in an ap , if a4 = 4n - 1 then S2 =
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Then
Thenth
Thenthterm of an A.P, whose first terms is aand common difference isd
Thenthterm of an A.P, whose first terms is aand common difference isd, is T
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)d
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as T
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+nd
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the given
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givenn
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennth
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we get
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getT
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=(a−
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=(a−d)+
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=(a−d)+nd=
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=(a−d)+nd=4n+
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=(a−d)+nd=4n+1
Thenthterm of an A.P, whose first terms is aand common difference isd, is Tn=a+(n−1)dWhich can also be written as Tn=(a−d)+ndOn comparing this with the givennthterm, we getTn=(a−d)+nd=4n+1From this, we get
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