Find the volume of the parallelepiped with adjacent edges
PQ, PR, PS.
P(3, 0, 2), Q(−1, 2,
7), R(4, 2, −1), S(0,
5, 3)
Cubic units
If a = (2, −1, 5)
and b = (4, 2, 1),
find the following.
a × b =
b × a=
If
a = i − 5k and b = j + k, find a × b
given a percentile rank ((PR) of a score. find the value of
score: a) P=72 FOR I SCORES B) P=45 FOR I SCORES. C)P=58 FOR I
SCORES D)P=91 FOR IQ SCORES E) P=44 FOR IQ SCORES F) P=17 FOR IQ
SCORES G) P=33 FOR IQ H) P=75 FOR GRE SCORES I) P=87 FOR STENS
SCORES J) P=37 FOR STENS SCORES
MEANS( X)AND STANDARD DEVIATION (SD)FOR
T -SCALE: (X): (X)= 50; SD=10 IQ- SCALE: (X)= 100; SD= 15
GRE-SCALE: (X)= 500;...
If the pth term of an arithmetic progression is \( \frac{1}{q} \) and the qth term is \( \frac{1}{p} \) , prove that the sum of the first pq terms must be \( \frac{1}{2}(pq+1) \).
Demand function : QD(P) = 56 -
1/2P
Supply Function : Ps(Q)= 6Q
(1) Compute the market price and quantity in
equilibrium.
(2) Compute the consumer and producer surplus in
equilibrium.
In March 2020 an increase occurred, while the supply
function did not change, the new reservation price for the demand
function was found to be $200, while the slope of the demand
function did not change.
(3) Compute the new market price and quantity in equilibrium as
of March...
Question 1: Given a graph with length l(e) on edges, find a
minimum length paths from a vertex s to V −s so that among all
shortest lengths paths from s to V −s we find the ones with minimum
number of edges.
Use Dijkstra's algorithm