28.a. AND AND NOT OR NOT AND NOT OR NOT
Q: Consider a rectangular surface of length L and width W in the xy plane with its center at the…
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A: I think, answer D is right, from your perspective. That is, statement 1 and statement 3 are…
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A: Angle between the two vectors is given by the formula
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Q: NAME PERIOD DATE NEWTON'S SECOND LAW LOGIC PUZZLE Jed, Michael, Mehal, Sylvia, and Kinjal attend MR.…
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Q: Find the general solution to the differential equation y" = 2– sin 2r.
A: y'''=2-sin2x
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A: To calculate the resultant force of the two forces. Given:Force 1: F1=8 NDirection of Force 1:…
Q: sin dz. (b) sin° z dz. (z - T/6) Given C is the circle |z| = 1. Find the value of (a) z- 7/6
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Q: If A = 4i − 3k and B = −2i + 2j − k, find the scalar projection of A on B, the scalar projection of…
A: The given vectors are, A=4i-3kB=-2i+2j-k
Q: Can you also solve for D and E?
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Q: The component form of vector is 7 = (4, 3). v Find 47. 40 =
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Q: What is the slope a line that has two points with the coordinates (3,4) and (5,6
A: Let the coordinates having point be written as:- X1=3 -----(1) [Given] Y1=4 -----(2) [Given] X2=5…
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- a certain corner of a room is selected as the origin of a retangualr coordinate system. A fly is crawling on an adjacent wall at a point having coordinates (3.7, 1.3), where the units are meters. express the location of the fly in polar coordinatesSuppose that you have two vectors (1,0,0, 1) (2,0,0, 2) What is a"bµ?Find the distance from the point (-7,2,8) to the yz-plane
- Let vectors A⃗=(2,−4) A → = ( 2 , − 4 ) and B⃗=(−3,1) B → = ( − 3 , 1 ) . Calculate the following: What is the angle θAB θ A B between A⃗ A → and B⃗ B → ?The answer is 1.9 Please show me how to obtain it.Imagine a 3-dimensional world with coordinates that are labeled with x, y, and z, as if you are in a large room with walls, a high ceiling and a floor. The edges are x, y and z with z up toward the ceiling, the flat plane floor is x-y. Starting at the origin, go along "x" 2 meters. Then go parallel to "y" 4 meters. Then go up parallel to "z" 3 meters. This point is somewhere in the room above the floor. What is the vector from the origin to the point? What is the magnitude of that vector? That is, what is its length? What angle does it make to the floor? This would be 90°-θ where θ is the angle down from the z azis. (Hint: Use the arctangent knowing z and the length of the vector.) If you dropped from that point directly down to the floor, how far would you fall? How long would it take, given that falling objects accelerate at 10 m/s every second (10 m/s2)?
- From the provided information, show that all of the mentioned hyperboals asmptotically approach the line x = ct for large values of any one of the four mentioned coordinates.Answer the ff and show complete solution:(b) Write a necessary condition for a transformation (q,p) to (Q,P) to be connonical. Prove that P-2(1+√qcosp)√q sinp:Q-log(1+√qcosp)
- A person is walking north on a sidewalk at about 3.30 mph. At the same time the wind is blowing from the north (toward the south) at about 2.40 mph. What relative wind speed will the person sense? O 3.30 mph; the greater of the two speeds O 0.90 mph; the difference in the two speeds O 2.40 mph; the lesser of the two speeds O 5.70 mph; the sum of the wind speed and the walking speed Need Help? Read ItShow that the directions of the isoline and the gradient line at any given points in a scalar field are orthogonal to each other.(3) The natural independent variables for U are (S, V), from dU = TdS – pdV. U = U(S,V) (), instead. Show that U = U (V,T) leads to a much more complicated expression for p, namely gives simple expressions for T and p as T = and ().: Suppose you use (V,T) p = - V dT + f(V), %D T where f (V) is an unknown function of V.