcia's dog.
Let L represent the weight of Lisa's dog.
Lisa's dog is 11 pounds heavier than Marcia's dog.
That means if we add 11 pounds in Marcia's dog weight, the weight of Marcia's dog will be equal to Lisa's dog.
This can be written as:
[tex]L= M + 11[/tex]
Where m represent the weight of Marcia's dog and L represent the weight of Lisa's dog.
Hence, the required variable expression is [tex]L= M + 11[/tex]
You went shopping for batteries. Your bill was $14.39. How many 9-volt batteries did you purchase at $2.39 each if AA batteries cost $1.61 each and you purchased 3 of them ?
Answer:
u bought 4 9-volt batteries and
the cost of the 3 AA batteries bought is $4.83
To find out how many 9-volt batteries were bought, you first need to subtract the total cost of AA batteries ($4.83) from the total bill ($14.39) to get the total spent on 9-volt batteries. Then, divide this total by the price of each 9-volt battery ($2.39). The result is 4, so you bought 4 9-volt batteries.
Explanation:To answer this question, let's first determine how much the total purchase of the AA batteries was. Since AA batteries cost $1.61 each and you bought 3, the total cost for the AA batteries is 3 * $1.61 = $4.83.
Now we need to figure out how much was spent on 9-volt batteries. Subtract the cost of the AA batteries from the total bill: $14.39 - $4.83 = $9.56. This is the total cost of the 9-volt batteries.
The price of each 9-volt battery is $2.39, so to find out how many batteries were bought we divide the total cost of 9-volt batteries by the price of each battery: $9.56 / $2.39 ≈ 4. Therefore, you bought 4 9-volt batteries.
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Identifying Slope and y-Intercept of a Line
Identify the slope and y-intercept of each linear function's equation
y = 1 - 3x
slope = 3 y-intercept at -1
y = 3x - 1
slope = -1 y-intercept at 3
X-3 = y
slope = -3; z-intercept at 1
--> + 3 = y
slope = 1:y-intercept at -3
Previous Activity
Step-by-step explanation:
The slope-intercept form of an equation of a line:
y = mx + b
m - slope
b - y-intercept
y = 1 - 3x = -3x + 1
slope = -3
y-intercept at 1
y = 3x - 1
slope = 3
y-intercept at -1
x - 3 = y → y = 1x - 3
slope = 1
y-intercept at -3
x + 3 = y → y = 1x + 3
slope = 1
y-intercept at 3
Complete the square to transform the expression x2 + 4x + 2 into the form a(x − h)2 + k.
Answer:
Step-by-step explanation:
y = (x^2 + 4x) + 2
Take 1/2 of the linear term 4/2 = 2 and square that result. 2^2 = 4.
Put it after 4x
y = (x^2 + 4x + 4) +2 Subtract what you put inside the brackets on the outside.
y = (x^2 + 4x + 4) + 2 - 4 Combine the right.
y = (x^2 + 4x + 4) - 2 Express the brackets as a square.
y = (x + 2)^2 - 2
That's your answer
a = 1
h = 2
k = -2
Answer:
(x + 2)2 − 2
Step-by-step explanation:
Just took the test and got it right
You need a 45% alcohol solution. On hand, you have a 350 mL of a 15% alcohol mixture. You also have 70% alcohol mixture. How much of the 70% mixture will you need to add to obtain the desired solution?
You will need
_____ mL of the 70% solution
Answer:
420
Step-by-step explanation:
Amount in the 45% solution + amount in the 70% solution = amount in the 45% solution
0.15 × 350 + 0.70 × V = 0.45 × (350 + V)
52.5 + 0.70V = 157.5 + 0.45V
0.25V = 105
V = 420
You need 420 mL of the 70% solution.
After setting up and solving a weighted average equation, the result reveals that you would need 1050 mL of the 70% alcohol solution to achieve the desired 45% alcohol solution.
Explanation:To solve this problem, we can use the concept of weighted averages. The final volume of alcohol in the 45% solution will be the sum of the alcohol in the 15% solution and the 70% solution. Let's denote the volume of the 70% solution we need to add as X ml. So, the equation will be:
0.15 × 350 + 0.70 × X = 0.45 × (350 + X)
Solving this equation will give us the amount of 70% solution needed. After simplifying, you get:
52.5 + 0.7X = 157.5 + 0.45X
Further simplification gives:
0.7X - 0.45X = 157.5 - 52.5
Therefore, X = 1050 ml. So, you will need 1050 ml of the 70% solution.
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Find the mean absolute deviation to the nearest cent. Explain what this value represents.
Answer:
134.38
This value represents 134.38
Step-by-step explanation:
Find the mean.
950+620+545+810+775+1120+905+775=6500
6500/8=812.5
Subtract the mean of numbers.
950-812.5=137.5
812.5-620=192.5
812.5-545=267.5
812.5-810=2.5
812.5-775=37.5
1120-812.5=307.5
905-812.5=92.5
812.5-775=37.5
Find the mean.
137.5+192.5+267.5+2.5+37.5+307.5+92.5+37.5=1075
1075/8≈134.38
This means that 134.38 is $134.38
MAD
To find the MAD of the data, you must first find the mean. To do this, simply add all the numbers up and divide by the number of data values.
950+620+545+810+775+1120+905+775=812.5
So the mean is 812.5 ($812.5).
The final step to finding the MAD is to difference between each data value and the mean.
|950-812.5| + |620-812.5| + |545-812.5| + |810-812.5| + |775-812.5| + |1120-812.5| + |905-812.5| + |775-812.5|
137.5 + 192.5 + 265.5 + 2.5 + 37.5 + 307.5 + 92.5 + 37.5/8
1073/8=9.625
So, 134.125 is the answer.
BUT... the question said round to the nearest cents. So, it's 13413 cents.
HELP ASAP I WILL GIE 100 POINTS AND BRANLIEST HELP ASAP
Answer:
m=-1
Step-by-step explanation:
9m+13 =4
Subtract 13 from each side
9m+13-13 =4-13
9m = -9
Divide each side by 9
9m/9 = -9/9
m = -1
Answer:
m=-1
Step-by-step explanation:
Factor the expression 18x^2 - 8
Answer:
2(3x-2(3x+2)
Step-by-step explanation:
1) 18x^2-8
2) 2(9x^2-4)
3) 2(3x-2)(3x+2)
Answer:
2(3x-2(3x-2) instead of the + 2
Step-by-step explanation:
???????? Help me please
Answer:
D. (1, 9)
Step-by-step explanation:
Plug in each ordered pair into both inequalities. If both inequalities are satisfied, then the ordered pair is a solution.
The only ordered pair that works is (1, 9).
how to find perimeter of ceiling
Answer:
add up the lengths of all the sides of the ceiling,is there a diagram that comes with this or something?
Step-by-step explanation:
Answer: multiply
Step-by-step explanation: you must multiply length x width
How to graph a continuous function
Answer:
There are several ways to graph a continuous function. I advise you to graph several points that belongs to the function and then join the points.
If the function is linear, two points will be enough to build the graph. If we have functions of higher degree, is better to plot some points, observe the pattern and then join the points.
If the function is extremly difficult to graph by hand, the help of a graphing calculator may be needed.
To graph a continuous function, identify the independent and dependent variables, ensure the values on axes are evenly spaced, plot values as coordinates, and draw a smooth curve connecting the points without lifting the pen. The area under the graph is significant in calculus for representing continuous change, and for continuous probability distributions, it defines the probability as the area under the curve.
To graph a continuous function, first identify your independent and dependent variables. The independent variable is typically placed on the X-axis, while the dependent variable goes on the Y-axis. Ensure the scales for both axes are evenly spaced to accurately represent the continuous values. After setting up the axes, plot the pairs of values that the function defines as x and y coordinates. For a continuous function, you should be able to draw the curve connecting these points without lifting your pen off the paper.
In the context of calculus, the area under the graph represents the aggregation of continuous change over an interval, which differs from discrete sums used for step changes. This is critical when working with functions to determine areas, volumes, or growth over an interval. As such, if you are graphing a function like f(x) = x², you would plot points for x values from the interval and then draw a smooth curve through those points to represent the function continuously.
When considering continuous probability distributions, the graph will depict a curve known as the probability density function (pdf). Probability is calculated as the area under the curve, emphasizing the importance of a continuous, unbroken line in representing these types of distributions.