Use Stokes' Theorem to evaluate C F · dr where C is oriented counterclockwise as viewed from above.
F(x, y, z) = xyi + 5zj + 7yk, C is the curve of intersection of the plane x + z = 8 and the cylinder x2 + y2 = 9.
Dan counted all the coins in his bank, and he had 72 quarters. can he exchange the quarters for an even amount of dollar bills? how do you know?
How do you write 6.8 as a fraction?
Jeff collects toy cars. they are displayed in a case that has 4 rows. there are 6 cars in each row. how many cars does jeff have?
What is the value of 324?
Find the surface area and volume of a sphere having a radius of 4"
Solve the exponential equation
9^2x = 27
Answer:
The value of x is, [tex]\frac{3}{4}[/tex]
Explanation:
Given:
The exponential equation [tex]9^{2x} =27[/tex] ....[1]
Exponential Identities:
[tex](x^a) =x^{ab}[/tex]
we can write equation [1] as;
[tex](3^2)^{2x} = 3^3[/tex] [ [tex]3 \times 3= 9 , 3 \times 3 \times 3 = 27 [/tex] we can rewrite as [tex]3^2 =9 , 3^3 =27[/tex]]
by using above identities, we have
[tex](3)^{4x} = 3^3[/tex] then,
[tex]4x =3[/tex] [ if [tex]x^a =x^b[/tex] then a =b]
Simplify:
[tex]x = \frac{3}{4}[/tex]
1.) If 60% of a number is 18, what is 90%of the number?
A.)3
B.)16
C.)27
D.)30
2. Taryn's grandma took her family out to dinner.If the dinner was $74 and Taryan's dinner was 20% of the bill, how much was Taryn's dinner?
A.$6.80
B.$7.20
C.$9.50
D.$14.80
p varies directly as q. When q = 31.2, p = 20.8. Find p when q = 15.3.
a.10.2
b.22.95
c.42.4
i got B ...?
we know that
A relationship between two variables, x, and y, represent a direct variation if it can be expressed in the form [tex]y/x=k[/tex] or [tex]y=kx[/tex]
In this problem we have
[tex]p=20.8\\q=31.2[/tex]
Find the value of k
[tex]k=q/p[/tex]
Substitute the values
[tex]k=31.2/20.8[/tex]
[tex]k=1.5[/tex]
The linear equation is
[tex]q=1.5p[/tex]
For [tex]q=15.3[/tex]
Find the value of p
Substitute in the linear equation and solve for p
[tex]15.3=1.5p[/tex]
[tex]p=15.3/1.5=10.2[/tex]
therefore
the answer is the option a
[tex]10.2[/tex]
Point H is the incenter of triangle ABC. Find DH.
a. 14
b. 7
c. 18
d. 21
Due to a lack of information provided, the length of segment DH in the triangle ABC, where H is the incenter, cannot be determined as provided options could all be possible or might be something entirely different.
Explanation:The question doesn't provide enough information to determine the length of segment DH. In a triangle, the incenter is the center of the inscribed circle (incircle). This is the point where all the angle bisectors of the triangle meet. Segment DH would be a line from the incenter to a point on one of the triangle's sides, in other words, a radius of the incircle. However, without more information such as the length of the sides of the triangle or its area, it isn't possible to determine the length of DH. It could be any of the provided options (14, 7, 18, 21) or something else entirely.
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The incenter of a triangle is the point where the angle bisectors of the three angles of the triangle intersect.
Explanation:The incenter of a triangle is the point where the angle bisectors of the three angles of the triangle intersect. To find the distance DH, we can use the fact that the incenter is equidistant from the three sides of the triangle.
Let AD, BE, and CF be the angle bisectors of triangle ABC, where D, E, and F are the points of intersection with the sides.The incenter H is equidistant from each side of the triangle. So, we have DH = EH = FH.Let DH = x. Then, we have AH = 2x, BH = 2x, and CH = 2x.Therefore, DH = x = (AH + BH + CH)/3 = (2x + 2x + 2x)/3 = 6x/3 = 2x.
Since DH = 2x, the distance DH will be twice the distance from the incenter to any side of the triangle. Without knowing the specific values of the sides of triangle ABC, we cannot determine the exact value of DH. Therefore, none of the given options (a, b, c, d) is the correct answer.
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A certain forest covers an area of 5000km^2 . Suppose that each year this area decreases by 5.75% . What will the area be after 14 years?
...?
The forest with an area of 5000 km² decreases by 5.75% annually. After 14 years, the forest area will be approximately 2,182 km².
The interest that is computed using both the principal and the interest that has accrued during the previous period is called compound interest.
The compound interest formula is:
[tex]A = P(1 + \frac{r}{n})^{nt}[/tex]
Where,
A is compounded amount
P is principal amoutn
r is the rate of interest
n is the number of times it is compounded
Given that,
Initial forest area (P): 5000 km²
Rate of decrease per year: 5.75% or 0.0575
Number of years (n): 14
Since the area is decreasing,
Therefore r = -0.0575
Plugging in the values in the compound interest formula,
[tex]A = 5000 \times (1 - 0.0575)^{14} \\\\\approx 2,182 \text{ square km}[/tex]
Hence,
After 14 years, the forest area would be approximately 2,182 km².
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Find the value of the function when n = 7. p = 0.006n
a. 0.0078
b. 0.042
c. 0.42
d. 7.006
If the numerator of a fraction is increased by 3, the fraction becomes 3/4. If the denominator is decreased by 7, the fraction becomes 1. Determine the original fraction.
Which of the following equations represents "If the numerator of a fraction is increased by 3, the fraction becomes 3/4"? (Hint: cross products)
Answer: 4n + 12 = 3d
Step-by-step explanation:
The equation representing "If the numerator of a fraction is increased by 3, the fraction becomes 3/4" is 4(x + 3) = 3y. This, alongside the second condition of the denominator decreased by 7 leading to the fraction becoming 1, provides two equations that can be solved for the original fraction.
Explanation:To represent the situation "If the numerator of a fraction is increased by 3, the fraction becomes 3/4," we can use the variable x for the numerator and y for the denominator of the original fraction. Therefore, the equation would be (x + 3)/y = 3/4. Applying the cross-product rule, we multiply each side of the fraction by the denominator on the other side, leading to 4(x + 3) = 3y. Simplified, this equation is 4x + 12 = 3y, which helps us solve for the original fraction along with the other given condition that reducing the denominator by 7 makes the fraction equal to 1. So, the second condition can be written as x/(y - 7) = 1. These two equations together can be solved simultaneously to find the values of x and y.
Team infinite dimensions canoed 15 3/4 miles in 3 hours. what was their average rate of speed in miles per hour?
In this triangle, the product of sin B and tan C is _____ , and the product of sin C and tan B is _______.
Answer
part 1 = c/a
part 2 = b/a
Sine is the ratio of opposite to hypotenuse respect to as a given angle while tangent is the ratio of opposite to adjacent lengths of a given angle.
Part 1
Sine = opposite/hypotenuse
SinB = b/a
Tangent = opposite/adjacent
TanC = c/b
SinB × TanC = b/a×c/b
= c/a
Part 2
SinC = c/a
TanB = b/c
SinC×TanB= c/a×b/c
= b/a
graph the function g (x)=1/3-4/3x
if a can is 12cm high and 8cm wide how much milk can it hold
Final answer:
To find the volume of a cylindrical can, one must apply the formula for volume of a cylinder, V = πr²h, with the given dimensions. The can's volume is approximately 603.19 cubic centimeters or milliliters, translating to about 0.603 liters.
Explanation:
The student is asking about the volume of a can, which is the measure of how much space it occupies or, in this context, how much liquid it can hold. To find the volume of a cylindrical can, we can use the formula V = πr²h, where V is the volume, r is the radius, and h is the height.
Since the can is 12 cm high and 8 cm wide (which is the diameter), the radius would be 4 cm (which is half of the diameter). Substituting these values into the formula gives us V = π(4cm)²(12 cm), which simplifies to V = π × 16 cm² × 12 cm). When calculated, the volume of the can is approximately 603.19 cubic centimeters.
Since the student may also be interested in capacity in terms of common liquid measurements, it is useful to know that 1 cubic centimeter is equivalent to 1 milliliter.
Thus, the can would be able to hold approximately 603.19 milliliters. Given that 1000 milliliters make up 1 liter, the can's capacity would be roughly 0.603 liters, which is a little over half a liter.
6/7 times 4/5 times 35
PLEASE HELP!!!! I DON'T KNOW HOW TO DO THIS!!
if 5a = 20b, then b/a=
A. 4
B. 1/4
C. 4/1
D. 10
The ratio b/a is found by dividing both sides of the equation 5a = 20b by 5a, resulting in b/a being B) 1/4.
The question asks us to solve for the ratio b/a given the equation 5a = 20b. To find b/a, we can divide both sides of the equation by 5a:
5a = 20bFrom this, we can see that b/a must be 1/4, since 4 multiplied by 1/4 equals 1. Therefore, the correct answer is B. 1/4.
what is the answer to this problem 452q=39,324 ?
On a movie set, an archway is modeled by the equation y = -0.5x^2 + 3x, where y is the height in feet and x is the horizontal distance in feet. A laser is directed at the archway at an angle modeled by the equation -0.5x + 2.42y = 7.65 such that the beam crosses the archway at points A and B. At what height from the ground are the points A and B?
A.) 1.5 feet and 3.5 feet
B.) 1.4 feet and 4 feet
C.) 3.5 feet and 4 feet
D.) 4 feet and 4 feet
The laser will cut the archway at height of 3.5 feet and 4 feet (Option C).
Equating the parabolic and Linear Equation?A linear equation exists an equation in which the highest power of the variable stands always 1. It exists also known as a one-degree equation. The standard form of a linear equation in one variable exists in the form Ax + B = 0. Here, x is a variable, A exists as a coefficient and B is constant.
A parabola exists as a plane curve that stands mirror-symmetrical and is approximately U-shaped. It fits several superficially various mathematical descriptions, which can all be proved to determine exactly the same curves.
Refer to the following figure:
The blue line represents eqn of archway: y = -0.5x^2 + 3x, and green line represent eqn of laser: -0.5x + 2.42y = 7.65.
Now to find out the points at which laser cuts archway, we need to equate both the eqns.
[tex]-0.5x^{2} +3x=\dfrac{7.65+0.5x}{2.42}[/tex]
[tex]-1.21x^{2} +7.26x=7.65+0.5x[/tex]
[tex]-1.21x^{2} +6.76x-7.65[/tex]=0
On solving the quadratic eqns, we get x =3.5 and 4 (approximate)
Therefore, point A and B are 3.5 and 4 feet respectively.
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A flower bed is in the shape of a triangle with one side twice the length of the shortest side, and the third side is 13 feet more than the length of the shortest side. Find the dimensions if the perimeter is 125 feet
Translate this sentence into an equation.
The product of Matt's score and
6
is
96
.
Use the variable
m
to represent Matt's score.
Final answer:
The sentence 'The product of Matt's score and 6 is 96' translates to the equation m × 6 = 96. By dividing both sides by 6, the value of Matt's score, denoted as m, is found to be 16.
Explanation:
To translate the given sentence into an equation, you start by identifying the mathematical operation described. The sentence states 'The product of Matt's score and 6 is 96'. The word 'product' indicates multiplication. Next, you use the variable m to represent Matt's score.
The equation that represents this situation is:
m × 6 = 96
To solve for m, you divide both sides of the equation by 6:
m = 96 ÷ 6
m = 16
Therefore, Matt's score is 16.
During a football game, a team lost 9 yards on the first play, then gained 3 yards on each of the next 3 plays. Which integer represents the total number of yards at the end of the first four plays? –3 0 9 18
Answer:
0
Step-by-step explanation:
What is 0.17 in standard form?
PLEEEEEEEEASE HELP! How the heck do i figure this out!!!?
Find m
Find the lowest common denominator for the set of fractions: 6/a^2-7a+6 and 3/a^2-36
Answer:
(a-6)(a-1)(a+6)
Final answer:
The lowest common denominator for the fractions [tex]6/(a^2-7a+6)[/tex] and [tex]3/(a^2-36)[/tex] is (a-6)(a-1)(a+6).
Explanation:
To find the lowest common denominator for the fractions [tex]6/(a^2-7a+6)[/tex] and [tex]3/(a^2-36),[/tex] we need to determine the least common multiple of the denominators.
The denominator of the first fraction can be factored as (a-6)(a-1) and the denominator of the second fraction can be factored as (a-6)(a+6).
The common factors are (a-6) and (a-1)(a+6).
Therefore, the lowest common denominator is (a-6)(a-1)(a+6).
The function f(x)=5000(0.98)^0.3x
represents the number of white-blood cells, per cubic millimeter, in a patient x days after beginning treatment for a virus.
What is the average decrease per day in white-blood cells per cubic millimeter between days 1 and 5?
a.) −29.75 mm^3/day
b.)-34.75 mm^3/day
c.)-282.47 mm^3/day
d.-)353.08 mm^3/day
Prove that a triangle cannot have two right angles.
A triangle cannot have two right angles. Suppose a triangle had two right angles.
A triangle cannot have two right angles because the sum of the interior angles in any triangle is equal to two right angles. Having two right angles would necessitate that the third angle also be a right angle, forming a straight line instead of a triangle.
Proof that a Triangle Cannot Have Two Right Angles
The notion that a triangle cannot have two right angles is fundamentally rooted in the geometry axiom stating that the sum of the interior angles in any triangle is equal to two right angles (or 180 degrees). If a triangle were to have two right angles, the third angle would also have to be a right angle to satisfy the sum of 180 degrees. However, if the third angle is a right angle, this contradicts the definition of a triangle being a three-sided polygon with three angles that add up to 180 degrees; with three right angles, the figure would no longer be a triangle, as the three lines AC, CD, and BD would line up to form a straight line, eliminating the closed polygon structure of a triangle.
If we consider the work of notable mathematicians such as Legendre and Dehn, we find substantial evidence supporting the statement that the sum of the interior angles of a triangle cannot be greater than two right angles. Legendre's attempts to prove this led to understanding the consistency of triangle angle sums across all triangles; that is, if one triangle's angles added up to two right angles, it would be the same for all triangles. Furthermore, Dehn's hypothesis indicated that without parallel lines, the sum of the angles of a triangle is greater than two right angles.
Overall, every triangle must have at least two acute angles, and any attempt to form a triangle with two right angles would result in a shape that does not adhere to the fundamental properties of a triangle.