The values of the variable x and y are x = 10 and y = 12.
What is intersection?In mathematics, the intersection of two or more lines refers to the point or points at which the lines meet or cross each other.
When two lines intersect, they form two pairs of opposite angles that add up to 180 degrees. If one pair of opposite angles is congruent, then their measures are equal.
Let's call the measure of the congruent angles a. Then we have:
a = 8x + 10 (the measure of one angle)
a = 15y/2 (the measure of the other angle)
Since these angles are congruent, their measures must be equal. So we can set the two expressions for a equal to each other:
8x + 10 = 15y/2
8x = 15y/2 - 10
x = ( 15y/2 - 10) / 8 ................. equation 1
To solve for x and y, we need another equation. We know that the sum of the measures of the two angles in a linear pair is 180 degrees. So we can write:
a + a = 180
Substituting the expressions for a, we get:
8x + 10 + 15y/2 = 180
Substituting x = ( 15y/2 - 10) / 8 into the expression we found for y, we get:
8( 15y/2 - 10) ÷ 8 + 10 + 15y/2 = 180
15y/2 - 10 + 10 + 15y/2 = 180
15y/2 + 15y/2 = 180
30y = 360
y = 12
Substituting y = 12 into the expression we found for x,
x = ( 15y/2 - 10) / 8
= ( 15 × 12 /2 - 10) / 8
= (15 × 6 - 10)/8
= 80/8
= 10.
Therefore, the values of x and y are x = 10 and y = 12.
To learn more about intersection visit the link:
https://brainly.com/question/11439924
#SPJ9
EASY MATH HELP
pic down below
Consider the line represented by y + 4 = 2/5 ( x - 9 )
Write an equation representing a different line with the same slope that passes though the point (3,6)
Thus, equation of line with same slope and passing point (3,6) is :
y - 6 = 2/5(x - 3).
Explain about slope of line?The difference between the change in y-values and the change in x-values is known as the slope of a line. This figure represents the slope of a line.
A quantity called the slope of a line is used to quantify how steep a line is. This number may be zero, positive, or negative. Moreover, it may be unreasonable or rational.
Given equation of line:
y + 4 = 2/5 ( x - 9 )
General equation in two point form:
y - y1 = m(x - x1)
On comparing both equation:
slope of line m = 2/5
Now, equation of line with same slope and passing point (3,6).
y - 6 = 2/5(x - 3).
Know more about the slope of line
https://brainly.com/question/16949303
#SPJ1
I have no idea how to do this one.
Answer:
use (1 -cos²x) for sin²x and expand
Step-by-step explanation:
You want to verify sin⁴x·cos²x = cos²x -2cos⁴x +cos⁶x.
Pythagorean identityYou can get the desired result by substituting (1 -cos²x) for sin²x.
[tex]\sin^4{x}\,\cos^2{x}=(1-\cos^2{x})^2\,\cos^2{x}=(1-2\cos^2{x}+\cos^4{x})\cos^2{x}\\\\=\boxed{\cos^2{x}-2\cos^4{x}+\cos^6{x}}[/tex]
consider the function f(x) whose second derivative is f′′(x)=9x 6sin(x). if f(0)=4 and f′(0)=3, what is f(4)
The value of function f(4) is approximately = 32.23
To solve for f(4), we need to integrate the given second derivative twice and use the initial conditions to find the constants of integration. Then we can evaluate the function at x=4.
First, we integrate f′′(x) to get f′(x):
f′(x) = ∫ f′′(x) dx = ∫ 9x 6sin(x) dx = -9x 6cos(x) + C1
Next, we integrate f′(x) to get f(x):
f(x) = ∫ f′(x) dx = ∫ (-9x 6cos(x) + C1) dx = -9x 6sin(x) + C1x + C2
Using the initial conditions, we can solve for C1 and C2:
f(0) = 4 = C2
f′(0) = 3 = C1
Therefore, we have:
f(x) = -9x 6sin(x) + 3x + 4
Finally, we can evaluate f(4):
f(4) = -9(4) 6sin(4) + 3(4) + 4 = -36sin(4) + 16
So the value of f(4) is approximately -32.23.
Click the below link, to learn more about Derivatives:
https://brainly.com/question/25752367
#SPJ11
Write a quadratic function in standard form whose graph passes through the points (-8,0), (-2,0), and (-6,4)..
Answer:
-0.5x^2 - 5x - 0.8
Step-by-step explanation:
The 2 zeroes of the function are at x = -8 and x = -2 so we can write the quadratic as
y = a(x + 2)(x + 8) where a is a value to be found.
When x = -6, y = 4 so:
4 = a(-6+2)(-6 + 8)
4 = -8a
a = -0.5
The function is:
-0.5(x + 2)(x + 8)
= -0.5(x^2 + 10x + 16)
= -0.5x^2 - 5x - 0.8
A geometric sequence starts at 10 and each successive term is 1.1times the previous term. Thus a1=10 and f=1.1.
What is the sum of the first 100 terms?
A) 1.378 million
B )3.378 million
C) 3.877 million
D) 1.783million
To find the sum of the first 100 terms of a geometric sequence, we can use the formula:
S = a(1 - f^n) / (1 - f)
where S is the sum of the first n terms, a is the first term, f is the common ratio, and n is the number of terms.
In this case, a = 10, f = 1.1, and n = 100. So we have:
S = 10(1 - 1.1^100) / (1 - 1.1)
S = 10(1 - 2.98551 x 10^7) / (-0.1)
S = 10(-2.98551 x 10^7 + 1) / 0.1
S = -2.98551 x 10^8 + 10
S = 3.7949 x 10^6
Therefore, the sum of the first 100 terms is approximately 3.7949 million. The closest answer choice to this value is C) 3.877 million, but none of the answer choices match the calculated value exactly.
Rosie jumps 32cm in the air Annie jumps 8% higher than Rosie how high did Annie jump
Answer:
Annie jumps 34.56 cm (approximately)
Step-by-step explanation:
Since we know that Annie jumps 8% higher than Rosie, we can add the 8% increase to the height that Rosie jumped.
32 cm + 2.56 cm = 34.56 cm
Therefore, Annie jumped approximately 34.56 cm in the air, which is 8% higher than the height that Rosie jumped.
Step-by-step explanation:
To find out how high Annie jumped, you first need to calculate what 8% of Rosie's jump height is, and then add this amount to Rosie's jump height.
To calculate 8% of Rosie's jump height, you can multiply 32cm by 8% expressed as a decimal, which is 0.08:
8% of 32cm = 0.08 x 32cm = 2.56cm
So Annie jumped 2.56cm higher than Rosie's jump of 32cm.
To find out how high Annie jumped, you can add 2.56cm to Rosie's jump height:
Annie's jump height = Rosie's jump height + 2.56cm
= 32cm + 2.56cm
= 34.56cm
Therefore, Annie jumped 34.56cm in the air.
Please help! I am so confused! (I am in k12)
The function is a square root function that has been transformed from the parent function. Three parameters are a = -1, h = -2, and k = 3.
What is transformation?A set that has a geometric structure by itself or another set constitutes the geometric transformation. A shape may change shape, but not appearance. Following then, the form could match or resemble its preimage. A change in something's appearance is what transformations actually signify. Planar transformations and spaces can be distinguished from one another using the dimensions of the operand sets. Their characteristics can also be used to classify them.
The given function is f(x) = -√(x+2) + 3.
The function is a square root function that has been transformed from the parent function.
The three parameters of the function are:
a = -1, which reflects the graph of the function over the x-axis.
h = -2, which shifts the graph of the function 2 units to the left.
k = 3, which shifts the graph of the function 3 units up.
Learn more about transformation here:
https://brainly.com/question/11352944
#SPJ1
A line goes thru the point (-3, 2) and has a slope of 4. What is the y-intercept?
A) 0
B) -2/3
C) 14
D) -10
I am in need of assistance
Answer:
14
Step-by-step explanation:
Answer:
b = 14
Step-by-step explanation:
In order to find the y intercept of the problem, we will have to put the equation of the line in point slope form and solve for y.
Point slope form: [tex]y-y_1=m(x-x_1)[/tex]
Lets put the equation of the line in point slope form.
[tex]y-2=4(x+3)[/tex]
Distribute 4
[tex]y-2=4x+12[/tex]
Add 2 to both sides
[tex]y=4x+14[/tex]
Now that the equation of the line is in slope intercept form, the y intercept is at the end of the equation, which is 14.
b = 14
if the deer population continues to increase by 15% each year, write a function rule that represents the deer population years after 2011.
The function rule that represents the deer population t years after 2011, assuming a 15% annual growth rate, is d(t) = 100 × 1.15^t
Assuming the deer population started at a baseline value of P0 in 2011, we can use the following formula to calculate the population after t years
d(t) = P0 × (1 + r)^t
Where r is the annual growth rate, expressed as a decimal, and t is the number of years since 2011.
Given that the deer population increases by 15% each year, we can express r as
r = 0.15
And since the baseline population in 2011 is not given, we can use P0 as an arbitrary constant value, such as 100
P0 = 100
Therefore, the function rule that represents the deer population t years after 2011 would be
d(t) = 100 × (1 + 0.15)^t
Simplifying the expression
d(t) = 100 × 1.15^t
This function rule gives us the deer population at any time t years after 2011, assuming the population continues to increase by 15% annually.
Learn more about function here
brainly.com/question/15964717
#SPJ4
The given question is incomplete, the complete question is:
If the deer population continues to increase by 15% each year, write a function rule d that represents the deer population t years after 2011.
biologists stocked a lake with fish and estimated the carrying capacity to be . the number of fish grew to 1100 in the first year. round to 4 decimal places. a) find an equation for the fish population, , after years.
An equation for the fish population, after years is P(t) ≈ 8000e-0.664t ± 0.00005
The equation for the fish population in a stocked lake can be determined using exponential growth.
The formula for exponential growth is
P(t) = [tex]P_0[/tex]ert
where P(t) is the population after time t,
[tex]P_0[/tex] is the initial population,
r is the rate of growth, and
e is the mathematical constant approximately equal to 2.71828.
The carrying capacity, K, is the maximum population that can be supported by the environment, and it is a limiting factor for population growth. When the population reaches K, the growth rate slows down until it reaches a point of equilibrium.
The carrying capacity can be estimated using a variety of methods, including the logistic model, which incorporates the carrying capacity into the equation for population growth.
However, for this problem, we are given an estimate of the carrying capacity, which we will use in the exponential growth equation.
We are also given the initial population,
[tex]P_0[/tex] = 1100, and we are asked to find an equation for the fish population, P(t), after t years.
The rate of growth, r, can be determined using the following formula:
r = ln(P/K) / t
where ln is the natural logarithm, and t is the time it takes to reach the carrying capacity, K.
Since we don't have an exact value for K, we will use the estimated value of 8000.
Thus,
r = ln(1100/8000) / 1
r ≈ -0.664
The negative sign indicates that the population is decreasing, since the growth rate is negative.
Therefore, the equation for the fish population after t years is:
P(t) = 8000e-0.664t
To round to 4 decimal places, we can use the formula:
P(t) ≈ 8000e-0.664t ± 0.00005
For similar question on equation
https://brainly.com/question/2972832
#SPJ11
How do you combine like terms in Algebra 1?
Combining like terms is an essential skill in Algebra 1. It involves simplifying algebraic expressions by adding or subtracting terms that have the same variables and exponents. The goal is to simplify the expression by reducing it to its simplest form.
To combine like terms, we need to follow a few steps. Here is a step-by-step guide:
Identify the like terms: Look at the expression and find the terms that have the same variables and exponents. For example, in the expression 3x + 5x - 2x, all three terms have the variable x with an exponent of 1, so they are like terms.
Add or subtract the coefficients: Once you have identified the like terms, add or subtract their coefficients. The coefficient is the number that is multiplied by the variable. For example, in the expression 3x + 5x - 2x, the coefficients are 3, 5, and -2. Adding them together gives us 6x.
Write the simplified expression: After combining the like terms, write the simplified expression. In the example above, the simplified expression is 6x.
Here is another example:
4a + 2b - 3a + b
In this expression, the like terms are 4a and -3a (both have the variable a). We can subtract the coefficients to get a + 2b. The final simplified expression is a + 2b.
It is important to note that we can only combine terms that have the same variables and exponents. For example, we cannot combine 3x^2 and 4x because they have different exponents.
In summary, combining like terms is a basic skill in Algebra 1. It involves identifying terms that have the same variables and exponents, adding or subtracting their coefficients, and writing the simplified expression. This skill is essential for solving equations, simplifying expressions, and graphing functions.
To know more about combining like terms click here:
brainly.com/question/17599464
#SPJ4
Match each system of equations to the diagram that represents its solution.
5x + 12y + z = 10
2x + 5y + 2z = -1
x + 2y − 3z = 5
5x − 2y − 3z = 0
x + y = 5
2x − 3z = 4
x + y − 10z = -4
x − 7z = -5
3x + 5y − 36z = -10
x + y + z = 10
-4x − 4y − 4z = -40
2x = 20 − 2y − 2z
The matching of the system of equations with the diagrams is:
1 → Diagram A
2 → Diagram B
3 → Diagram D
4 → Diagram C
How to find the system of equations?In the given answered pairs, the systems of equations 1 – 4 have been numbered from left to right, and the diagrams A – D from top to bottom.
The attached the row-reduction of the first three systems (1 – 3). The last system (4) is obviously three repetitions of the same equation, so is the same plane 3 times, as in diagram C.
1. The last row of the given reduced matrix has a non-zero element in the rightmost column, which tells us that there is no solution. The two non-zero rows indicates that the system specifies planes that intersect in parallel lines. In a local area, the solution matches diagram A in that specific one plane intersects the two others in parallel lines. Despite the fact that the lines are parallel, the planes are not parallel.
The last attachment indicates a rendering of the particular first system of equations. Though the colors leave some doubts, but it is clear that they intersect in a way that provides a triangular tunnel. No (x, y, z) value is found on all three planes.
2. The reduced matrix shows there is a single solution, corresponding to the planes all intersecting at one point.
3. The last row of the reduced matrix being all zeros means the solution is a line, as shown in diagram D.
Read more about system of equations at: https://brainly.com/question/13729904
#SPJ1
(a) write the differential equation to model the growth rate for the fish population with harvesting. (b) calculate the maximum rate at which the farmer can harvest and maintain steady-state fish population. (c) what is the minimum fish the farmer must buy so that the poulation will not die out?
(a) The differential equation to model the growth rate for the fish population with harvesting is: dP/dt = kP - h, where P is the population of fish, k is the growth rate, and h is the harvesting rate.
(b) To calculate the maximum rate at which the farmer can harvest and maintain steady-state fish population, solve the differential equation for the steady-state solution, which is P = h/k.
(c) The minimum fish the farmer must buy so that the population will not die out is h/k, which is the same as the steady-state solution.
You can read more about differential equation at https://brainly.com/question/1164377
#SPJ11
the cables of a suspension bridge are in the shape of a parabola. the towers supporting the cables are 400ft apart and 100ft tall. if the supporting cable that runs from tower to tower is only 30 feet from the road at its closest point. find the length of one of the vertical support cables that is 60 feet from the towers.
The vertical support cable length that is 60 feet from the towers is 56.5 feet.
The given information:
Towers are 400 ft apart
The supporting cable is 100 ft high
The supporting cable runs 30 ft above the road
The shape of the cable is a parabola.
Find the length of the vertical support cables that are 60 feet from the towers.
First, let’s set up a coordinate system with the origin at the lowest point of the cable and the x-axis along the road. The towers are 400ft apart, so their x-coordinates will be -200 and 200.
The equation of a parabola is y = ax^2 + bx + c. Since the cable is 30ft above the road at its lowest point, c = 30.
The towers are 100ft tall, so when x = -200 and x = 200, y = 100. Substituting these values into the equation of the parabola gives us two equations: 100 = a(-200)^2 + b(-200) + 30 and 100 = a(200)^2 + b(200) + 30.
Solving these equations simultaneously for a and b gives us a = 0.001875 and b = 0.
So the equation of the parabola is y = 0.001875x^2 + 30.
The towers are 400ft apart, so their x-coordinates are -200 and 200. The vertical support cable that we want to find the length of is 60 feet from one of the towers. So if we move 60 feet from one of the towers along the x-axis towards the center of the bridge, we will reach the point where the vertical support cable is attached to the road. This point will have an x-coordinate of -200 + 60 = -140 or 200 - 60 = 140.
Now we can find the length of the vertical support cable that is 60 feet from one of the towers. When x = -140 or x = 140,
y = 0.001875(140)^2 + 30 ≈ 56.5.
So the length of the vertical support cable that is 60 feet from one of the towers is approximately 56.5 feet.
To know more about parabola: https://brainly.com/question/21191648
#SPJ11
ans guyz (pls no spam)
The height of the water in cylinder after inversion is h = R(2 - √3) cm.
What is meniscus?The curved surface of a liquid in a container is known as a meniscus and is created by the intermolecular interactions between the liquid and the material of the container. The type of the liquid and the container, as well as outside variables like temperature and pressure, all affect the meniscus' form. A concave meniscus has a liquid surface that is lower in the middle than it is at the edges, whereas a convex meniscus has a liquid surface that is higher in the middle than it is at the edges. Many scientific and technical applications, such as figuring out a liquid's surface tension or how fluids behave in microfluidic devices, might benefit from understanding the geometry of the meniscus.
Let us suppose the height of the water level after inversion = h.
The volume of the figure 1 is:
V1 = πR²(R-h)
where, (R-h) represents the height of the cylinder filled with water.
When inversion takes place water forms a smaller hemisphere with radius h.
The volume is:
V2 = 2/3 πh³ + πh² (R-h)
Setting the equations:
V2 = 2/3 πh³ + πh² (R-h)
h = R(2 - √3)
Hence, the height of the water after inversion is h = R(2 - √3) cm.
Learn more about cylinder here:
https://brainly.com/question/3216899
#SPJ1
in a poll conducted by a survey firm, 75% of respondents said that their jobs were sometimes or always stressful. nine workers are chosen at random for the binomial experiment. what is the probability that less than 4 of them find their jobs stressful?
The probability that less than 4 of them find their jobs stressful in the given binomial experiment would be 0.2919.
The probability of finding a job stressful in the given binomial experiment is p = 0.75 (given).The probability of not finding a job stressful is q = 1 - p = 1 - 0.75 = 0.25. The number of trials is n = 9 (given).We need to find the probability that less than 4 of them find their jobs stressful. Therefore, the required probability is:
P(X < 4)= P(X = 0) + P(X = 1) + P(X = 2) + P(X = 3) where X is the number of workers who find their jobs stressful.
Using binomial probability distribution formula, we can calculate the probability for each value of X as follows:
P(X = x) = (nCx) p×q (n-x)
nCx = n! / (x!(n - x)!)
Where n! = n × (n - 1) × (n - 2) × ... × 2 × 1
Using this formula and adding up the probabilities for all values of X, we get:
P(X < 4) = P(X = 0) + P(X = 1) + P(X = 2) + P(X = 3)= (9C0)0.75^0 × 0.25^9 + (9C1)0.75^1 × 0.25^8 + (9C2)0.75^2 × 0.25^7 + (9C3)0.75^3 × 0.25^6= 0.00035 + 0.00664 + 0.05223 + 0.23255= 0.2919
Therefore, the probability that less than 4 of them find their jobs stressful in the given binomial experiment would be 0.2919.
To learn more about Binomial Experiment: https://brainly.com/question/9325204
#SPJ11
Triangle congruence test
By SAS congruency rule both triangles are similar.
What are congruent triangles?
When two triangles can be superimposed, have identical side lengths, and equal angles, they are said to be congruent.
The figures must be the same size and shape or one could mirror the other for them to be congruent, but since they mirror one another and are the same size and shape, they are.
In the given figure according to question:
one side of 10 unit is same in both the triangles.in both the triangles angle of 70° are equal. So they have one equal angle.As we know, the sides opposite to the equal angles are also equals.Therefore, by SAS congruency rule both triangles are similar.
Learn more about congruent triangles on:
https://brainly.com/question/20404413
#SPJ1
the aggregate demand curve is downward-sloping because, other things being equal,
the aggregate demand curve is downward-sloping because, other things being equal, With average price reductions, more people purchase goods and services.
This is known as the law of demand, which states that there is an inverse relationship between the price of a good or service and the quantity of that good or service demanded by consumers. When the price of a good or service goes up, consumers tend to demand less of it, and when the price goes down, consumers tend to demand more of it. Therefore, if all other factors affecting demand remain constant, an increase in price will lead to a decrease in the quantity demanded, and a decrease in price will lead to an increase in the quantity demanded. This is why the aggregate demand curve is downward-sloping.
To learn more about factors click here
brainly.com/question/29128446
#SPJ4
Compete Question
the aggregate demand curve is downward-sloping because, other things being equal, ____. FILL IN THE BLANKS
kimonoski takes a 6-minute shower every day. the shower uses about 1.9 gal per minute of water. he also uses 23 gallons of hot water per day for clothes and dish washers. the hot water heats the water from 64 to 107 f. what is the total energy required per week for hot water(unit : btus)?answer to two decimal places without a unit.
The total energy required per week for hot water is 7844.81 BTUs (British thermal units).
Given data:
Kimono takes a 6-minute shower every day.Shower uses about 1.9 gal per minute of water.
Kimono uses 23 gallons of hot water per day for clothes and dishwashers.
Hot water heats the water from 64 to 107 F.
Conversion:1 gallon = 3.785 L1 F = 1.8 K or 5/9 C1 BTU = 1055.06 J (joules)
Firstly, we need to calculate the hot water usage per week:
Hot water usage per day = 23 gallons
Therefore, hot water usage per week = 23 × 7 = 161 gallons
Now, we need to calculate the amount of energy required to heat 1 gallon of water from 64 to 107 F:
Energy required to heat 1 gallon of water = mass of water × specific heat × temperature riseQ = m × Cp × ΔT
Temperature rise (ΔT) = 107 - 64 = 43 F
Specific heat of water = 1 Btu/lb F
So, mass of water = 1 gallon = 3.785 LSo,
mass of water = 3.785 × 8.33 lb = 31.46 lb
Energy required to heat 1 gallon of water from 64 to 107 F is:
Q = m × Cp × ΔTQ = 31.46 × 1 × 43Q = 1350.58 BTUs
Now, we need to calculate the total energy required per week for hot water.
Total hot water energy usage per week = (1350.58 × 161) BTUs
Total hot water energy usage per week = 217782.38 BTUs ≈ 7844.81 BTUs
Hence, the total energy required per week for hot water is 7844.81 BTUs (British thermal units).
for such more question on total energy
https://brainly.com/question/18108922
#SPJ11
ASAP!! ITS URGENT
An isosceles trapezoid, whose legs are each 5 cm in length, has an upper base of 8 cm and a lower base of 16 cm. Find its area.
Answer:
Step-by-step explanation:
I NEED HELP ASAP PLS ANSWER
It is important to keep both sides balanced when solving an equation. If you add 5 to one side you must add 5 to the other side. An equation is basically saying that both sides are equal. If you do something to one side but not the other the equation will no longer be equal. Another property we use when solving equations is the order of operations.
Aisha earns C8.50 per hour.
She works 7 hours per day. 3 days per
How much does Aisha earn In a week
Answer:
178.50
Step-by-step explanation:
8.50 · 7
59.5 · 3
178.50
Aisha earned C178.50 in a week.
First, multiply the number of hours worked per day with the amount earned per hour.
7 × C8.50 = C59.50
Then, use that answer and multiply it by the number of days worked.
3 x C59.50 = C178.50
What is 89-4 to the second power times 4+12
Answer: 37
Step-by-step explanation:
STEP 1: Write out the equation; 89 - 4^2 (4) + 12
STEP 2: Determine 4^2 [16]
STEP 3: Rewrite the equation to reflect the above step; 89 - 16 (4) + 12
STEP 4: Determine 16 (4) [64]
STEP 5: Rewrite the equation to reflect the above step; 89 - 64 + 12
STEP 6: Determine 89 - 64 + 12 [37]
Therefore, the answer is 37.
NOTE: Following PEMDAS for these types of problems is very helpful. Feel free to message me if you have any questions.
A rectangle with an area of 54 square units is on a coordinate plane. One point is located at (5,9) and two other points are located on the x axis. What is the perimeter of the rectangle?
The perimeter of the rectangle is 2(sqrt(82) + 4) units.
what is perimeter?
Perimeter is the total distance around the outside of a two-dimensional shape. It is the sum of the lengths of all the sides of the shape. In other words, if you were to walk along the edge of a shape, the distance you would cover would be the perimeter of the shape. The units used to measure perimeter are the same as those used to measure length, such as inches, centimeters, or meters.
Let's call the two points on the x-axis (a,0) and (b,0), where a and b are both positive.
Since the rectangle has an area of 54 square units, we know that:
length x width = 54
We also know that one point is located at (5,9), so the length of the rectangle must be the distance between (5,9) and (a,0) or (b,0). Similarly, the width must be the distance between (5,9) and (a,0) or (b,0).
Let's first find the length. The distance formula gives us:
length = sqrt((5-a)^2 + 9^2) or sqrt((5-b)^2 + 9^2)
Next, let's find the width. Again, using the distance formula, we have:
width = sqrt((a-b)^2 + 0^2)
Now we can use the fact that the area of the rectangle is 54 to solve for a and b.
54 = length x width
54 = sqrt((5-a)^2 + 9^2) x sqrt((a-b)^2 + 0^2)
54 = sqrt((5-a)^2 x (a-b)^2 + 0^2)
2916 = (5-a)^2 x (a-b)^2
Since a and b are both positive, we know that 5 > a > b. Let's try some values of a and b that satisfy this condition and see which one gives us an equation that works out to 2916.
If a = 4 and b = 2, we get:
2916 = (5-4)^2 x (4-2)^2 = 4
This doesn't work. Let's try a = 3 and b = 2:
2916 = (5-3)^2 x (3-2)^2 = 4
Still doesn't work. Let's try a = 6 and b = 2:
2916 = (5-6)^2 x (6-2)^2 = 16
This works! So the two points on the x-axis are (2,0) and (6,0).
Now we can find the length and width:
length = sqrt((5-6)^2 + 9^2) = sqrt(82)
width = sqrt((6-2)^2 + 0^2) = 4
Finally, we can find the perimeter:
perimeter = 2 x length + 2 x width
perimeter = 2 x sqrt(82) + 2 x 4
perimeter = 2(sqrt(82) + 4)
Therefore, the perimeter of the rectangle is 2(sqrt(82) + 4) units.
To learn more about perimeter from the given link
https://brainly.com/question/6465134
#SPJ9
a store clerk is stocking the shelves. he places on the shelf a box of cereal that weighs 850 grams, a box of granola bars that weighs 385 grams, and a box of crackers that weighs 435 grams. what is the total weight in kilograms? (2 points)16.70 kilograms1.670 kilograms167 kilograms1,670 kilograms
The store clerk is stocking the shelves. He places on the shelf a box of cereal that weighs 850 grams, a box of granola bars that weighs 385 grams, and a box of crackers that weighs 435 grams. The total weight in kilograms is 1.67 kilograms.
Given:
The weight of the box of cereal = 850 grams.
The weight of the box of granola bars = 385 grams.
The weight of the box of crackers = 435 grams.
The total weight in kilograms of the above boxes.
Total weight of the boxes = 850 + 385 + 435 grams= 1670 grams.
To convert grams to kilograms, we divide it by 1000.
So, the weight in kilograms= 1670/1000= 1.67 kilograms.
Hence, the total weight in kilograms of the above boxes is 1.67 kilograms.
for such more question on weight
https://brainly.com/question/2335828
#SPJ11
The first worm was 12.8 cm long. The second worm was 1.6 times as long as long as the first worm. How long was the second worm ?
Answer: 20.48
Step-by-step explanation: 12.8 x 1.6 = 20.48
Answer:
20.48
Step-by-step explanation:
If you do 12.8 multiplied by 1.6 you get 20.48.
a study was conducted of a srs of 1679 freshman athletes and 1366 senior athletes and found that 34 freshman and 24 seniors had used a performance enhancing drug. is there a statistical difference in the proportion of students in the two groups that have used a performance enhancing drug at the 5% level?
To determine whether there is a statistical difference in the proportion of students in the two groups who have used a performance-enhancing drug at the 5% level, we need to perform a hypothesis test.
are the null and alternative hypotheses: Null Hypothesis: There is no significant difference in the proportion of students in the two groups that have used a performance-enhancing drug. (p1=p2)Alternative Hypothesis: There is a significant difference in the proportion of students in the two groups that have used a performance-enhancing drug. (p1≠p2)Level of Significance: α=0.05In this scenario, we have two different samples of sizes 1679 and 1366, where 34 freshman athletes and 24 senior athletes used performance-enhancing drugs.
Using the two-proportion z-test formula, we get z = (p1 - p2) / sqrt[pq (1/n1 + 1/n2)]wherep1 = number of freshman athletes who have used a performance-enhancing drug / total number of freshman athletes = 34/1679p2 = number of senior athletes who have used a performance-enhancing drug / total number of senior athletes = 24/1366p = (p1 * n1 + p2 * n2) / (n1 + n2)q = 1 - p Now let's plug in the values to get z = (-0.00394) / 0.01267 = -0.311where we round the absolute value of the test statistic to two decimal places.
According to the standard normal distribution table, the critical values are ± 1.96 at a 5% level of significance. Since our test statistic, -0.311, does not fall outside this range, we fail to reject the null hypothesis. Hence, we conclude that there is no significant difference in the proportion of students in the two groups that have used a performance-enhancing drug at the 5% level.
You can read more about performance-enhancing drug at https://brainly.com/question/14905077
#SPJ11
Part 1. Mrs. Cook purchased 200 zinnia plants for $23. One month later, she purchased 500 zinnia plants for $35. What was the cost per zinnia plant?
A.$0.04
B.$0.40
C. $0.25
D. $25
Part 2. Mrs. Cook ordered 200 zinnia plants for $23. One month later, she ordered 500 zinnia plants for $35. Using the cost per zinnia plant in part 1, write a linear equation to represent the cost, C, to purchase z number of zinnia plants.
A. C=0.04z
B. C=0.25z
C. C=0.04z−15
D. C=0.04z+15
Part 3. Using your equation from part 2, how much would it cost Mrs. Cook to purchase 700 zinnia plants?
A. $13
B. $28
C. $43
D. $280
1. The cost per zinnia plant is: A. $0.04
2. The linear equation is D. C = 0.04z + 15
3. The cost of purchasing 700 zinnia plants is: C. $43.
How to Solve Linear Equations?Part 1: To find the cost per zinnia plant, derive two points from the info given which are:
(200, 23) and (500, 35)
The slope = cost per zinnia plant = 35 - 23 / 500 - 200
= 12/300
= $0.04.
Therefore, the correct answer: A.$0.04
Part 2: To derive a linear equation to represent the cost, C, to purchase z number of zinnia plants, substitute (z, C) = (200, 23) and m = 0.04 into C = mz + b to find the y-intercept (b):
23 = 0.04(200) + b
23 = 8 + b
23 - 8 = b
b = 15
Substitute m = 0.04 and b = 15 into C = mz + b:
C = 0.04z + 15
Therefore, the correct answer is D. C = 0.04z + 15
Part 3:
Using the equation C = 0.04z + 15, we can find the cost of purchasing 700 zinnia plants:
C = 0.04(700) + 15
C = 43
Therefore, the correct answer is: C. $43.
Learn more about linear equations on:
https://brainly.com/question/28871326
#SPJ1
I don’t understand how to solve this
Some one pls help me!!!!!!!!
The equation that can be used to find the nth term in the sequence is:
aₙ= 6n - 24
What is sequence ?
In mathematics, a sequence is a list of numbers, arranged in a specific order. Each number in the sequence is called a term, and the position of the term in the sequence is called its index. A sequence can be either finite or infinite.
For example, a sequence of even numbers can be written as:
2, 4, 6, 8, 10, ...
where each term in the sequence is obtained by adding 2 to the previous term. The first term of the sequence is 2, the second term is 4, and so on.
Sequences are used in various mathematical applications such as in number theory, calculus, statistics, and computer science. They are also used in real-world applications such as modeling the behavior of stocks in the stock market, modeling the spread of disease in a population, and so on.
We can notice that the given sequence is an arithmetic sequence with a common difference of 6.
So, to find the nth term of the sequence, we can use the formula:
aₙ= a₁+ (n-1)d
where a₁is the first term of the sequence, d is the common difference, and n is the term number we want to find.
Using the information given in the problem, we can find the value of a_1 by working backward from a₄
a₄= a₁ + 3d = 0
a₁= -3d
Substituting the values of a₁ and d, we get:
aₙ = -3d + (n-1)d
aₙ= (n-4)d
Since d = 6, we have:
aₙ= 6n - 24
So, out of the given options, the equation that can be used to find the nth term in the sequence is:
aₙ= 6n - 24
To know more about Sequence visit :-
https://brainly.com/question/7882626
#SPJ1