Consider that lines B and C are parallel. What is the value of x? What is the measure of the smaller angle?
Answer:
the awncer would be x=0
Step-by-step explanation:
.
Express the fraction 2/7 as a rounded decimal?
Answer:
Pick an answer from below.
Step-by-step explanation:
Rounded to which place?
2/7 = 0.285714285714...
Nearest tenth: 0.3
Nearest hundredth: 0.29
Nearest thousandth: 0.286
Nearest ten-thousandth: 0.2857
etc.
Answer:
0.29
Step-by-step explanation:
To convert fractions to decimals, divide the numerator by the denominator.
2/7= 0.285
Round 0.285 to 0.29
The measure of one angle of a right triangle is 44∘ more than the measure of the smallest angle. Find the measures of all three angles.
Answer:
Smallest angle = 23
Middle angle = 23 + 44 = 67
Right angle = 90
Step-by-step explanation:
Givens
Let the smallest angle = x
Let the middle angle = x + 44
Let the right angle = 90 which it always does.
All triangles = 180 degrees.
Equation
x + x + 44 + 90 = 180
Solution
2x + 44 + 90 = 180 Combine the left
2x + 134 = 180 Subtract 134 from both sides
2x +134-134 = 180 - 134 Combine
2x = 46 Divide by 2
2x/2 = 46/2 Do the division
x = 23
do you know the answer plz help me and thank you if you know the answer
Answer: 8 remainder 2
Step-by-step explanation:
3 • 8 = 24
26 - 24 = 2
Your answer is 8 with a remainder of 2
Answer:
8 r2
Step-by-step explanation:
A combination lock like the one shown below has three
dials. Each of the dials has numbers ranging from 1 to 25. If
repeated numbers are allowed, how many different
combinations are possible with the lock?
Answer:
15625
Step-by-step explanation:
Let us consider each dial individually.
We have 25 choices for the first dial.
We then have 25 choices for the second dial.
We then have 25 choices for the third dial.
Let us consider any particular combination, the probability that combination is right is (probability the first number is right) * (probability the second number is right) * (probability the third number is right) = 1/25 * 1/25 * 1/25 = 1/15625
Therefore there are 15625 combinations
For the given functions f and g, find the requested function and state its domain.
f(x) = 8x - 3; g(x) = 4x - 9
Find f - g.
Answer:
4x+6
Step-by-step explanation:
f(x)=8x-3
g(x)=4x-9
f(x)-g(x) = 8x-3-(4x-9)=8x-3-4x+9=4x+6
The value of f(x) - g(x) is 4x+6 and The domain is all real value of x.
What is a function ?A function can be defined as a mathematical expression which establishes relation between a dependent variable and an independent variable.
It always comes with a defined range and domain.
It is given in the question
functions f and g
f(x) = 8x - 3; g(x) = 4x - 9
f- g = ?
The value of f(x) - g(x) = 8x -3 - (4x -9)
f(x) - g(x) = 8x -3 - 4x +9
f(x) - g(x) = 4x +6
h(x) = 4x+6
The domain is all real value of x.
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The Jamison family kept a log of the distance they traveled during a trip, as represented by the graph below.
distance
(1,40)
(2,110)
(4,180)
(6,230)
(8,350)
(10,390)
Elapsed Time (hours)
During which interval was their average speed the greatest?
(1) the first hour to the second hour
(2) the second hour to the fourth hour
(3) the sixth hour to the eighth hour
(4) the eighth hour to the tenth hour
The average speed is the ratio of the total distance traveled to the time taken
The correct option for the interval with the greatest average speed is option (1) the first hour to the second hour
The procedure by which the above option was arrived at is as follows:
The given table of values for the graph is presented as follows;
[tex]\begin{array}{|c|cc|} \mathbf{Time}&&\mathbf{Distance}\\1&&40\\2&&110\\4&&180\\6&&230\\8&&350\\10&&390\end{array}\right][/tex]
[tex]Average \ speed = \dfrac{Distance}{Time}[/tex]
The average speed of each interval in distance per hour are given as follows;
[tex]First \ and \ second \ hour, \ average \ speed = \dfrac{110 - 40}{2 - 1} = 70[/tex]
[tex]Second \ and \ fourth \ hour, \ average \ speed = \dfrac{180 - 110}{4 - 2} = 35[/tex]
[tex]Sixth \ and \ eight \ hour, \ average \ speed = \dfrac{350 - 230}{8 - 6} = 60[/tex]
[tex]Eight \ and \ tenth \ hour, \ average \ speed = \dfrac{390 - 350}{10 - 8} = 20[/tex]
Therefore the interval in which their average speed was the greatest is the first hour to the second hour
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The hypotenuse of a 45°-45°-90° triangle measures 128 cm. What is the length of one leg of the triangle? 64 cm cm 128 cm cm
Answer:
Answer 64*sqrt(2)
Step-by-step explanation:
Givens
c = 128 cm
a = b = ??
formula
a^2 + b^2 = c^2 combine the two equal legs.
2a^2 = c^2 Substitute 128 for c
2a^2 = 128^2 Square
2a^2 = 16384 Divide by 2
a^2 = 16384/2
a^2 = 8192 Factor (8192)
8192 = 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2 * 2 count the 2s
8192 = 2^13 Break 13 into 2 equal values with 1 left over
sqrt(8192) = sqrt(2^6 * 2^6 * 2^1)
sqrt(8192) = 2^6 * sqrt(2)
The length of one leg is 64*sqrt(2)
Answer:
Length of one leg of the given triangle will be 64√2 cm.
Step-by-step explanation:
Length of the hypotenuse of a 45°- 45°- 90° triangle has been given as 128 cm.
Since two angles other than 90° are of same measure so other two sides of the triangle will be same in measure.
Therefore, by Pythagoras theorem,
Hypotenuse² = Leg(1)² + Leg(2)²
Let the measure of both the legs is x cm
(128)² = 2x²
16384 = 2x²
x² = [tex]\frac{16384}{2}[/tex]
x² = 8192
x = √8192
= 64√2 cm
Therefore, length of one leg of the given triangle will be 64√2 cm.
Scenario:
A rectangular plot of ground is 5 meters longer than it is wide. Its area is 20,000 square meters.
Question:
What equation will help you find the dimensions?
Note: Let W represent the width.
Options:
w(w+5)=20,000
w^2=20,000+5
(w(w+5))/2=20,000
w+2(w+5)=20,000
To find the area you multiply the length by the width.
W = the width, and you are told the length is 5 meters longer, so the length would be (W +5)
Now multiply those together to equal 20,000 square meters:
w(w+5) = 20,000
The lunch lady has 5 pounds of lasagna left over. If she
makes 1 pound servings, how many servings of lasagna
can she serve with the amount left over?
With 5 pounds of lasagna, where each serving is 1 pound, the lunch lady can make 5 servings of lasagna.
Explanation:The subject of this question is simple division in Mathematics. The problem states that the lunch lady has 5 pounds of lasagna left over and each serving is 1 pound. So, to find out how many servings of lasagna can be made, we divide the total amount of lasagna (5 pounds) by the size of each serving (1 pound).
5 pounds / 1 pound per serving = 5 servings
Therefore, the lunch lady can serve 5 servings of lasagna with the amount left over.
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if f(x) = -3x+4 and g(x) =2, solve for the value of x for which f(x) = g(x) is true
Answer: 0.67 (to 3 s.f)
Step-by-step explanation:
f(x)=g(x)
-3x + 4 = 2
-3x = -2
x = 2/3
x = 0.67
Hope it helped
Round $499.76 to the nearest dollar
This is your answer:
if then number is $499.49 that would mean it rounds down to $499.00
but in your case $499.76 rounds to $500.00
(Remember .50 and up goes up!)
Therefor your answer is $500.00
Answer:
$499.76 rounded to the nearest dollar is $500 !!
Step-by-step explanation:
Why?
A dollar ($1) would be in the ones column and it's asking for the nearest dollar! So you would round it by the number on the right of the dollar, the tenths.
x+16=24hvvcgcfcycdfdxfxxdgfv
To do solve this you must isolate x. First subtract 16 to both sides (what you do on one side you must do to the other). Since 16 is being added to x, subtraction (the opposite of addition) will cancel it out (make it zero) from the left side and bring it over to the right side.
x + (16 - 16) = 24 - 16
x = 8
Check:
8 + 16 = 24
24 = 24
Hope this helped!
~Just a girl in love with Shawn Mendes
if you subtract 16 from both sides you would get x=8
If sin θ=24/25 and 0 less than or equal to θ less than or equal to π/2, find the exact value of tan 2θ.
Answers;
A) -527/336
B) -336/527
C)7/24
D) 24/7
Answer:
Option B. [tex]tan(2\theta)= -\frac{336}{527}[/tex]
Step-by-step explanation:
we know that
[tex]tan(2\theta)= \frac{sin(2\theta)}{cos(2\theta)}[/tex]
[tex]sin(2\theta)=2(sin(\theta))(cos(\theta))[/tex]
[tex]cos(2\theta)=cos^{2}(\theta)-sin^{2}(\theta)[/tex]
[tex]cos^{2}(\theta)+sin^{2}(\theta)=1[/tex]
we have
[tex]sin(\theta)=\frac{24}{25}[/tex]
step 1
Find the value of cosine of angle theta
[tex]cos^{2}(\theta)+sin^{2}(\theta)=1[/tex]
[tex]cos^{2}(\theta)+(\frac{24}{25})^=1[/tex]
[tex]cos^{2}(\theta)=1-\frac{576}{625}[/tex]
[tex]cos^{2}(\theta)=\frac{49}{625}[/tex]
[tex]cos(\theta)=\frac{7}{25}[/tex]
The value of cosine of angle theta is positive, because angle theta lie on the I Quadrant
step 2
Find [tex]sin(2\theta)[/tex]
[tex]sin(2\theta)=2(sin(\theta))(cos(\theta))[/tex]
we have
[tex]sin(\theta)=\frac{24}{25}[/tex]
[tex]cos(\theta)=\frac{7}{25}[/tex]
substitute
[tex]sin(2\theta)=2(\frac{24}{25})(\frac{7}{25})[/tex]
[tex]sin(2\theta)=\frac{336}{625}[/tex]
step 3
Find [tex]cos(2\theta)[/tex]
[tex]cos(2\theta)=cos^{2}(\theta)-sin^{2}(\theta)[/tex]
we have
[tex]sin(\theta)=\frac{24}{25}[/tex]
[tex]cos(\theta)=\frac{7}{25}[/tex]
substitute
[tex]cos(2\theta)=(\frac{7}{25})^{2}-(\frac{24}{25})^{2}[/tex]
[tex]cos(2\theta)=(\frac{49}{625})-(\frac{576}{625})[/tex]
[tex]cos(2\theta)=-\frac{527}{625}[/tex]
step 4
Find the value of [tex]tan(2\theta)[/tex]
[tex]tan(2\theta)= \frac{sin(2\theta)}{cos(2\theta)}[/tex]
we have
[tex]sin(2\theta)=\frac{336}{625}[/tex]
[tex]cos(2\theta)=-\frac{527}{625}[/tex]
substitute
[tex]tan(2\theta)= -\frac{336}{527}[/tex]
By using the Pythagorean identity and the double angle identity for tangent, it is found that the value of tan 2θ when sin θ =24/25 and 0 ≤ θ ≤ π/2 is -527/336.
Explanation:In the field of Mathematics, particularly in trigonometric equations, the problem given is asking for the value of tan 2θ, given that sin θ=24/25 and 0 ≤ θ ≤ π/2.
Firstly, we can find cos θ by using the Pythagorean identity sin²θ + cos²θ = 1. This gives us cos θ = sqrt (1 - sin²θ) = sqrt (1 - (24/25)²) = 7/25.
Then, knowing that tan θ = sin θ/cos θ, we can plug in these values to get tan θ = (24/25) / (7/25) = 24/7. Finally, using the double angle identity for tan (tan 2θ = 2 tan θ / (1 - tan²θ)), we can find that tan 2θ = 2(24/7) / (1 - (24/7)²) = -527/336.
So, the exact value of tan 2θ when sin θ =24/25 and 0 ≤ θ ≤ π/2 is -527/336, which is answer option A.
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A takes 3 hours more than B to walk 30 km. But if A doubles his pace, he is ahead of B by 3/2 hours . Find their speed of walking.
Answer:
Initial speed:
A: [tex]\displaystyle \rm \frac{10}{3}\; km/ h[/tex].B: [tex]\rm 5\; km/ h[/tex].Step-by-step explanation:
Both equations are concerned about the time differences between A and B. To avoid unknowns in the denominators,
let [tex]x[/tex] be the initial time in hours for A to walk 30 km, andlet [tex]y[/tex] be the time in hours for B to walk 30 km.First equation:
"A takes 3 hours more than B to walk 30 km."
[tex]x = y + 3[/tex].
[tex]x - y = 3[/tex].
When A doubles his pace, he takes only 1/2 the initial time to cover the same distance. In other words, now it takes only [tex]x/2[/tex] hours for A to walk 30 km.
Second equation:
"[A] is ahead of B by 3/2 hours [on their 30-km walk.]"
[tex]\displaystyle \frac{x}{2} + \frac{3}{2} = y[/tex].
[tex]\displaystyle \frac{1}{2}x - y = -\frac{3}{2}[/tex].
Hence the two-by-two linear system:
[tex]\left\{\begin{aligned}&x - y = 3\\&\frac{1}{2}x - y = -\frac{3}{2}\end{aligned}\right.[/tex].
Solve this system for [tex]x[/tex] and [tex]y[/tex]:
Subtract the second equation from the first:
[tex]\displaystyle \frac{1}{2}x = \frac{9}{2}[/tex].
[tex]x = 9[/tex].
[tex]y = 6[/tex].
It initially takes 9 hours for A to walk 30 kilometers. The initial speed of A will thus be:
[tex]\displaystyle v = \frac{s}{t} = \rm \frac{30\; km}{9\; h} = \frac{10}{3}\; km/h[/tex].
It takes 6 hours for B to walk 30 kilometers. The speed of B will thus be:
[tex]\displaystyle v = \frac{s}{t} = \rm \frac{30\; km}{6\; h} = 5\; km/h[/tex].
Suppose a triangle has two sides of length 2 and 3 and hat angle between these two sides is 60. what is the length of the third side of he triangle?
How can I round decimals
Answer:
Find the place value you want (the "rounding digit") and look at the digit just to the right of it.
If that digit is less than 5, do not change the rounding digit but drop all digits to the right of it.
If that digit is greater than or equal to five, add one to the rounding digit and drop all digits to the right of it.
Step-by-step explanation:
Step-by-step explanation: To round a decimal, you first need to know the indicated place value position you want to round to. This means that you want to first find the digit in the rounding place which will usually be underlined.
Once you locate the digit in the rounding place, look to the left of that digit. Now, the rules of rounding tell us that if a number is less than 4, we round down but if a number is greater than or equal to 5, we round up.
I'll show an example.
Round the following decimal to the indicated place value.
0.8005
To round 0.8005 to the indicated place value position, first find the digit in the rounding place which in this case is the 0 in the thousandths place.
Next, find the digit to the right of the rounding place which in this case is 5. Since 5 is greater than or equal to 5, we round up.
This means we add 1 to the digit in the rounding place so 0 becomes 1. So we have 0.801. Now, we change all digits to the right of the rounding place to 0 so 5 changes to 0.
Finally, we can drop of any zeroes to the right of our decimal as long as they're also to the right of the rounding position.
So we can write 0.8010 as 0.801.
Image provided.
Please help !!!!!urgent !!!!!Which statement is true according to the diagram ??
Answer:
the second one
needdd hellpppppssssssss
Answer:
Choice number one:
[tex]\displaystyle \frac{5}{10}\cdot \frac{4}{9}[/tex].
Step-by-step explanation:
Let [tex]A[/tex] be the event that the number on the first card is even.Let [tex]B[/tex] be the event that the number on the second card is even.The question is asking for the possibility that event [tex]A[/tex] and [tex]B[/tex] happen at the same time. However, whether [tex]A[/tex] occurs or not will influence the probability of [tex]B[/tex]. In other words, [tex]A[/tex] and [tex]B[/tex] are not independent. The probability that both [tex]A[/tex] and [tex]B[/tex] occur needs to be found as the product of
the probability that event [tex]A[/tex] occurs, andthe probability that event [tex]B[/tex] occurs given that event [tex]A[/tex] occurs.5 out of the ten numbers are even. The probability that event [tex]A[/tex] occurs is:
[tex]\displaystyle P(A) = \frac{5}{10}[/tex].
In case A occurs, there will only be four cards with even numbers out of the nine cards that are still in the bag. The conditional probability of getting a second card with an even number on it, given that the first card is even, will be:
[tex]\displaystyle P(B|A) = \frac{4}{9}[/tex].
The probability that both [tex]A[/tex] and [tex]B[/tex] occurs will be:
[tex]\displaystyle P(A \cap B) = P(B\cap A) = P(A) \cdot P(B|A) = \frac{5}{10}\cdot \frac{4}{9}[/tex].
the sum and express it in simplest
(-6b3 - 362.6) + (2b3 - 362)
Enter the correct answer.
Answer:
[tex]\large\boxed{(-6b^3-362.6)+(2b^3-362)=-4b^3-724.5}[/tex]
Step-by-step explanation:
[tex](-6b^3-362.6)+(2b^3-362)\\\\=-6b^3-362.6+2b^3-362\qquad\text{combine like terms}\\\\=(-6b^3+2b^3)+(-362.5-362)\\\\=-4b^3-724.5[/tex]
Which answer is right please help
Answer:
A
Step-by-step explanation:
Linear functions go into a straight line in order
Y in set b goes from 2 to 1250 so it is traveling much faster than set A
What are the solutions of the equation?
0 = x2 + 3x - 10
Ox=5.2
Ox=-5,-2
x = -5,2
x=5-2
Answer:
Step-by-step explanation:
0 = x2 + 3x - 10
10 = 2x+3x
10 = 5x
x = 2
0x = 5.2
0x = 10
x = 10.2 = 20
x = 20
0x = -5.-2
0x = -10
x = -10.2 = -20
x = -20
x = -5.2
x = -10
x = 5-2
x = 3
GOOD LUCK ! ;)
what is the equation of the circle with Center (-6, 7) that passes through the point (4, -2)
we know the center of the circle, and we also know a point on the circle, well, the distance from the center to a point is just the radius.
[tex]\bf ~~~~~~~~~~~~\textit{distance between 2 points} \\\\ (\stackrel{x_1}{-6}~,~\stackrel{y_1}{7})\qquad (\stackrel{x_2}{4}~,~\stackrel{y_2}{-2})\qquad \qquad d = \sqrt{( x_2- x_1)^2 + ( y_2- y_1)^2} \\\\\\ \stackrel{radius}{r}=\sqrt{[4-(-6)]^2+[-2-7]^2}\implies r=\sqrt{(4+6)^2+(-2-7)^2} \\\\\\ r=\sqrt{10^2+(-9)^2}\implies r=\sqrt{100+81}\implies r=\sqrt{181} \\\\[-0.35em] ~\dotfill[/tex]
[tex]\bf \textit{equation of a circle}\\\\ (x- h)^2+(y- k)^2= r^2 \qquad center~~(\stackrel{-6}{ h},\stackrel{7}{ k})\qquad \qquad radius=\stackrel{\sqrt{181}}{ r}\\[2em] [x-(-6)]^2+[y-7]^2=(\sqrt{181})^2\implies (x+6)^2+(y-7)^2=181[/tex]
What is the solution set of the quadratic inequality f(x) greater than or equal to 0
ANSWER
{[tex]x | x \in \: R[/tex]}
EXPLANATION
From the graph, the given quadratic inequality is
[tex] {(x + 3)}^{2} \geqslant 0[/tex]
We can see that the corresponding quadratic function is a perfect square.
Since the graph opens upwards and it is always above the x-axis, any real number you plug into the inequality, the result is greater than or equal to zero.
Hence the solution set is
{[tex]x | x \in \: R[/tex]}
The correct answer is A
Solve the equation 1/t-2=t/8
Answer:
Two solutions were found :
t =(16-√288)/-2=8+6√ 2 = 0.485
t =(16+√288)/-2=8-6√ 2 = -16.48
Step-by-step explanation:
Answer:
-IF THE EQUATION IS [tex]\frac{1}{t-2}=\frac{t}{8}[/tex], THEN:
[tex]t_1=4\\t_2=-2[/tex]
-IF THE EQUATION IS [tex]\frac{1}{t}-2=\frac{t}{8}[/tex], THEN:
[tex]t_1=-16.485\\t_2=0.485[/tex]
Step-by-step explanation:
-IF THE EQUATION IS [tex]\frac{1}{t-2}=\frac{t}{8}[/tex] THE PROCEDURE IS:
Multiply both sides of the equation by [tex]t-2[/tex] and by 8:
[tex](8)(t-2)(\frac{1}{t-2})=(\frac{t}{8})(8)(t-2)\\\\(8)(1)=(t)(t-2)\\\\8=t^2-2t[/tex]
Subtract 8 from both sides of the equation:
[tex]8-8=t^2-2t-8\\\\0=t^2-2t-8[/tex]
Factor the equation. Find two numbers whose sum be -2 and whose product be -8. These are -4 and 2:
[tex]0=(t-4)(t+2)[/tex]
Then:
[tex]t_1=4\\t_2=-2[/tex]
-IF THE EQUATION IS [tex]\frac{1}{t}-2=\frac{t}{8}[/tex] THE PROCEDURE IS:
Subtract [tex]\frac{1}{t}[/tex] and [tex]2[/tex]:
[tex]\frac{1}{t}-2=\frac{t}{8}\\\\\frac{1-2t}{t}=\frac{t}{8}[/tex]
Multiply both sides of the equation by [tex]t[/tex]:
[tex](t)(\frac{1-2t}{t})=(\frac{t}{8})(t)\\\\1-2t=\frac{t^2}{8}[/tex]
Multiply both sides of the equation by 8:
[tex](8)(1-2t)=(\frac{t^2}{8})(8)\\\\8-16t=t^2[/tex]
Move the [tex]16t[/tex] and 8 to the other side of the equation and apply the Quadratic formula. Then:
[tex]t^2+16t-8=0[/tex]
[tex]t=\frac{-b\±\sqrt{b^2-4ac}}{2a}\\\\t=\frac{-16\±\sqrt{16^2-4(1)(-8)}}{2(1)}\\\\t_1=-16.485\\t_2=0.485[/tex]
The table shows the distance traveled over time while traveling at a constant speed.

What is the ratio of the change in y-values to the change in x-values?
1:900
1:1,200
900:1
1,200:1
Answer: Last option.
Step-by-step explanation:
You can observe in the table provided that the values of "x" represent the time in minutes and the values of "y" represent the distance in meters.
Then, in order to find the ratio of the change in y-values to the change in x-values, you can divide any value of "y" (distance) by its corresponding value of "x" (time).
So, this is:
[tex]\frac{2,400}{2}=\frac{1,200}{1}[/tex]
Since the ratio can also be written in the form [tex]a:b[/tex], you get:
[tex]1,200:1[/tex]
Answer:
D) 1,200 meters per minute
Step-by-step explanation:
What is the value of –2|6x – y| when x = –3 and y = 4?
Answer:
-44
Step-by-step explanation:
We have the expression
[tex]-2|6x - y|[/tex]
We need to find the value of the expression when x = -3 and y = 4
Then we must replace the variable with the number -3 and the variable y with the number 4
This is:
[tex]-2|6(-3) - (4)|[/tex]
[tex]-2|-18 - 4|[/tex]
[tex]-2|-22|[/tex]
Remember that the absolute value always results in a positive number.
So
[tex]-2|-22| = -2(22)=-44[/tex]
the answer is -44
Answer:
The correct answer is -44
Step-by-step explanation:
Points to remember
|x| = x
|-x| = x
To find the value of –2|6x – y|
We have –2|6x – y| When x = -3 and y = 4
Substitute the value of x and y
–2|6x – y| = –2|(6 * -3) – 4|
= -2|-18 - 4|
= -2|-22|
= -2 * 22
= -44
Therefore the value of –2|6x – y| when x = -3 and y = 4
–2|6x – y|
What is the quadratic function to these three points (-1,-11), (0,-3), and (3,-27)
Answer:
y = -4x² + 4x -3
Step-by-step explanation:
The standard form of quadratic equation is:
y = ax² + bx + c
We need to use the points given to find the value of a, b and c
We are given point (-1,-11) where x =-1 and y=-11 putting values in the above equation
y = ax² + bx + c
-11 = a(-1)² + b(-1) +c
-11 = a -b+c eq(1)
Now putting the point(0, -3) where x =0 and y =-3
y = ax² + bx + c
-3 = a(0)² + b(0) + c
-3 = 0 + 0 + c
=> c = -3
Now Putting the point (3, -27) where x =3 and y = -27
y = ax² + bx + c
-27 = a(3)² +b(3) + c
-27 = 9a + 3b + c eq(2)
Putting value of c= -3 in eq(2)
-27 = 9a + 3b -3
-27 +3 = 9a +3b
-24 = 9a + 3b
=> 3(3a+b) = -24
3a + b = -24/3
3a + b = -8 eq(3)
Putting value of c= -3 in eq(1)
-11 = a -b+c
-11 = a -b -3
-11 + 3 = a - b
-8 = a - b
=> a - b = -8 eq(4)
Now adding eq(3) and eq(4)
3a + b = -8
a - b = -8
__________
4a = -16
a = -16/4
a = -4
Putting value of a in equation 4
a - b = -8
-4 -b = -8
-b = -8+4
-b = -4
=> b = 4
The values of a , b and c are a= -4, b =4 and c= -3
Putting these values in standard quadratic equation
y = ax² + bx + c
y = -4x² + 4x -3
consider each table of values
of the three functions,
f & h
none
f & g
g & h
all three
represent linear relationships
Answer:
g and h
Step-by-step explanation:
both g and h have constant relationships while f's f(x) values aren't constant so it doesn't have a linear relationship
Answer:
Of the three functions g and h represent linear relationship.
Step-by-step explanation:
If a function has constant rate of change for all points, then the function is called a linear function.
If a lines passes through two points, then the slope of the line is
[tex]m=\frac{x_2-x_1}{y_2-y_1}[/tex]
The slope of function f(x) on [1,2] is
[tex]m_1=\frac{11-5}{2-1}=6[/tex]
The slope of function f(x) on [2,3] is
[tex]m_2=\frac{29-11}{3-2}=18\neq m_1[/tex]
Since f(x) has different slopes on different intervals, therefore f(x) does not represents a linear relationship.
From the given table of g(x) it is clear that the value of g(x) is increased by 8 units for every 2 units. So, the function g(x) has constant rate of change, i.e.,
[tex]m=\frac{8}{2}=4[/tex]
From the given table of h(x) it is clear that the value of h(x) is increased by 6.8 units for every 2 units. So, the function h(x) has constant rate of change, i.e.,
[tex]m=\frac{6.8}{2}=3.4[/tex]
Since the function g and h have constant rate of change, therefore g and h represent linear relationship.
A home improvement store advertises 60 square feet of flooring for $253.00, plus an additional $80.00 installation fee. What is the cost per square foot for the flooring?
A. $4.95
B. $5.25
C. $5.55
D. $6.06
Answer:
your answer is C.$5.55
Step-by-step explanation:
cost of square feet flooring is $253.00cost of additional installation fee $80.00NOW TAKE THE TOTAL OF BOTH,THEN WE GET
$253+$80=333NOW DO THE DIVIDE OF 333 BY 60, THEN WE GET
333/60=$5.55