Apertures for the diffraction studied in this chapter are __________. A. a single slit.B. a circle.
C. a square.
D. both A and B.
E. both A and C.
Answers
Answer: the correct option is D
Step-by-step explanation:
Note: the chapter summary can be found in chapter 22 of the Pearson Education,Inc. (PDF format).
In the chapter, a single slit aperture diffraction and a circle aperture diffraction was discussed.
A circle aperture diffraction occurs when light pass through a tiny hole or aperture to produce a circular disc image. This disc is called Airy's disc.
To calculate the aperture diameter,d we can use the formula below;
d= m× λ/ sin θ. ------------------------------------------------------------------------------(1).
The single slit aperture diffraction is when light pass through a single slit to produce. The wavelength, λ is greater than the width of the aperture.
Related Questions
Tasha is planning an expansion of a square flower garden in a city park. If each side of the original garden is increased by 7 m, the new total area of the garden will be 169 m2. Find the length of each side of the original garden.
Which equation would best help solve the following problem?Maria releases a javelin 1.5 meters above the ground with an initial vertical velocity of 22 meters per second. How long will it take the javelin to hit the ground? –4.9t^2 + 22t + 1.5 = 0 –4.9t^2 + 22t = 1.5 –4.9t^2 + 1.5t + 22 = 0 –16t^2+ 22t + 1.5 = 0
Write the first three terms of an arithmetic sequence if the fourth term is 10 and D = -6?
The sum of a number and twice is square is 36.find the numbers?
Answers
area=121=legnth^2
121=l^2
sqare root both sides
11=legnth
11 yards=legnth
3.69=3.00+0.60+0.09 so the answer i s C
Answers
Answer:
Here's what I get
Step-by-step explanation:
Part A
The graph shows a polynomial of odd degree. It is probably a third-degree polynomial — a cubic equation.
Part B
The standard form of a cubic equation is
y = ax³ + bx² + cx + d
The factored form of a cubic equation is
y = a(x - b₁)(x² + b₂x + b₃)
If you can factor the quadratic, the factored form becomes
y = a(x - c₁)(x - c₂)(x - c₃)
Part C
The zeros of the function are at x = -25, x = - 15, and x = 15.
Part D
The linear factors of the function are x + 25, x + 15, and x - 15.
Part E
y = a(x + 25)(x + 15)(x - 15) = a(x + 25)(x² - 225)
y = a(x³ + 25x² - 225x - 5625)
Part F
When x = 0, y = 1.
1 = a[0³ +25(0)² - 225(0) - 5625] = a(0 + 0 - 0 -5625) = -5625a
a = -1/5625
Part G
Answer
Actually, the answer should be -0.0007(x+20)(x+5)(x-15)
Step-by-step explanation:
This is continuing off of the previous answer
PART C
The zeros should be (15,0), (-5,0), and (-20,0)
PART D
x - 15, x + 5, and x + 20
PART E
a(x - 15)(x + 5)(x + 20)
Standard:
PART F
The y-intercept is at (0,1), so we replace the x's with 0:
1 = and this gives us (0+0-0-1500) which also equals -1500
Then we do which gives us -0.0006 repeating which rounds to -0.0007
a= -0.0007
PART G
Just place the numbers where they should go and your answer is
y =-0.0007(x + 20)(x + 5)(x - 15)
the placement for (x + 20) (x + 5) and (x - 15) doesn't matter as long as they are behind -0.0007
A trinomial has a degree of 2
A constant has a degree of 1
A cubic monomial has a degree of 3
I will mark as the top answers of you help me!
Answers
Answer:
The degree of a binomial is zero. The product of two binomials is not a polynomial. The sum of two polynomials is a polynomial. A monomial containing ^2 has a degree of three
The degree of the polynomial is found by looking at the term with the highest exponent on its variable(s). Examples: 5x2-2x+1 The highest exponent is the 2 so this is a 2nd degree trinomial.
Names of Degrees
Degree Name Example
0 Constant 7
1 Linear x+3
2 Quadratic x2−x+2
3 Cubic x3−x2+5
The degree of a cubic monomial is three. A quadratic polynomial is a trinomial. The degree of a binomial is two.
Step-by-step explanation:
p = 11
p = 10
p = 12
p = 13
Answers
Answer:
(c) p = 12
Step-by-step explanation:
You may recall that (5, 12, 13) is a Pythagorean triple. That would tell you ...
p = 12
__
If you have not memorized a few useful Pythagorean triples, you can use the Pythagorean theorem to solve for p. The sum of squares of the sides is the square of the hypotenuse:
5² +p² = (p+1)²
p² +25 = p² +2p +1
24 = 2p . . . . . . . . subtract p²+1 from both sides
p = 12 . . . . . . divide by 2
_____
Additional comment
Some of the Pythagorean triples commonly seen in algebra and geometry problems are ...
(3, 4, 5), (5, 12, 13), (7, 24, 25), (8, 15, 17), (9, 40, 41)
Of course, multiples of these are used, too. For example, (6, 8. 10) is a multiple of the (3, 4, 5) triple.
Answer:
12
Step-by-step explanation:
5^2 + p^2 = (p+1)^2
25 + p^2 = p^2 + 2p + 1
25 = 2p + 1
24 = 2p
12 = p
Answers
Answers
Answer: 96
Step-by-step explanation:
12 x 8 = 96
4 - 4 = 0
96 + 0
= 96