Consider a variation of Newton's method in which only one derivative is needed, that is,
Find and
such that
, where
, and
is the exact zero
of
.
Consider a variation of Newton's method in which only one derivative is needed, that is, Find...
The figure below shows a graph of the derivative
of a function
. Use this graph to answer parts (a) and (b)
(a) On what intervals is
increasing or decreasing?
(b) For what values of
does
have a local maximum or minimum? (It asks to be specific).
Only the
values are needed (not ordered pairs).
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In solving the nonlinear BVP using Newton's Method, we need to discretize the residual and the Jacobian . a) What is the discretized residual where i and j run from 1, ..., N-1 and where the BCs are incorporated into ? Be sure to specify . b) What is the discretized Jacobian ? Hint: Your answer will involve both and the Kronecker . F_i = SUM_j (D2)_ij y_j + ... + (0,...0,?) J_ij = (D2)_ij + ... ? We were...
Consider
,,,.
If
increases from $4 to $9, what is the compensating variation? Enter
a number only, round to two decimals. If money needs to be taken
away from the consumer include a negative sign.
Now consider what is the equivalent variation? Enter a number
only, round to two decimals. If money needs to be taken away from
the consumer include a negative sign.
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Consider,,,.
If
increases from $4 to $8, what is the compensating variation? Enter
a number only, round to two decimals. If money needs to be taken
away from the consumer include a negative sign.
Now consider what is the equivalent variation? Enter a number
only, round to two decimals. If money needs to be taken away from
the consumer include a negative sign.
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Consider a particle described by the wave function
Calculate the time derivative
in where
is the probability density, and shows that the continuity equation
is valid, where the probability current
Use the Schrodinger equation.
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Consider
,,,.
If
decreases from $25 to $9, what is the compensating variation?
Enter a number only, round to two decimals. If money needs to be
taken away from the consumer include a negative sign.
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Newton's Method with two variables
This problem focuses on the system of simultaneous equations
Choose any initial point
anywhere near either solution
of the system of equations
For this problem you need to only complete at least one
iteration starting with numerical values for
terminating with numerical values for
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consider the variation of constants formula where P(t)= a) show that solves the initial value problem x'+p(t)=(t) x()= when p and q are continuous functions of t on an interval I and tg p(s)ds We were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this imageWe were unable to transcribe this image tg p(s)ds
A scalar function f :
which is never zero has the properties
and
Evaluate the integral
where
is the surface of the unit sphere
and
means the directional derivative of f in the direction of the
outward pointing unit normal on
.
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Let
a. Find at
(2,1)
b. Find the directional derivative of f at (2,1) in the
direction of -i+3j
f(:,y) = xy - 1 We were unable to transcribe this image