can you explain its method step wise......?????

can you explain its method step wise......?????

what's the procedure...??

how to solve it...????steps....????method...?????

how to find this?????what is the procedure of this questiion??????

is the square root of the absolute value of x uniformly continuous

h(t)={2t+b if t<0 {2cos(t)-3 if 0< or equal to t < or equal to pi/2 {asin(t)+5b if t>pi/2

g(x)= {1/(x-2) if x<1 {2x-4 if x> or equal to 1

g(t)={(2t^2+2t-24)/(t-3) if t is not equal to 3 {b if t=3

g(x)={1/(x+1) if x<1 {2x-1 if x> or equal to 1

f(x)= cx^2 + 2x if x < 3 and x^3 - cx if x ≥ 3

5/x + (-4x+5)/x(x-1) if x≠0,1 Let f(x)= 7 if x=0 What value for f(0) would make f(x) continuous at x=0 Must...

For the given function, ƒ, determine if the function is discontinuous at a given point. State which condition of continuity fails or state the function is continuous at x = a. f(x)...

For the given function, ƒ, determine if the function is discontinuous at a given point. State which condition of continuity fails or state the function is continuous at x = a. f(x)...

For the given function, ƒ, determine if the function is discontinuous at a given point. State which condition of continuity fails or state the function is continuous at x = a. f(x)...

For the given function, ƒ, determine if the function is discontinuous at a given point. State which condition of continuity fails or state the function is continuous at x = a. f(x) = (x^3-9x)/(x^2+11x+24),...

For the given function, ƒ, determine if the function is discontinuous at a given point. State which condition of continuity fails or state the function is continuous at x = a. f(x) = x/lxl, a...

for me it is always continuous because theres the +1 in the denominator, however the back of my book says that the answer is all x except npi/2

A monk leaves the monastery at 7:00 am and takes his usual path to the top of the mountain, arriving at 7:00 pm. the following morning, he starts at 7:00 am at the top and takes the same path back...

The de?finitions of derivative of two functions f and g are given by: f' (x) = lim f(x + Δx) - f (x) / Δx , g'(x) = lim g(x + Δx) - g(x) / Δx ...