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Using the given vectors how do I find the specified dot product u=3i-8j;v=4i+9j find u.v
Find lengths of a square given opposite vertices. Two opposite vertices of a square are P(3, 2) and Q(-5, -10). Find the length of:
Proof of Vertex, Extreme Point, Basic Feasible Solution.Can you please let me know how to approach those proof questions.
How to prove or counter with example the following statements:(1) If two subspaces are orthogonal, then they are independent.
Vectors in Spherical and Cylindrical.(a) Given A = a*p_hat + b*psi_hat + c*z_hat (cylindrical unit vectors), where a, b, and c are constants. Is A a constant v
Vector Spaces of Complex Valued Polynomials, Complex Inner Products and Orthonormal Sets
Parabolas : Concave Up or Down, Vertex and Intercepts.Given the parabola y = -(x - 6)2 - 1, determine each of the following.
Explain why vectors QR and RQ are not equivalent.Explain in your own words when the elimination method for solving a system
Problems related to Vectos: Force, Motion, currents.A weight of 850 pounds is suspended by two cables
Vector-valued function word problem.A baseball is hit from a height of 3 feet with an initial speed of 120 feet per second
Vectors : Arc length of a space curve.Use the integration capabilities of you graphing utility to approximate the arc length of the space curve
Find the component form of the vector representing the velocity of a boat traveling at 8 knots, or nautical miles per hour, with a bearing of N 53-degrees W.
Find a subset of the vectors that forms a basis for the span of the vectors; then express each vector which is not in basis as a linear combination of the basis
Prove that a tree with Delta(T)=k (Delta means maximum degree) has at least k vertices of degree 1.understand how you count the degree of the vertices
Vectors and Gradients : Direction of Most Rapid Increase; Critical Points
Example of a quadratic model.A copy of the original data (with reference) and brief discussion of why you chose it.
Vector Spaces and Linear Combinations.Let V be the space of all functions from R to R. It was stated in the discussion
Vector Spaces and Scalar Multiplication.Let V be the space of all functions from R to R. It was stated in the discussion session
Vector Cross Product and Arc length.Find the arc length of the curve given
Vector Fields : Divergence and Curl.Calculate the divergence and curl of the vector field F(x,y,z) = 2xi + 3yj +4zk.
Vector Spaces and Projection Mappings.Let V be a vector space of all real continuous function on closed interval [ -1, 1].
Prove that U is a Subspace of V and is Contained in W. What is presented below has many missing parts as the full question could not be copied properly.
Solving: Multidimensional Arrays and Vectors. A certain professor has a file containing a table of student grades
Gradient Vector and Tangentl Line.If g(x,y)= x-y^2, find the gradient vector (3,-1) and use it to find the tangent line to the level curve g(x,y)= 2 at the poi
Divergence and Curl of a Vector Field.Compute the divergence and curl of v.