Simplify : `root4(81)-8root3(343)+15 root5(32)+sqrt(225)`

Simplify . (5+sqrt5)(5-sqrt3)

lim_(x rarr oo) (sqrt(x^(2) + 1) - root(3)(x^(3) + 1))/(root(4)(x^(4) + 1) - root(5) (x^(4) + 1)) equals :

Find n, if the ratio of the fifth term from beginning to the fifth term from the end in the expansion of (root(4)(2) + 1/root(4)(3))^n id sqrt6:1 .

The sequence a_(1),a_(2),a_(3),".......," is a geometric sequence with common ratio r . The sequence b_(1),b_(2),b_(3),".......," is also a geometric sequence. If b_(1)=1,b_(2)=root4(7)-root4(28)+1,a_(1)=root4(28)" and "sum_(n=1)^(oo)(1)/(a_(n))=sum_(n=1)^(oo)(b_(n)) , then the value of (1+r^(2)+r^(4)) is

If root3(y)root2(x)=root6((x+y)^(5)) , then (dy)/(dx)

The last term in the binomial expression of (root(3)(2)-(1)/(sqrt(2)))^(n) is ((1)/(3)*(1)/(root(3)(9)))^(log_(3)8) . Then the 5th term from the beginning is

Write the quandratic equation formed by the roots 3 + sqrt(5) and 3- sqrt(5)

The number of irrational terms in the expansion of (root(8)(5)+root(6)(2))^(100) is:

Let alpha (a) beta (a) be the roots of the equations : (root(3)(1+a) -1)x^(2) + (sqrt(1 + a) - 1)x + (root(6)(1 + a) - 1) = 0 , where a gt - 1 . Then lim_(a rarr 0^(+)) alpha (a) and lim_(a rarr 0^(+)) beta(a) are :

If the seventh terms from the beginning and the end in the expansion of (root(3)(2)+(1)/(root(3)(2)))^(n) are equal, then n equals: