Draw the image of the figure after the given rotation about the origin
Answer:
The image would just be upside down. C would stay where it is, A would be at the point (2, -3), D would be at the point (0, -1), and B would be at the point (4, -1)
Step-by-step explanation:
the perimeter of a rectangle is 32 centimeters. The length is 1 cm more than twice the width. Find the dimensions of the rectangle.
Answer: length = 11cm , width = 5cm
Step-by-step explanation:
The formula for calculating the perimeter of a rectangle is given by :
P = 2 ( L + w )
The length is 1 cm more than twice the width implies:
L = 1 + 2w
substituting into the formula , we have
32 = 2 ( 1 + 2w + w )
32 = 2 ( 1 + 3w)
32 = 2 + 6w
32 - 2 = 6w
30 = 6w
Therefore :
w = 5
then
L = 1 + 2w
L = 1 + 2 ( 5 )
L = 1 + 10
L = 11
Therefore , the length is 11 cm and the width is 5cm
what is the equation of the line that passes through (0,2) and (4,6)
1) find the measure <Ø. Round to one decimal place.
2.) find the measure of line BA. round to one decimal place
PLEASE ANSWER QUICKLY, 15 POINTS
Answer:
Θ = 45°
BA = [tex]3\sqrt{2}[/tex] = 4.243
Step-by-step explanation:
i) the given triangle is a right angled isosceles triangle.
ii) the base and the height are both equal. height = base = 3 cm.
iii) from the rule of triangles the sum of all angles in a triangle is 180° and since the triangle is an right angled isosceles triangle one angle is 90° and the other two angles are equal.
Therefore
Θ° + Θ° + 90° = 180° ⇒ 2Θ° = 180° - 90° = 90° ∴ Θ = 45°
iv) the hypotenuse BA is given by the Pythagoras' theorem
∴ hypotenuse (BA) = [tex]\sqrt{base^{2} + height^{2} }[/tex] = [tex]\sqrt{BC^{2} + CA^{2} }[/tex] = [tex]\sqrt{3^{2} + 3^{2} }[/tex] = [tex]3\sqrt{2}[/tex] = therefore BA = [tex]3\sqrt{2}[/tex] = 4.243
To accurately determine the measure of angle Ø and the length of line BA, specific information or data related to the geometry or vectors involved is required. The measure of angle Ø may be calculated using geometrical principles or trigonometry, and the length of line BA could be determined by measuring or calculation if the context is known.
Explanation:To find the measure of ∠Ø, you would typically need additional information such as the lengths of the sides of a triangle, the measures of other angles, or the coordinates of points if you are working with a graph. Similarly, to find the measure of line BA, information about the specific triangle, polygon, or coordinate grid where line BA exists is necessary. For example, using the Pythagorean theorem for a right-angled triangle or the distance formula for points on a coordinate grid.
If you are given the lengths of sides or the measures of angles, you can apply geometric principles or trigonometric ratios to calculate the desired measurements. Without the specific data or a provided figure, it's not possible to give an exact answer to these questions.
In the case of vector analysis, as mentioned in the reference provided, to measure line BA you would draw vectors on a graph and construct a parallelogram; the length of the diagonal could then be measured to find the result. For angles, you could use a protractor or apply trigonometric functions if you know the components of the vectors.
If you pass a road test, you will get your drivers license. Tamara passed her road test
Final answer:
The statement establishes the condition for obtaining a driver's license which is passing a road test. Since Tamara passed her test, according to the given logic, she will receive her driver's license. The subject matter is related to Law.
Explanation:
The question provided is related to the process of acquiring a driver's license and is rooted in understanding conditional statements, which are often associated with the field of logic, a branch of philosophy. However, the most practical context here is Law, as it involves legal criteria for obtaining a driver's license. The logic presented in the statement is straightforward: If you pass a road test, you will get your driver's license. Tamara passed her road test. Based on this information, we can deduce that Tamara will get her driver's license because she has fulfilled the condition set by the law or the driving authority responsible for issuing licenses.
So I need help with 8/576. I was hoping if you could
Answer:
1/72
Step-by-step explanation:
Which solution set is graphed on the number line?
A number line going from negative 4 to positive 4. An open circle is at 1. Everything to the left is shaded.
x greater-than-or-equal-to 1
x greater-than 1 and one-third
x less-than 1
x less-than-or-equal-to 1
Answer:
Step-by-step explanation:
an open circle means it contains no equal signs.....everything to the left is shaded....means it is less then
x < 1 (thats a less then sign only) ....no equal sign in there
Option c is correct. The correct solution set represented by the number line is x < 1.
To determine which solution set is graphed on the number line, we need to analyze the given conditions:
Open circle at 1: This indicates that 1 is not included in the solution set.Shading to the left of 1: This indicates that all numbers less than 1 are included in the solution set.Considering these conditions, the correct solution set is represented by the inequality x < 1. Therefore, the answer is option c. x < 1.
Complete question:
Which solution set is graphed on the number line?
A number line going from - 4 to 4. An open circle is at 1. Everything to the left of 1 is shaded.
a. x ≥ 1
b. x > 1
c. x < 1
d. x ≤ 1
Two rectangular prisms have the same volume. The area of the base of the blue
prism is 2 square units. The area of the base of the red prism is one third that
of the blue prism. Which statement is true?
a)The height of the red prism is one-third the height of the blue prism.
b)The height of the red prism is the same as the height of the blue prism.
c)The height of the red prism is six times the height of the blue prism.
d)The height of the red prism is three times the height of the blue prism.
Answer:
d) the height of red prism is three times the height of the blue prism.
Step-by-step explanation:
i) the volume of a rectangular prism is given by area of base [tex]\times[/tex] height.
ii) volume of the blue prism is = (base of blue prism) [tex]\times[/tex] (height of blue prism)
iii) volume of red prism is = (base of red prism) [tex]\times[/tex] ( height of the red prism)
= [tex]\frac{1}{3}[/tex] [tex]\times[/tex] ( base of blue prism) [tex]\height[/tex][tex]\times[/tex] ( height of red prism)
iv) it is also given that
volume of blue prism = volume of red prism
⇒ (base of blue prism) [tex]\times[/tex] (height of blue prism) = (base of red prism)[tex]\times[/tex] (height of red prism)
⇒(base of blue prism) [tex]\times[/tex] (height of blue prism) = [tex]\frac{1}{3}[/tex] [tex]\times[/tex] ( base of blue prism)[tex]\times[/tex] (height of red prism)
⇒ (height of blue prism) = [tex]\frac{1}{3}[/tex] [tex]\times[/tex] (height of red prism)
∴ height of red prism = 3 [tex]\times[/tex] height of blue prism
Therefore the correct option is
d) the height of red prism is three times the height of the blue prism.
At a cement plant, sand is stored in a container called a hopper. The shape of the container is an inverted cone. The height is 18 feet and the radius is 12 feet. If the hopper is full and sand is emptied at the rate of 4 ft3/min, how fast is the level of sand dropping when the sand level is 6 feet high? V = 1/3r2h
Answer:
[tex]v=\frac{0,25}{\pi } ft/min[/tex]
Step-by-step explanation:
There is a relation with the initial and final dimensions of the hopper according to the sand level when its high is 6 feet as follows:
[tex]\frac{h_{1} }{h_{2} }=\frac{r_{1} }{r_2}\\{r_2}=\frac{12ft*6ft}{18ft}\\ r_2=4ft[/tex]
Where the calculated [tex]r_{2}[/tex] is given with the 6 feet hgh.
Then we have the sand flow formula which is:
[tex]Q=A*v[/tex]
Where A represents the area of the transversal section and v the velocity that we need to know, the area is:
[tex]A=\pi r^{2}\\ A=\pi *4^{2}\\ A=16\pi ft^{2}[/tex]
And finally the sand is dropping when the level is 6 feet high with the velocity (v) :
[tex]v=\frac{Q}{A} \\v=\frac{4}{16\pi }[/tex]
[tex]v=\frac{0.25}{\pi } ft/min[/tex]
The sand level in the hopper is dropping at a rate of approximately 0.08 feet per minute when the sand level is 6 feet high. This is calculated using related rates and the volume formula for a cone. The relationship between radius and height, derivative calculations, and the given sand emptying rate are essential for this solution.
To determine how fast the level of sand is dropping in the hopper, we need to use related rates. The volume V of the sand in the inverted cone is given by the formula:
V = (1/3)πr2h
In this case, the radius r and height h of the sand level are proportional because the shape is a cone. We can express the radius r in terms of the height h using similar triangles. Given the overall height is 18 feet and the radius is 12 feet, we have:
r = (12/18)h or r = (2/3)h
Substituting r into the volume formula:
V = (1/3)π[(2/3)h]2h = (4/27)πh3
We need the rate of change of the height (dh/dt) when h = 6 feet. Given dV/dt = -4 ft³/min (negative because the volume is decreasing), we use the chain rule for differentiation:
dV/dt = (dV/dh)(dh/dt)
First, find dV/dh:
dV/dh = d/dh [(4/27)πh3] = (4/27)π × 3h2 = (4/9)πh2
Using dV/dt = -4 ft³/min:
-4 = (4/9)π(h2)(dh/dt)
When h = 6 feet:
-4 = (4/9)π(62)(dh/dt)
-4 = (4/9)π(36)(dh/dt) = 16π(dh/dt)
Therefore:
dh/dt = -4/16π = -1/4π
dh/dt = -0.08 feet/min
So, the level of sand is dropping at a rate of approximately 0.08 feet per minute when the sand level is 6 feet high.
C divided by 9 is less than or equal to -4 solve the inequality and graph the solution
Answer:
Step-by-step explanation:
c/9≤-4
multiply both sides of the inequality by 9(c/9×9≤4×9) to isolate the 9 being divided by c(inverse operation):
c≤-36
that is the inequality.
to graph it, draw a number line with a closed circle on -36. then, draw an arrow on the line going toward the negative numbers, or the left side to demonstrate that c is less than or equal to -36.
The solution to the inequality is C ≤ -36, and the graph shows all values to the left of -36 on a number line.
Explanation:To solve the inequality "C divided by 9 is less than or equal to -4," you can follow these steps:
- Start with the inequality: C/9 ≤ -4.
- To isolate C, you can multiply both sides of the inequality by 9 (since dividing by 9 is the opposite of multiplying by 9). Be sure to do the same operation to both sides to maintain the inequality's balance.
C/9 * 9 ≤ -4 * 9
This simplifies to:
C ≤ -36
So, the solution to the inequality is C ≤ -36.
To graph this solution on a number line, you can:
Draw a number line.
Mark a point at -36 (you can label it as C ≤ -36).
Shade the part of the number line to the left of -36 to indicate that C is less than or equal to -36.
This graph visually represents the solution to the inequality: C is any number less than or equal to -36.
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Which would you use to estimate the demand for a product at various prices?
A. a demand table
B. a demand chart
C. a demand schedule
Answer:
I wanna say B. not 100% sure
sorry if wrong
Step-by-step explanation:
Answer:
Step-by-step explanation:
The correct answer is B
A car company charges $34 per day for a rented car and $0.50 for every mile driven. A second car rental company charges $20 per day and $0.75 for every mile driven. What is the number of miles at which both companies charge the same amount for a one-day rental?
Answer:o$1.50
Step-by-step explanation:
Harry drew a number line to solve a word problem
Answer:
what is your question
Step-by-step explanation:
can i please have brainliest thx ! :)
Five pencils and 4 erasers cost $7.65. Four pencils and 5 erasers cost $7.20.What is the cost of 2 erasers?
The cost of 2 erasers will be - $1.2
We have pencils and erasers.
We have to determine the cost of 2 erasers.
What is Equation Modelling ?The equation modelling is a method of forming
According to the question -
Assume that the cost of a single pencil is x and that of eraser is y. Then -
5x + 4y = 7.65 ---[1]
and
4x + 5y = 7.20 ---- [2]
4x = 7.20 - 5y
Consider Equation - [1] :
5x + 4y = 7.65
4x + x + 4y = 7.65
7.20 - 5y + x + 4y = 7.65
x - y = 0.45
x = 0.45 + y ----- [3]
Substituting x from equation 3 in [1] -
5[0.45 + y] + 4y = 7.65
2.25 + 5y + 4y = 7.65
9y = 5.4
y = 0.6
Therefore -
x = 0.45 + 0.6 = 1.05
Therefore, the cost of 2 erasers will be - 2 x 0.6 = $1.2
Hence, the cost of 2 erasers will be - $1.2
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The football team had its photo taken there are 3 rows of 8 players each the fourth row has 6 players how many players are in the team photo?
Answer:
30 players.
Step-by-step explanation:
3 rows of 8 = 3 x 8 = 24. Plus an additional 6 players in the fourth row. 24 + 6 = 30.
The team photo consists of 30 players: 24 in the three full rows, each with 8 players, and 6 more players in the fourth row.
To find the total number of players in the team photo, you can simply add the number of players in each row together. In this case, there are three rows of 8 players each and a fourth row with 6 players.
First, calculate the total number of players in the three full rows, where each row has 8 players:
3 rows x 8 players/row = 24 players
Now, add the players from the fourth row:
24 players (from the full rows) + 6 players (from the fourth row) = 30 players
So, there are 30 players in the team photo.
In summary, the team photo includes 30 players, with 24 players in the three full rows of 8 each and an additional 6 players in the fourth row.
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Which of the following could NOT be the lengths of the sides of a right triangle?
2 9 ft, 12 ft, 15 ft
c 4 cm, 7.5 cm, 8.5 cm
b. Sin., 10 in, 15 in
d 15 m, 2 m, 2.5 m
Helpp please I don’t understand
Answer:
ok, so write down equation for circumference first, substituting pi symbol with 3.14, and substitute 8 for diameter, because the diameter of the circle and the height of rectangle is the same.
C=3.14×8
C=25.12
then you divide it by 2 because it's only half a circle.
25.12÷2=12.56
Next you find the perimeter of the rectangle
(10×2)+8=28
you dont add the right side,8, because that's where the half circle is. Now you add the half circle and the perimeter of the rectangle.
28+12.56=40.56
and then round to the nearest hundredth
NUMBER 4 I NEED HELP GUYS
Answer:
D. 100°
Step-by-step explanation:
m<MLN = m<MON/2
50°= m<MON/2
50×2 = m<MON
m<MON=100°
Together, a house and the lot it is on costs $40,000. If the house costs seven times as much as the lot, how much does the lot cost?
The lot costs 5000 dollars.
Step-by-step explanation:
The cost of a House and the lot = $40,000.
Let us assume the cost of lot as 'x'
Given that, The cost of the house is 7 times as much as the lot.
Therefore, The cost of the house= 7x
The cost of both the house and the lot= x + 7x
$40,000 = x + 7x
40,000 = 8x
x = 40,000/8
x = 5,000
The lot costs $5000.
The cost of the lot is determined by setting up an equation using the information given in which the house costs seven times as much as the lot and they total $40,000. This equation, when solved, shows the cost of the lot as $5,000.
Explanation:To solve this problem, we need to set up an equation using the information given. Let's use x to represent the cost of the lot. According to the question, the house costs seven times as much as the lot, so the house costs 7x. Together, they cost $40,000. So we have the equation:
x + 7x = $40,000
We simplify this to 8x = $40,000. Then, when we solve for x by dividing both sides of the equation by 8, we find that x, or the cost of the lot, is $5,000.
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Solve the equation: x/4=3.6
Answer:
x = 14,4
Step-by-step explanation:
x = 3,6 * 4
x = 14,4
14. fourteen is half of g
8 out of 10 doctors use floss.
There are 40 doctors.
How many use floss?
Answer:
Step-by-step explanation:
8+8+8+8=32
The number of doctors who uses floss is 32 from a total of 40 doctors. This is because it is given that 8 out of 10 doctors use floss.
Given condition:Total number of doctors=40
Doctors who use floss per 10 members=8
Calculation:Since there are 40 doctors, there exist 4 groups and each group has 10 doctors.
It is given that per 10 doctors, 8 of them use floss. So, here 4 groups with every 10 doctors are available.
Thus,
On multiplying,
8 × 4 = 32
Therefore, 32 doctors among 40 doctors use floss.
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Which expression is equivalent to -3(4x-2)-2x
Answer:
-14x+6
Step-by-step explanation:
-3(4x-2)-2x
-12x+6-2x
-12x-2x+6
-14x+6
Using the formula V equales l multiplied by w and h find the volume of a right rectangular prism when the length of the prism in 45 cm, the width is 12cm and the height is 10 cm
Answer:
Therefore volume 'V' is given by V = 45 × 12 × 10 = 5400 [tex]cm^{3}[/tex]
Step-by-step explanation:
i) given the formula V = l × w × h where V is the volume of a right rectangular prism and 'l' is the length of the prism base and 'w' is the width of the prism base and 'h' is the height of the rectangular prism.
ii) the length of the base 'l' is given as l = 45 cm.
iii) the width of the base 'w' is given as w = 12 cm
iv) the height of the prism 'h' is given as h = 10 cm.
v) Therefore volume 'V' is given by V = 45 × 12 × 10 = 5400 [tex]cm^{3}[/tex]
graph the system of equations on a graph paper.
{8x + 6y = 48
{2x - 3y = -6
which statements are true about the solution to the system of equations? select each correct answer.
a) the ordered pair that is the solution to the system lies in quadrant II
b)the x-coordinate of the solution is -3
c) the ordered pair that is the solution to the system lies in quadrant I
d) the y-coordinate of the solution is 3
e) the y-coordinate if the solution is 4
f) the x-coordinate of the solution is 3
Answer:
Step-by-step explanation:
8x + 6y = 48.....reduces to 4x + 3y = 24
2x - 3y = -6
4x + 3y = 24
-------------------add
6x = 18
x = 18/6
x = 3
2x - 3y = -6
2(3) - 3y = -6
6 - 3y = -6
-3y = -6 - 6
-3y = -12
y = -12/-3
y = 4
solution is : (3,4)
the ordered pair (3,4) lies in quadrant I
the x coordinate of the solution is 3
the y coordinate of the solution is 4
In the inequality 1/ 2 x - 6 > 10, x represents Todd's age. Which phrase most accurately describes Todd's age? A) Todd is older than 32. B) Todd is younger than 32. C) Todd is exactly 32 years old. D) Todd is 32 years old or older.
Answer:
Option A) Todd is older than 32
Step-by-step explanation:
we have
[tex]\frac{1}{2}x-6>10[/tex]
Solve for x
Adds 6 both sides
[tex]\frac{1}{2}x>10+6\\\\\frac{1}{2}x>16[/tex]
Multiply by 2 both sides
[tex]x>32[/tex]
so
Todd's age is greater than 32
therefore
Todd is older than 32
Is 5 - 1 positive or negative?
Answer:
Positive
Step-by-step explanation:
5-1 equals 4 which is positive
Answer:
The answer is positive
Step-by-step explanation:
5 - 1 is 4 and four is after aka to the right of zero
The time a projectile spends in the air can be modeled by the equation t² -8t + 15 = 0, in which t represents the amount of time traveled, in seconds. Which equation is equivalent to t² -8t + 15 = 0?
(t -3)(t + 5) = 0
(t + 3)(t - 5) = 0
(t - 3)(t -5) = 0
(t = 3)(t + 5) = 0
Answer:
The equation which is equivalent to [tex]t^2-8t+15=0[/tex] is
[tex](t-3)(t-5)=0[/tex]
Step-by-step explanation:
Given that the time a projectile spends in the air can be modeled by the equation [tex]t^2-8t+15=0[/tex], where t represents the amount of time traveled in seconds.
To find the equation is equivalent to [tex]t^2-8t+15=0[/tex] :
[tex]t^2-8t+15=0[/tex]
[tex]t^2-3t-5t+15=0[/tex]
[tex]t(t-3)-5(t-3)=0[/tex]
[tex](t-3)(t-5)=0[/tex]
Therefore the equation which is equivalent to [tex]t^2-8t+15=0[/tex] is
[tex](t-3)(t-5)=0[/tex]
Final answer:
The equivalent equation to the quadratic equation representing the time a projectile spends in the air, t² -8t + 15 = 0, is (t - 3)(t - 5) = 0, which results from correctly factoring the original equation.
Explanation:
The time a projectile spends in the air is represented by the quadratic equation t² -8t + 15 = 0. To find an equivalent equation, we must factor the quadratic equation correctly. The correct factored form that corresponds to the original equation is (t - 3)(t - 5) = 0, based on the rules of factoring quadratics and finding roots that sum up to -8 (the coefficient of t) and multiply to 15 (the constant term).
The process of factoring involves finding two numbers that add up to the coefficient of the linear term (-8 in this case) and multiply to the constant term (15 here). The numbers -3 and -5 satisfy both these conditions as (-3) + (-5) = -8 and (-3) × (-5) = 15. Therefore, the equivalent equation is (t - 3)(t - 5) = 0.
2/3 (x - 7) = -2 what does x equal
(2/3 is a fraction not dividing)
Answer:
x = 4
Step-by-step explanation:
Given
[tex]\frac{2}{3}[/tex](x - 7) = - 2
Multiply both sides by 3 to clear the fraction
2(x - 7) = - 6 ← distribute left side
2x - 14 = - 6 ( add 14 to both sides )
2x = 8 ( divide both sides by 2 )
x = 4
Answer:
Step-by-step explanation:
2/3(x - 7) = -2....distribute the 2/3 thru the parenthesis
2/3x - 14/3 = -2 ....if u want to get rid of the fractions, multiply by the common denominator of 3, and u get :
2x - 14 = -6 ....add 14 to both sides
2x = -6 + 14
2x = 8 ....divide by 2
x = 8/2....reduce
x = 4 <=====
check it..
2/3(x - 7) = -2
2/3(4 - 7) = -2
2/3 (-3) = -2
-6/3 = -2
-2 = -2 (correct)....it checks out :)
A line passes through the point (8,-5) and has a slope of -3/4.
Write an equation in slope-intercept form for this line.
Answer: y= -3/4x + 1
Step-by-step explanation:
use the point to set up slope intercept to find you y-intercept (b)
(8,-5)
y=mx+b
-5=-3/4(8)+b
-5=-6+b
b=1
The equation of the line which passes through the point (8,-5) with a slope of -3/4, when written in slope-intercept form, is y = -3/4x + 1.
Explanation:The equation of a line in slope-intercept form is y = mx + b, where m is the slope of the line and b is the y-intercept. You've been provided that the slope m of the line is -3/4 and it passes through the point (8,-5). You can substitute these values into the formula to find the y-intercept b.
Substituting the given values into the formula gives -5 = (-3/4)*8 + b, which simplifies to -5 = -6 + b. By adding 6 to both sides of the equation, you find that b = 1.
So the equation of the line in slope-intercept form is y = -3/4x + 1.
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