x = [tex]\frac{51}{5}[/tex]
subtract [tex]\frac{4}{5}[/tex] from both sides of the equation
x = 11 - [tex]\frac{4}{5}[/tex] = [tex]\frac{55}{5}[/tex] - [tex]\frac{4}{5}[/tex] = [tex]\frac{51}{5}[/tex]
Answer:
10.92 or 10 23/25
Step-by-step explanation:
What you do is you try to get X by itself so put the fraction 4/5 on the other side so that is turns out to be 11-4/5. Now you can turn 4/5 into a decimal which would be .8 and subtract that by 11which gives you 10.92 or if you want to keep it as a fraction .92 as a fraction is 23/25 so you get 10 23/25
If 6 times a number is added to -4, the result is 10 times the number. Find the number.
the number is - 1
let the number be n then 6 times the number is 6n and added to -4 is
- 4 + 6n = 10n ( equal to 10 times the number )
subtract 6n from both sides
- 4 = 4n ( divide both sides by 4 )
[tex]\frac{-4}{4}[/tex] = n , hence n = - 1
#1.-7/9 x 3/5 a.-27/45 b.-7/15c.7/15 d.27/45
Answer: B
Step-by-step explanation:
[tex]\frac{-7}{9} * \frac{3}{5} = \frac{-7(3)}{9(5)} = \frac{-7(3)}{3 * 3(5)} = \frac{-7}{3(5)} = \frac{-7}{15}[/tex]
A 20-foot length of wire is to be cut into 2 pieces, so that the longer piece is two feet longer than two times the shorter piece. Find the length of each piece.
2x+2=20-x
3x=18
x=6
2nd=14
21) on the first day of his cross-country trip, mike drove 100 miles in 2 hours before stopping for lunch. After lunch, he drove 420 miles in 6 hours. What was average speed in miles per hour for his 8 hours of driving?
Answer:
Average speed = 65 miles per hour
Step-by-step explanation:
Mike drove 100 miles in 2hrs
He stopped to take lunch then;
drove 420 miles in 6hrs
Total distance covered = 100 + 420 miles = 520 miles
Total time taken = 2 + 6 hrs = 8hrs
Average speed = Total distance ÷ total time = 520/8 = 65 miles per hour
Determine the graph behavior at the zero(s) of the polynomial function f(x)=x^2 - 6x+9
[tex]f(x)=x^2-6x+9=(x-3)^2[/tex]
This a perfect square so the x-axis is a tangent at x=3
The correct answer is C
See graph
Given function is f(x) = x² -6x +9.
It is a quadratic function whose graph is an upward open parabola.
The zero(s) of the given function would be at x-intercepts of the graph i.e. y = 0.
It means 0 = x² -6x +9
We can solve this quadratic equation using factorization as follows:-
0 = x² -6x +9
0 = x² -3x -3x +9
0 = x(x-3) -3(x-3)
0 = (x-3)(x-3)
Therefore, x = 3 with multiplicity two.
Hence, option C is correct, i.e. The graph of the function touches the x-axis at x = 3.
The zoo closes at 5:00 p.M. It takes 3 1/2 hours to feed all the animals after closing. At what time do the zookeepers finishing feeding?
The zookeepers finish feeding the animals at 8:30 PM
What is the sum of the hundreds in this equation? 357 + 421
357+421 = 778
Hope this helps :)
An albatross can fly 400 kilometers in 8 hours at a constant speed using d as distance and t as number of hours. An equation that represents this situation is d=50t what are two contants of proportionality for the relationship between distance in kilometers and number of hours? What is the relaionship between the two values?
Answer:
Constant of Proportionality is 50.
Step-by-step explanation:
Albatross can fly 400 kilometers in 8 hours.
'd' represents the distance and 't' represents the number of hours.
The equation [tex]d=50t[/tex] represents the relationship between the distance and time.
Now, in the equation shown above 50 is the constant of proportionality, and 50 represents the rate of change of distance with time.
The constant of proportionality tells us the rate of change between two variables.
So for every 1 hour of time the distance covered is 50 kilometers.
Train a And train b leave Central Station at the same time they travel the same speed but in opposite direction with a train a heading towards Station a and train b heading towards station b train a Reaches station after 2 1/2 hours train b reaching station be after four hours you station A and b Station are 585 miles apart what is the rate of the trains
Answer:
Both trains are traveling at 90 miles per hour.
Step-by-step explanation:
We are told that the rate is the same for both trains, and we know that the distance traveled by train a plus the distance traveled by train b equals 585 miles.
We will use [tex]Distance=Rate* Time[/tex] formula to solve this problem.
Train A: [tex]D_a=R*2.5[/tex] (Using 2.5 instead of 2 and 1/2)
Train B: [tex]D_b=R*4[/tex]
We can set an equation to solve for rate R of trains as:
[tex]D_a+D_b=585[/tex]
[tex]2.5R+4R=585[/tex]
[tex]6.5 R=585[/tex]
[tex]R=\frac{585}{6.5}[/tex]
[tex]R=90[/tex]
Therefore, rate of both train a and train b is 90 miles per hour.
The total distance between the two stations is
[tex]585 miles[/tex]
Let the distance between the Central Station and station b be x
This implies that the distance between the Central Station and station a is
[tex](585 - x) \: miles[/tex]
[tex]speed=\frac{distance}{time}[/tex]
so, let us write equations in terms of speed for the two trains and solve
For train a,
[tex]speed=\frac{585 - x}{4 } ....eqn \: 1[/tex]
For train b,
[tex]speed=\frac{x}{2 \frac{1}{2} } .....eqn \: 2[/tex]
We were told that both trains traveled with the same speed
This means that eqn 1 = eqn 2
[tex]\frac{585 - x}{4 }=\frac{x}{2.5} [/tex]
Cross multiplying
[tex]2.5(585 - x)=4(x) [/tex]
Expanding the brackets
[tex]1462.5 - 2.5x =4x[/tex]
Grouping like terms
[tex]1462.5= 4x + 2.5x[/tex]
[tex]6.5x = 1462.5 \\ x = \frac{1462.5}{6.5 } =225 \: miles[/tex]
The speed at which the trains were travelling is
[tex] \frac{225}{2.5}= 90 \: miles /hour[/tex]
Hence the rate of the trains is
[tex]=90\: miles /hour[/tex]
Which linear inequality is represented by the graph? y ≤ 1/2x + 2
y ≥ 1/2x + 2
y ≤ 1/3x + 2
y ≥ 1/3x + 2
Answer:
I can confirm that the answer is in fact A
Step-by-step explanation:
I took the test and got it right ( edge 2021 )
The linear inequality represented by the graph is y ≤ 1/2x + 2. The correct option is A.
What is inequality?The relation between two expressions that are not equal, employing a sign such as ≠ ‘not equal to, > ‘greater than, or < ‘less than.
A graph is the representation of the data on the vertical and horizontal coordinates so we can see the trend of the data.
The given inequality y ≤ 1/2x + 2 is represented on the graph attached with the answer below.
In the graph, the linear line cut x-axis at ( -4, 0 ) and y-axis at ( 0, 2 ). And inequality covers the whole space below the line y = 1/2x + 2.
The linear inequality represented by the graph is y ≤ 1/2x + 2. The correct option is A.
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If c ⊥ b, what is m∠2?
A =98
B =82
C =not enough information
D =90
Answer:
C
Step-by-step explanation:
I would say not enough information. You cannot tell from the givens how A,B and m<2 are related to each other.
Answer C
Answer:
c
Step-by-step explanation:
HELP ASAP PLEASE!!!
How many seconds are there in 782 minutes?
Use the factor: 1 min= 60 sec
A. 782 sec
B. 13 sec
C. 46,920 sec
D. 0.077 sec
C. 46,920 seconds is your answer
Answer:
Step-by-step explanation:
C. 46,920 sec
The 1906 earthquake in San Francisco had a magnitude of 8.3 on the richter scale. At the same time in Japan an earthquake with magnitude of 4.9 caused minor damage. How many times more was the San Francisco earthquake that the Japan earthquake?
In 1906 in San Francisco the magnitude of earthquake on richter scale was 8.3.
In the same year the magnitude of earthquake on richter scale in Japan was 4.9.
Now we have to find how many times more was the San Francisco earthquake that the Japan earthquake.
The amount of energy released in an earthquake is very large, so a logarithmic scale avoids the use of large numbers.
The formula used for these calculations is:
[tex]M=log_{10}(\frac{I}{I_{0}})[/tex]
Where M is the magnitude on the richter scale, I is the intensity of the earthquake being measured and I₀ is the intensity of a reference earthquake.
So because the magnitude is a base 10 log, the Richter number is actually the exponent that 10 is raised to in order to calculate the intensity of the earthquake.
So the difference in magnitudes of the earthquakes can be calculated as follows:
[tex]M=log_{10}(\frac{10^{8.3}}{10^{4.9})}[/tex]
M=3.4
Answer: The San Francisco earthquake was 3.4 times more than Japan earthquake.
Final answer:
The San Francisco earthquake released approximately 2510 times more energy than the earthquake in Japan, calculated using the Richter scale.
Explanation:
To determine how many times stronger the San Francisco earthquake was compared to the earthquake in Japan, we refer to the Richter scale, which is a logarithmic scale. A one-unit increase on this scale represents a ten-fold increase in amplitude of the seismic waves and roughly a thirty-fold increase in energy released. Therefore, to calculate the difference between a magnitude 8.3 earthquake and a magnitude 4.9 earthquake, we subtract the smaller magnitude from the larger one (8.3 - 4.9 = 3.4) and then calculate 10 raised to the power of this difference.
[tex]10^(3.4)[/tex] = 10 x 10 x 10 x 2.51 (approximately), which simplifies to about 2510 times more energy released by the San Francisco earthquake compared to the earthquake in Japan.
Sarah was trying to save up $475. At her job she made $12 an hour and she worked 28 hours a week after paying for her food and other expenditures she ended up saving 1/6 of her weeks earning how much money did she save up each week?
$56 a week
earnings = $12 × 28 = $336
saved = [tex]\frac{1}{6}[/tex] x $336 = [tex]\frac{336}{6}[/tex] = $56
A school year has 4 quarters. What percent of a school year is 7 quaters
Final answer:
7 quarters represent 175 percent of a school year since 7 divided by 4, then multiplied by 100 equals 175%. This means 7 quarters is more than the duration of one standard school year.
Explanation:
To calculate what percent of a school year 7 quarters represent, we need to compare 7 quarters to the total number of quarters in a standard school year. Since we know that a school year consists of 4 quarters, we can set up a proportion to determine the percentage.
Step 1: Identify the total number of quarters in a school year, which is 4.
Step 2: Identify the number of quarters we're focusing on, which is 7.
Step 3: Set up a fraction to represent the portion, which is 7 divided by 4 (7/4).
Step 4: Convert this fraction to a percentage by multiplying by 100. So, (7/4) × 100 = 175%.
Therefore, 7 quarters represent 175 percent of a school year, which implies more than one full school year.
Solve with substitution, show your work.
3x+2y+z=7
5x+5y+4z=3
3x+2y+3z=1
3x + 2y + z = 7 ⇒ z = 7 - 3x - 2y
*****************************************
5x + 5y + 4z = 3
= 5x + 5y + 4(7 - 3x - 2y) = 3
= 5x + 5y + 28 - 12x - 8y = 3
= -7x -3y + 28 = 3
= -7x - 3y = -25
*****************************************
3x + 2y + 3z = 1
= 3x + 2y + 3(7 - 3x - 2y) = 1
= 3x + 2y + 21 - 9x - 6y = 1
= -6x - 4y + 21 = 1
= -6x - 4y = -20
*****************************************
-7x - 3y = -25 ⇒ 4(-7x - 3y = -25) ⇒ -28x - 12y = -100
-6x - 4y = -20 ⇒ -3(-6x - 4y = -20) ⇒ 18x + 12y = 60
-10x = -40
x = 4
-7x - 3y = -25
-7(4) - 3y = -25
-28 - 3y = -25
-3y = 3
y = -1
z = 7 - 3x - 2y
= 7 - 3(4) - 2(-1)
= 7 - 12 + 2
= -3
Answer: x = 4, y = -1, z = -3
If x > 0 and y < 0, where is the point (x, y) located?
If x > 0 and y < 0 then the point (x, y) is located in Quadrant IV.
Look at the picture.
Answer:
II
Step-by-step explanation:
7.67,7,7.72,7.38 least to greatest
Last year a business had profits of 8,000 this year it profit are five time as great what are this year profits
Which expression can be used to find the difference of the polynomials? (10m – 6) – (7m – 4)
Answer choices
[10m + (–7m)] + [(–6) + 4](10m + 7m) + [(–6) + (–4)][(–10m) + (–7m)] + (6 + 4)[10m + (–7m)] + [6 + (–4)]
(10m – 6) – (7m – 4)
= 10m - 6 - 7m + 4
= 3m - 2
So
[10m + (–7m)] + [(–6) + 4]
= 3m + (-2)
= 3m - 2 ..............matching answer.
Answer
[10m + (–7m)] + [(–6) + 4]
To add or subtract any algebraic expression, variables add or subtract with variables and constant term add or subtract with constant terms in the expression.
To solve given expression, we use [10m + (–7m)] + [(–6) + 4] expression.
Given expression is,
(10m – 6) – (7m – 4)
Now, variables add or subtract with variables and constant term add or subtract with constant terms in the above expression.
10m - 6 - 7m + 4
(10m - 7m) + (-6 + 4)
[10m + (–7m)] + [(–6) + 4]
So, first option is correct.
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Mrhopkins was making groups for the school field trip
If an acute angle of an isosceles right triangle measures (2x-15), What is the value of x?
The value of x in the isosceles right triangle is 52.5.
Explanation:The measure of the acute angle in an isosceles right triangle can be determined by setting the expression equal to 90 degrees:
(2x - 15) = 90
Simplifying the equation, we get:
2x = 90 + 15
2x = 105
x = 105/2
x = 52.5
Therefore, the value of x is 52.5.
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A yogurt costs 45p hair many can be bought with £5
11
5 pound = 500 pence
500 pence/ 45 pence= 11.1111111
What value of k makes the equation true?
k – 26.7 = 12.8
A.
13.9
B.
38.5
C.
39.5
D.
39.9
All you have to do is just add 26.7 with 12.8, with the result being 39.5
is 106.06 bigger than 106.60? I really hate math and i got normal schoolwork to do as well
106.60 is bigger round up on it and you get 107
Cole and his sister chloe are cleaning their house. The house has nine rooms in it. If it take one person about 18 minutes to clean one room, how long will it take cole and chloe, working together to clean the whole house?
Answer: Cole and his sister Chloe will take 81 minutes to clean the whole house.
Step-by-step explanation:
Total rooms in the house = 9
Total persons to clean the house = 2 (Cole and his sister Chloe)
Time taken by 1 person to clean one=18 minutes
Time taken by 2 persons to clean one room together=18 divided by 2 = 9 minutes
Time taken by 2 persons to clean 9 rooms (which is the total number of rooms in the house)=9 multiply 9 = 81 minutes
therefore, they will take 81 minutes to clean the whole house.
In a sale of game boys were reduced by 2/5 what is the sale price if the original price was 50.00
Final answer:
To calculate the sale price of the Game Boy with an original price of $50.00 and a discount of 2/5, you multiply the original price by the discount to find the amount reduced ($20), then subtract that from the original price to find the sale price ($30).
Explanation:
The question involves calculating the sale price of an item after a discount. Initially, the original price of the Game Boy is $50.00. The discount is given as 2/5 of the original price. To find the amount of discount, we multiply the original price by 2/5:
Discount = Original Price × Fraction of discount
Discount = $50 × 2/5
Discount = $20
Now, we subtract this discount from the original price to find the sale price:
Sale Price = Original Price - Discount
Sale Price = $50 - $20
Sale Price = $30
Therefore, the sale price of the Game Boy after the discount is $30.
For every ten sheets of stickers you buy at a craft store, the total cost increases 20.50.
Answer:
cost of one sheet of sticker = 2.05
Step-by-step explanation:
given that for every 10 sheets of stickers total c0st increases 20.50
i.e. cost of 10 sheets of stickers = 20.50
When we purchase 1 sheet the price would be reduced.
In other words, direct variation is there for sheets of papers and costs
Hence for 1 sheet of stickers cost would be less than 10 sheets.
So divide by 10
Cost of 1 sheet of sticker = 20.50/10 = 2.05
PLEASE HELP ASAP!!! CORRECT ANSWER ONLY PLEASE!!
Solve the equation.
x^2 + 10x + 24 = 0
A) -12 and 2
B) 12 and -2
C) -4 and -6
D) 4 and 6
Answer:
Option C
Step-by-step explanation:
Given a quadratic equation
x^2+10x+24 =0
We can use either formula or factorization method to solve this equation.
The last term is 24, it is a product of 6 and 4. Sum =6+4 =10
Hence factoring can be done easier
Split the middle term as 6x +4x
x^2+6x+4x+24 =0
x(x+6)+4(x+6)=0
(x+4)(x+6)=0
Either x+4 =0 or x+6 =0
x=-6 or x =-4
Which equation has the following characteristics?