solve this by mathematical induction (2n+7)<(n+3) satisfying answer shall be added in brain list ..and i will follow him/her.
Answers
step 1
find x
variable together constant together
7-3 = 4 = -1n
4 ×-1
-1n ×-1
n= -4
2 × -4 +7 is smaller than -4 +3
-1 = -1
LHS =RHS
★Answer★
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Given→ (2n + 7) < (n + 3)^2
Now,,
Let's,
P(n) = (2n+7) < (n+3)^2
【For n = 1】
So,
L.H.S,
2n+7
= (2 × 1) + 7
=9
R.H.S,
( n + 3 )^3
=( 1 + 3 )^3
=(4)^3
=16
[Note:- the value of 'n' can be anything]
Hence, We Can Say, (2n+7)<(n+3)^3
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◆Another Process Which You Want :-
Let's, P(k) is True.
(2k+7)<(n+3)^2 .......(i)
L.H.S = (2(k+1)+7)
R.H.S = ((k+1)+3)^2
L.H.S
(2(k+1)+7)
=2k+2+7
=(2k+7)+2
[Using (i)]
<(k+3)^2+2
<{k^2 + 2.k.3 + (3)^2}+2
<k^2 + 6k + 9 + 2
<k^2 + 6k + 11
R.H.S
((k+1)+3)^2
=(k+4)^2
=k^2 + 2.k.4 + (4)^2
=k^2 + 8k + 16
Now, Compare Both Sides,
6k < 8k
11 < 16
So We Can Say,
(2n +7) < (n + 3)^2
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#Hope Helped (:
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