If `f(x)={{:(1", "xle3),(ax+b", "3ltxlt5),(7", "5lex):}` is continuous, prove that a = 3 and b = -8.

f(x)={{:(x^(2)", "xle2),(8-2x", "2ltxlt4),(4", "xge4):}

Find the relationship between a and b so that the function f defined by f(x)={{:(ax+1-2," if "x le 3),(bx+3," if "x gt 3):} is continuous at x=3.

Prove that the function f(x)= 5x-3 is continuous at x=0, at x= -3" and at " x=5 .

If f(x)={{:(kx^(2),"for",xle2),(5,"for", x gt2):} is continuous at x=2 then the value of k is …………..

Prove that f(x)=2x^2+3x-5 is continuous at all points in R.

If f(x) = {(x - 5, if xle1), (4x^(2) - 9, if (1ltxlt2) , (3x +4, if xge2) :} then the right hand derivative of f(x) at x = 2 is:

Prove that f(x)=2x^(2)+3x-5 is continuous at all points in RR .

Consider two function y=f(x) and y=g(x) defined as f(x)={{:(ax^(2)+b,,0lexle1),(bx+2b,,1ltxle3),((a-1)x+2c-3,,3ltxle4):} and" "g(x)={{:(cx+d,,0lexle2),(ax+3-c,,2ltxlt3),(x^(2)+b+1,,3gexle4):} Let f be differentiable at x = 1 and g(x) be continuous at x = 3. If the roots of the quadratic equation x^(2)+(a+b+c)alphax+49(k+kalpha)=0 are real distinct for all values of alpha then possible values of k will be

g={(1,1),(2,3),(3,5) , ( 4,7)} is a function such that g(x) = ax +b then a+ b