Maths Binomial Theorem

The general term is T? = ¹? C? (K/x²)? (√x)¹?
= ¹? C? K? x? ²? x? /² = ¹? C? K? x? /²
For the constant term, the power of x is 0.
5 - 5r/2 = 0 ⇒ r = 2
The term is T? = ¹? C? · K² = 405
45 · K² = 405
⇒ K² = 9 ⇒ |K| = 3

N+5C_ {R-1}: N+5C_R: N+5C_ {R+1}
= 5:10:4
2 (N+5C_ {R-1}) = N+5C_R ⇒ 3R = N + 6
7 (N+5C_R) = 5 (N+5C_ {R+1}) ⇒ 12R = 18 + 5N
Solving: N = 6, R = 4
∴ the largest coefficient is N+5C_ {R+1} = 11C_5 = 462

Given (2x² + 3x + 4)¹? = Σ (r=0 to 20) a? x?
replace x by 2/x in above identity :-
2¹? (2x²+3x+4)¹? / x²? = Σ (r=0 to 20) a?2? /x?
⇒ 2¹? Σ (r=0 to 20) a? x? = Σ (r=0 to 20) a?2? x²? (from (i)
now, comparing coefficient of x? from both sides
(take r = 7 in L.H.S. and r = 13 in R.H.S.)
2¹? a? = a?2¹³ ⇒ a? /a? = 2³ = 8

Σ (r=30 to 50) 50-rC? =? C? +? C? +? C? + . + ³? C?
=? C? +? C? +? C? + . + (³? C? + ³? C? ) - ³? C?
=? C? +? C? +? C? + . + (³¹C? + ³¹C? ) - ³? C?
=? C? +? C? - ³? C?
=? ¹C? - ³? C?

T? =? C? (3x²/2)? (-1/3x)?
=? C? (3/2)? (-1/3)? x¹? ³? for the term independent of x put r = 6
=> T? =? C? (3/2)³ (-1/3)?
=? C? (1/6)³ = (9x8x7)/ (3x2x1) (1/6)³ = 7/18

T_r+1 =? C_r (3)^ (n-r)/2) (5)^ (r/8) (n ≥ r)
Clearly r should be a multiple of 8.
∴ there are exactly 33 integral terms
Possible values of r can be
0,8,16, . . .,32 * 8
∴ least value of n = 256