1)
Fro given n, l can take all values from 0 to n-1
Here l = 1
So, n must be greater than or equal to 2
Answer: n > 1
2)
For given l, ml can take all values from -l to +l
So, for ml=3, l can be 3 or greater
Answer: l >=3
< Question 3 of 25 > If = 1, what can be deduced about n? If me = 3, what can be said about t? On21 On=1 On&g...
QUESTION 1 Find the laplace transform of. g(t) 72,0st<2 17, 2 st = 7 -25 e C(s)--+*+5)=254 C(s) = -le-25+e-25 o CG)- - e-23 oc(s)=-63 +4+)25+?p=28 -25
Find the laplace transform of: (p², Ost<2 g(t) = 17,2st -25 O e C(5)=-63 ++)+25+ G(s)-()e2+{e-25 G(s) = -43 + + 3) =25 G(s) =- + )e-2s+že-2 +
Can you please show me the how to draw the mechanism and any work needed for this? < Question 5 of 23 > Predict the major and minor products of the reaction. Name the products using systematic names. н* CH, CH, CH=CH2 + H,0 - major product: minor product
5. Partitions For each n e Z, let T={(x, y) + R n<I- g < n+1}. Is T = {T, n € Z} a partition of R?? Justify your answer using the definition.
Suppose lines n and O are parallel. True or false? One can conclude in Euclidean Geometry that <9 is congruent to <7. L m t 1 45 n 23 6 7 8 912 0 14 15 13 10 11
The Laplace transform of the plecewise continuous function f(t) = S4, 0<t<3 12, t> 3 Is given by [{f} = { (3 – e-"), o>0. None of them 1 [{f} = (1 – 2e-4), 8>0. 0 [11] = (1 – 3e-4), 0> 0. ° L{f} = { (2–e=4), o>0.
< Question 41 of 41 > Name each compound. CH2CH3 kolo CH2CH2CH3 about us terms Careers Privacy policy
Find the Laplace transform of the function: 1<2 f(t) = = { 0,5 -44 +7, 122 -25 L(S) = =e ( - ) 29-06- 3 S 3 (s) = 22 + 20) -- G+ :) + 3 (s) = e-25 + S
5. Find the Fourier Transform of g(t) = {o. (1-x?, x<1, 1</z/.
Suppose that <A is congruent to <E and BC - DC What can you say about angles <ABF and <EDF? E F B D They are congruent They are supplementary There is not enough information to determine if they are congruent of supplementary.