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Tryingtodowell

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Can I conclude that a negative answer is >= 0. I know that obviously you cannot for > only but since there is 'EQUAL TO' can I assume that?
 

liamkk112

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Can I conclude that a negative answer is >= 0. I know that obviously you cannot for > only but since there is 'EQUAL TO' can I assume that?
negative number, by defintion, is < 0. similarly, positive number is > 0, non-negative is >= 0, non-positive is <= 0 . so i dont think u can conclude that a negative answer is >= 0, i think u might mean that can i say that a non-positive number is >= 0, similarly no, unless if the number is exactly zero.
 

Tryingtodowell

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negative number, by defintion, is < 0. similarly, positive number is > 0, non-negative is >= 0, non-positive is <= 0 . so i dont think u can conclude that a negative answer is >= 0, i think u might mean that can i say that a non-positive number is >= 0, similarly no, unless if the number is exactly zero.
Can I conclude that -4k >=0 - for example
 

Tryingtodowell

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Im struggling with this question:

Prove by MI that 2^2^n >= 5^2n for all integers n>=5

I did:

For n=5,

LHS=42967296
RHS=9765626

Therefore LHS>=RHS
Thus true

Assume true for n=k,

2^2^k >= 5^2k

RTP; n=k+1

2^2^k+1 >= 5^2k+2

LHS= 2^2^k . 2^2

>= 4(5^2k) - from assumption

RHS- LHS= 4(5^2k) - 25(5^2k)

>= -21(5^2k) = RHS

Therefore by P of MI.....

I feel like this is completely wrong and I dont know how to approach it
 

Tryingtodowell

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only if k <= 0. obviously if k >0, then any number u plug in for k will mean that -4k will be negative, so the result will be < 0
Everytime I do that question above I end up getting a negative answer for a >= 0. I think im doing the question completely wrong
 

liamkk112

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Im struggling with this question:

Prove by MI that 2^2^n >= 5^2n for all integers n>=5

I did:

For n=5,

LHS=42967296
RHS=9765626

Therefore LHS>=RHS
Thus true

Assume true for n=k,

2^2^k >= 5^2k

RTP; n=k+1

2^2^k+1 >= 5^2k+2

LHS= 2^2^k . 2^2

>= 4(5^2k) - from assumption

RHS- LHS= 4(5^2k) - 25(5^2k)

>= -21(5^2k) = RHS

Therefore by P of MI.....

I feel like this is completely wrong and I dont know how to approach it
starting from LHS = : for proving the result is true for n = k + 1:

we get that LHS =
then we can apply the assumption:
=> LHS

hence LHS >= RHS as required and hence by mathematical induction...
 

liamkk112

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Everytime I do that question above I end up getting a negative answer for a >= 0. I think im doing the question completely wrong
yes, the inequality that -4k >= 0 only holds true for negative numbers, so if a >= 0 the inequality is false
 

Tryingtodowell

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starting from LHS = : for proving the result is true for n = k + 1:

we get that LHS =
then we can apply the assumption:
=> LHS

hence LHS >= RHS as required and hence by mathematical induction...
THANK U SO MUCHH and btw how would you prove by MI that the sum of exterior angles of an n sided convex polygon is 360 like what do I say for n=k and n=k+1
 

liamkk112

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THANK U SO MUCHH and btw how would you prove by MI that the sum of exterior angles of an n sided convex polygon is 360 like what do I say for n=k and n=k+1
u should draw the k sided polygon (you can draw one of any size greater or equal to the base case) which we assume to have a sum of exterior angles of 360 degrees, then draw the (k+1)th side onto this k sided polygon to make the k+1 polygon, then think about what changes when you added the (k+1)th side
 

Tryingtodowell

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u should draw the k sided polygon (you can draw one of any size greater or equal to the base case) which we assume to have a sum of exterior angles of 360 degrees, then draw the (k+1)th side onto this k sided polygon to make the k+1 polygon, then think about what changes when you added the (k+1)th side
ughh I hate this imao how important is this topic in 3u and 4u? Like does it appear much in exams etc
 

liamkk112

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ughh I hate this imao how important is this topic in 3u and 4u? Like does it appear much in exams etc
geometric induction is annoying af lol. usually you wouldnt get a question like this as it is basically a textbook example of a geometric induction question, you would more get different applications, check out question 12d of this paper:
 

Tryingtodowell

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geometric induction is annoying af lol. usually you wouldnt get a question like this as it is basically a textbook example of a geometric induction question, you would more get different applications, check out question 12d of this paper:
Talking about mathematical induction in general does it appear much? Fingers crossed it doesnt 😭
 

liamkk112

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Talking about mathematical induction in general does it appear much? Fingers crossed it doesnt 😭
yea theres always at least 1 3u question, and usually 1 in 4u too. though, they are usually in the earlier questions (11-14) from memory so they are not too difficult, and most of them are quite straightforward once u get the hang of it
 

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geometric induction is annoying af lol. usually you wouldnt get a question like this as it is basically a textbook example of a geometric induction question, you would more get different applications, check out question 12d of this paper:
12d is a very nice question i must say

Talking about mathematical induction in general does it appear much? Fingers crossed it doesnt 😭
in 3u it's not rly applying to anything so you're rly just proving some series sum or divisibility
for 3u induction is free marks
idk about 4u i haven't done that yet
 

liamkk112

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12d is a very nice question i must say


in 3u it's not rly applying to anything so you're rly just proving some series sum or divisibility
for 3u induction is free marks
idk about 4u i haven't done that yet
yea true about 3u induction coz its only sums and divisibility, however they can get u with some sneaky sums where u can miss a term if you dont think carefully but in general it is free marks. just be really good at structuring ur answer, my teacher is a hsc marker and she said if u dont write out everything very clearly, u can easily lose 1 mark just for the structure
 

Tryingtodowell

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12d is a very nice question i must say


in 3u it's not rly applying to anything so you're rly just proving some series sum or divisibility
for 3u induction is free marks
idk about 4u i haven't done that yet
yeah those are ez
 

Tryingtodowell

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yea true about 3u induction coz its only sums and divisibility, however they can get u with some sneaky sums where u can miss a term if you dont think carefully but in general it is free marks. just be really good at structuring ur answer, my teacher is a hsc marker and she said if u dont write out everything very clearly, u can easily lose 1 mark just for the structure
inequality and geometric induction is such a bother for me ughh is that part of 3u? heard its in yr 12 and Im only starting yr 11 this year so idk
 

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