Let f : R -> R and f(x) = x^3 +ax^2 + bx...

Let `f : R -> R` and `f(x) = x^3 +ax^2 + bx -8`. If `f(x) = 0` has three real roots & f(x) is a bijective, then `(a+b)` is equal to

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If f:R to R where f(x)= ax +cosx , if f is bijective, then

Let a in R and f : R rarr R be given by f(x)=x^(5)-5x+a , then (a) f(x)=0 has three real roots if a gt 4 (b) f(x)=0 has only one real root if a gt 4 (c) f(x)=0 has three real roots if a lt -4 (d) f(x)=0 has three real roots if -4 lt a lt 4

Let a in R and f : R rarr R be given by f(x)=x^(5)-5x+a , then (a) f(x)=0 has three real roots if a gt 4 (b) f(x)=0 has only one real root if a gt 4 (c) f(x)=0 has three real roots if a lt -4 (d) f(x)=0 has three real roots if -4 lt a lt 4

Let a in R and f : R rarr R be given by f(x)=x^(5)-5x+a , then (a) f(x)=0 has three real roots if a gt 4 (b) f(x)=0 has only one real root if a gt 4 (c) f(x)=0 has three real roots if a lt -4 (d) f(x)=0 has three real roots if -4 lt a lt 4

Let a in R and f : R rarr R be given by f(x)=x^(5)-5x+a , then (a) f(x)=0 has three real roots if a gt 4 (b) f(x)=0 has only one real root if a gt 4 (c) f(x)=0 has three real roots if a lt -4 (d) f(x)=0 has three real roots if -4 lt a lt 4

Let a in R and f : R rarr R be given by f(x)=x^(5)-5x+a , then (a) f(x)=0 has three real roots if a gt 4 (b) f(x)=0 has only one real root if a gt 4 (c) f(x)=0 has three real roots if a lt -4 (d) f(x)=0 has three real roots if -4 lt a lt 4

Let f(x)=x^(2)-2x-1AA x in R , Let f,(-oo,a] to [b,oo) , where 'a' is the largest real number for which f(x) is bijective. The value of (a+b) is equal to

Let a in R and let f: Rvec be given by f(x)=x^5-5x+a , then (a) f(x) has three real roots if a >4 (b) f(x) has only one real roots if a >4 (c) f(x) has three real roots if a<-4 (d) f(x) has three real roots if -4

Let a in R and let f: Rvec be given by f(x)=x^5-5x+a , then (a) f(x) has three real roots if a >4 (b) f(x) has only one real roots if a >4 (c) f(x) has three real roots if a<-4 (d) f(x) has three real roots if -4

Late a in R and let f:R rarr be given by f(x)=x^(5)-5x+a, then f(x) has three real roots if a>4f(x) has only one real roots if a>4f(x) has three real roots if a<-4f(x) has three real roots if -4

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