General term of the given series is given by,
Tn=1−3n2+n4n
⇒Tn=(n4−2n2+1)−n2n
⇒Tn=(n2−1)2−n2n
⇒Tn=(n2−1−n)(n2−1+n)n
⇒Tn=21(n2−1−n)(n2−1+n)(n2−1+n)−(n2−1−n)
⇒Tn=21[(n2−1−n)1−(n2−1+n)1]
⇒n=1∑10Tn=21[(−11−11)+(11−51)+(51−111)+...+(891−1091)]
⇒n=1∑10Tn=21[−1−1091]
⇒n=1∑10Tn=109−55