The parabola and the circle have the same axis of symmetry, and can intersect at one point only.
The statement that must be true is; The maximum number of solution is one
Reason:
The given parameters are;
Location of the center of the circle = The origin (0, 0)
Location of the vertex of the parabola opening upwards = (0, 9)
Point where the circle intersects the parabola = The vertex
Required:
The statement that must be true
Solution;
The equation of the circle is x² + y² = r²
The vertex (0, 9) is a point on the circle, therefore;
0² + 9² = r²
The radius, r = 9
The highest point on the circle is the point with the maximum vertical
distance from the center, which is the point (0, 9), which is also the lowest
point on the parabola.
Therefore, the parabola and the circle can intersect at only the point (0, 9),
which gives;
The maximum number of solution is one.
Learn more here:
https://brainly.com/question/9988748
How many squares with sides that are 6 inches long are needed to cover a square with a side length of 30 inches without overlapping
Twenty-five squares with a side length of 6 inches are required to cover a square with a side length of 30 inches.
Explanation:To find out how many squares with sides that are 6 inches long are needed to cover a square with a length of 30 inches, you first need to find the area of each square.
The area of a square is found by multiplying the length of one side by itself.
So, the area of the smaller square is 6 * 6 = 36 square inches, and
the area of the larger square is 30 * 30 = 900 square inches.
Then, you divide the area of the larger square by the area of the smaller square:
900/36 = 25.
Therefore, 25 squares with sides of 6 inches are needed to cover a square with a side length of 30 inches.
Learn more about Area of Squares here:https://brainly.com/question/33403734
#SPJ2
Write 11760825 in word form
If 5 workers can pave 10 driveways in 30 days, how many days would it take 20 workers to pave 38 driveways?
Determine whether the given differential equation is exact. if it is exact, solve it. (if it is not exact, enter not.) (3x + 6y) dx + (6x − 8y3) dy = 0
The given differential equation (3x + 6y) dx + (6x − 8y3) dy = 0 is exact because its mixed partial derivatives are equal. To solve it, first integrate M with respect to x to get a function involving an unknown function of y, then compare it with N to determine the unknown function.
Explanation:To determine if the given differential equation is exact, we need to check if the partial derivative of M with respect to y is the same as the partial derivative of N with respect to x. In this given differential equation (3x + 6y) dx + (6x − 8y3) dy = 0, M = 3x + 6y and N = 6x - 8y3. First, compute the partial derivative of M with respect to y (∂M/∂y) which is 6, then the partial derivative of N with respect to x (∂N/∂x), which is 6 as well. Since ∂M/∂y=∂N/∂x, the given differential equation is exact.
To solve this exact differential equation, we integrate M dx, i.e., ∫M dx, to get ψ(x,y) =1.5x^2+6xy+h(y), where h(y) is an arbitrary function of y. Next, differentiate ψ(x,y) with respect to y, then compare the result with N: ψy=6x+dh/dy=6x-8y³. Solving for dh/dy gives dh/dy=-8y³, so integrating this gives h(y)=-2y⁴+C, where C is a constant. Therefore, the solution to the differential equation is ψ(x,y)=1.5x²+6xy-2y⁴=C.
Learn more about Differential Equations here:https://brainly.com/question/33814182
#SPJ2
Find all solutions to the equation csc theta +sqrt2 = 0
To make the two triangles below similar, what would the values of x and y have to be?
Allana 3/5 used yard of fabric to make a scarf. Can she make 2 of these scarves with 1 7/10 yards of fabric, and why?
Please Help
Samantha threw an apple out of a window. The equation -16t^(2)+120=y can be used to represent the apple's height above the ground, where t = time in seconds after she threw the apple. how long did it take for the apple to hit the ground. Round to nearest hundredth
A basket contains five apples and seven peaches. Four of the apples and two of the peaches are rotten. You randomly pick a piece of fruit. It is fresh or it is an apple. Find the probability of this occuring.
Answer:[tex]\frac{5}{6}[/tex]
Step-by-step explanation:
Given
5 apples and 7 peaches out of which 4 apples and 2 peaches is rotten
i.e. 1 apple and 5 peaches is fresh
probability of fresh fruit is =[tex]\frac{6}{12}[/tex]
probability of apple =[tex]\frac{5}{12}[/tex]
Probability of both =[tex]\frac{1}{12}[/tex]
Probability of fresh or an apple is=[tex] \frac{6}{12}+\frac{5}{12}-\frac{1}{12}[/tex]
=[tex]\frac{5}{6}[/tex]
-5g-3/h-3 + 7g+9/h-3 find the sum
A domino consists of two congruent squares placed side by side. the perimeter of the domino is 60 units. what is the area of the domino, in square units?
Answer:
200
Step-by-step explanation:
So say the dominoes' short side is x. Then the long side is 2x, so altogether there is 6x. So 6x=60, so x=10. So the area is 10*(10*2), which is 10*20 which is 200.
486 is what percent of 900
The tables represent two linear functions in a system.
What is the solution to this system?
The solution to this system is (x, y) = (8, -22).
The y-values get closer together by 2 units for each 2-unit increase in x. The difference at x=2 is 6, so we expect the difference in y-values to be zero when we increase x by 6 (from 2 to 8).
You can extend each table after the same pattern.
In table 1, x-values increase by 2 and y-values decrease by 8.
In table 2, x-values increase by 2 and y-values decrease by 6.
The attachment shows the tables extended to x=10. We note that the y-values are the same (-22) for x=8 (as we predicted above). That means the solution is ...
... (x, y) = (8, -22)
Answer:
(8,-22)
Step-by-step explanation:
Table 1)
To form equation we will use two point slope form
[tex](x_1,y_1)=(-4,26)\\(x_2,y_2)=(-2,18)[/tex]
Formula :[tex]y-y_1=\frac{y_2-y_1}{x_2-x_1}(x-x_1)[/tex]
Substitute the values :
[tex]y-26=\frac{18-26}{-2+4}(x+4)[/tex]
[tex]y-26=-4(x+4)[/tex]
[tex]y-26=-4x-16[/tex]
[tex]y=-4x-16+26[/tex]
[tex]y=-4x+10[/tex] ---1
Table 2)
To form equation we will use two point slope form
[tex](x_1,y_1)=(-4,14)\\(x_2,y_2)=(-2,8)[/tex]
Formula :[tex]y-y_1=\frac{y_2-y_1}{x_2-x_1}(x-x_1)[/tex]
Substitute the values :
[tex]y-14=\frac{8-14}{-2+4}(x+4)[/tex]
[tex]y-14=-3(x+4)[/tex]
[tex]y-14=-3x-12[/tex]
[tex]y=-3x+2[/tex] ---2
Now we are supposed to solve 1 and 2
Substitute the value of y from 1 in 2
[tex]-4x+10=-3x+2[/tex]
[tex]8=x[/tex]
Substitute the value of x in 2
[tex]y=-3(8)+2[/tex]
[tex]y=-22[/tex]
Hence the solution to this system is (8,-22)
Darcy kicks a ball that is represented by the function h\left( t \right) = - 16{t^2} + 50t h ( t ) = − 16 t 2 + 50 t where t stands for time and h(t) stands for the height of the ball in feet. How long will it take for the ball to hit the ground?
you have 5 antiques and want to display 3 on a shelf. how many different 3 antique arrangements are possible
which inequality can be uses to determine
#2 is the correct answer
5h would be the amount he earned helping his brother
+ 26 is how much he has
so those 2 amounts need to equal or be greater than 48
HELP??? Which expression is NOT equal to the volume of the prism?
What are the X intercepts of a parabola with vertex (6,27) and y intercept of (0,-81)?
Choose the best definition for the following term: variable (1 point)
Answer:
The Meaning of term Variable is that Quantity Represented by small or Capital Alphabets of English whose value is not fixed.It can vary on different Situations.For example , Human diet can be called Variable.
In morning , you ate total of 0.25 Kg, in Afternoon you ate =0.50 Kg in total, and in the evening you ate total of 1 Kg.
So, if x is a variable of my Diet taken from Morning to evening, it has taken three distinct values, which are, x= 0.25, 0.50,1.
Here, x is a Variable, and 0.25,0.50 and 1 are Constant.
How many positive integers not exceeding 1000 are not divisible by either 4 or 6?
There are 667 positive integers not exceeding 1000 that are not divisible by either 4 or 6.
Explanation:This is a question about number theory and involves the comprehension of divisibility. To identify the positive integers that are not divisible by either 4 or 6 and not exceeding 1000 is an application of the principle of inclusion and exclusion.
First, we need to figure out how many numbers up to 1000 are divisible by 4, which is 1000/4 = 250. Then, we look at how many numbers are divisible by 6, which is 1000/6 = about 166 (we only consider the whole numbers).
However, some numbers are divisible by both 4 and 6, so we have over-counted and need to correct for this. These would be the numbers divisible by the least common multiple (LCM) of 4 and 6, which is 12. There are 1000/12 = about 83 such numbers.
Thus, according to the principle of inclusion and exclusion, the total number of numbers divisible by 4 or 6 would be 250 + 166 - 83 = 333. The last step is to subtract this from the total number of integers from 1 to 1000, so the answer would be 1000 - 333 = 667.
Learn more about Number Divisibility here:https://brainly.com/question/35557298
#SPJ11
Use rounding or compatible numbers to estimate sum 198+727
a soccar team spent $55 dollars on supplies for a car wash then earned $275 whats their total after paying for supplies
All of the following expressions are equivalent except _____. -4 - y -4 + y -y - 4 -y + (-4)
All of the expressions are equivalent except (b) -4 + y.
All the expressions involve adding -4 and - y in various orders, resulting in equivalent expressions due to the commutative property of addition.
However, the expression -4 + y is different because it combines the positive y term with the negative 4, resulting in - 4 + y.
The other expressions either have y added to -4 ( -4 - y) or have -4 added to y (-y - 4, -y + (-4)).
While addition is commutative, changing the order of the terms can affect the overall expression when dealing with negative terms.
So, while mathematically equivalent, the form of -4 + y stands out due to its structure.
Complete Question:
All of the following expressions are equivalent except _____.
(a) -4 - y
(b) -4 + y
(c) -y - 4
(d) -y + (-4 )
On Saturday a local shop shop sold a combine TOTAL of 345 hamburgers and cheeseburgers. The number of cheeseburgers sold was 2 times the number of hamburgers. How many hamburgers were sold on Saturday?
x = hamburgers
2x = cheeseburgers
x +2x = 345
3x = 345
x = 345/3 = 115
115 hamburgers were sold
If fixed costs are $561,000 and the unit contribution margin is $8.00, what is the break-even point in units if variable costs are decreased by $0.50 a unit?
Answer:
66,000 units
Step-by-step explanation:
Break-Even Sales (units) = Fixed Costs ÷ Unit Contribution Margin = $561,000 ÷ ($8 + $0.50) = 66,000 units
The break-even point in units after the decrease in variable costs is 66,000 units.
Given that the fixed costs are $561,000 and the original unit contribution margin is $8.00, we first calculate the original break-even point:
[tex]\[ \text{Original Break-even point in units} = \frac{561,000}{8} \][/tex]
[tex]\[ \text{Original Break-even point in units} = 70,125 \text{ units} \][/tex]
Now, since variable costs are decreased by $0.50 a unit, the new unit contribution margin becomes:
[tex]\[ \text{New Unit Contribution Margin} = 8 + 0.50 \][/tex]
[tex]\[ \text{New Unit Contribution Margin} = 8.50 \][/tex]
Using the new unit contribution margin, we calculate the new break-even point:
[tex]\[ \text{New Break-even point in units} = \frac{561,000}{8.50} \][/tex]
[tex]\[ \text{New Break-even point in units} = 66,000 \text{ units} \][/tex]
Therefore, the new break-even point in units, after the decrease in variable costs, is 66,000 units.
Please help with this
A store is selling two mixtures of coffee beans in one-pound bags. The first mixture has 12 ounces of Sumatra combined with 44 ounces of Celebes Kalossi, and costs $42. The second mixture has 44 ounces of Sumatra and 12ounces of Celebes Kalossi, and costs $30. How much does one ounce of Sumatra and one ounce of Celebes Kalossi cost?
Eyjafjallajökull is a Volcano in Ice land. During a recent eruption, the volcano, spewed out copious amounts of ash. One small was ejected from the volcano with an initial velocity of 368ft/sec. The height H, in feet, of our ash projectile is given by the equation H= -16t +368t
1. When does the ash projectile reach its maximum height?
2. What is its maximum height?
3. When does the ash projectile return to the ground?
You have been offered a project paying $300 at the beginning of each year for the next 20 years. what is the maximum amount of money you would invest in this project if you expect 9 percent rate of return to your investment?
a jar contains nickels and pennies. there are 56 coins in the jar in all. the total value of the coins is 1.52. how many pennies are in the jar
After solving the equations, it is found that there are 32 pennies in the jar.
To solve the problem of determining the number of pennies in the jar, first we establish two variables: let's denote P for the number of pennies and N for the number of nickels.
According to the problem, there are 56 coins in total, which gives us the equation P + N = 56. Also, we know that the total value of the coins is $1.52, and because each penny is worth 1 cent and each nickel is worth 5 cents, we have another equation, which is P + 5N = 152 (since there are 100 cents in a dollar).
Now we have a system of two equations to work with:
P + N = 56
P + 5N = 152
To find P, we can subtract the first equation from the second equation to eliminate P and solve for N:
0P + 4N = 96
N = 96 / 4
N = 24
Now that we know there are 24 nickels, we can find the number of pennies by substituting N back into the first equation:
P + 24 = 56
P = 56 - 24
P = 32
Therefore, there are 32 pennies in the jar.