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induction inequality question (1 Viewer)

sasquatch

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Im not sure if i did this question correctly, could somebody check for me. Thanks.

If u1 = 1 and un = root(2un-1) for n >= 2
a) Show that un < 2 for n >= 1.

Step 1. If n = 1,
u1 = 1
***< 2
therefore true for n = 1.

Step 2. Assuming true for n = k,
uk = root(2uk-1) < 2

Step 3. Hence show true for n = k + 1,
root(2uk) < 2, i.e. LHS - RHS < 0

LHS - RHS = root(2uk) - 2
********< 2 - 2
********< 0
 
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airie

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sasquatch said:
Im not sure if i did this question correctly, could somebody check for me. Thanks.

If u1 = 1 and un = root(2un-1) for n >= 2
a) Show that un < 2 for n >= 1.

Step 1. If n = 1,
u1 = 1
***< 2
therefore true for n = 1.

Step 2. Assuming true for n = k,
uk = root(2uk-1) < 2

Step 3. Hence show true for n = k + 1,
root(2uk) < 2, i.e. LHS - RHS < 0

LHS - RHS = root(2uk) - 2
********< 2 - 2
********< 0
Where did you get root(2uk) < 2 in your last step? You're supposed to show it, not sub it straight into the inequality :)

For the last step, I'd probably do:
From the inductive hypothesis, uk = root(2uk-1) < 2,
And uk+1 = root(2uk)
= root[2*root(uk-1)]
< root[2*2] by inductive hypothesis,
= 2.

Therefore, the condition holds true for k+1 if it holds for k. And by induction...

EDIT: Btw, just wanted to mention that at the last step, uk+1 < root[2*2] could be deduced from the inductive hypothesis as u1 = 1 and un = root(2un-1) for n >= 2 ie. un > 0 for all positive integers n.
 
Last edited:

sasquatch

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airie said:
Where did you get root(2uk) < 2 in your last step? You're supposed to show it, not sub it straight into the inequality :)

Erm now looking back.. i dunno what the hell i did.. my mistake..
 

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