• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

how do you do these plz help (1 Viewer)

Masaken

Unknown Member
Joined
May 8, 2021
Messages
1,745
Location
in your walls
Gender
Female
HSC
2023
i might be cooked since it's been a very long time since 4u hsc for me but you can use mathematical induction to solve both. but for the first q the statement just isn't true because for the base case n=1 => 3 + 2 = 5 which is perfectly divisible by 5 with no remainder so you can't prove it. same for n=2 wherein 3^2 + 2^2 = 13, when divided by 5 that's a remainder of 3

second q is mathematical induction if i recall correctly
  • base case: where n = 1 => 5^(1) - 1 = 4 which is divisible by 4
  • assume true for n = k i.e. 5^k - 1 = 4Q (wherein Q is a positive integer)
  • prove true for n = k+1 i.e. 5^(k+1) - 1 = 4T (wherein T is positive integer)
    • basically i don't wanna send the full working out here cos like idk how to format it so it'll look kinda ugly but by index laws break up 5^(k+1) into 5^k * 5^1 and then from the assumption of n = k; rearranging: 5^k = 4Q + 1, sub that into the equation you're trying to prove true and you should be able to prove it true and thus make the conclusion
 

WeiWeiMan

Well-Known Member
Joined
Aug 7, 2023
Messages
1,028
Location
behind you
Gender
Male
HSC
2026
i might be cooked since it's been a very long time since 4u hsc for me but you can use mathematical induction to solve both. but for the first q the statement just isn't true because for the base case n=1 => 3 + 2 = 5 which is perfectly divisible by 5 with no remainder so you can't prove it. same for n=2 wherein 3^2 + 2^2 = 13, when divided by 5 that's a remainder of 3

second q is mathematical induction if i recall correctly
  • base case: where n = 1 => 5^(1) - 1 = 4 which is divisible by 4
  • assume true for n = k i.e. 5^k - 1 = 4Q (wherein Q is a positive integer)
  • prove true for n = k+1 i.e. 5^(k+1) - 1 = 4T (wherein T is positive integer)
    • basically i don't wanna send the full working out here cos like idk how to format it so it'll look kinda ugly but by index laws break up 5^(k+1) into 5^k * 5^1 and then from the assumption of n = k; rearranging: 5^k = 4Q + 1, sub that into the equation you're trying to prove true and you should be able to prove it true and thus make the conclusion
Yeah I’m lowkey cooked I forgot to check numbers

the question should be divisible by 5 for odd integers n, as the -2^n from the binomial only exists (and thus cancels with 2^n) when n is odd, otherwise it’d be +2^n

anyway that should be the easiest way to prove it since yk (-1)^odd = -1
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top