Solveeit Logo
Login

Question

Question: Let f(x) \(f:R\to R\)be a function defined as \(f(x)=\left\\{ \begin{aligned} & 5,\text{ if x...

Let f(x) f:RRf:R\to Rbe a function defined as
f(x)=\left\\{ \begin{aligned} & 5,\text{ if x}\le \text{1} \\\ & a+bx\text{ if 1x3} \\\ & b+5x\text{ if 3}\le \text{x5} \\\ & 30\text{ if x}\ge \text{5} \\\ \end{aligned} \right\\}
Then the function is
a) Continuous if a = 5 and b = 5 b) Continuous if a = -5 and b = -10 c) Continuous if a = 0 and b = 5 d) Not continuous for any values of a and b \begin{aligned} & \text{a) Continuous if a = 5 and b = 5} \\\ & \text{b) Continuous if a = -5 and b = -10} \\\ & \text{c) Continuous if a = 0 and b = 5} \\\ & \text{d) Not continuous for any values of a and b} \\\ \end{aligned}

Explanation

Solution

we know that a function f (x) is continuous at a, if limxa\displaystyle \lim_{x \to a} from left is equal to limxa\displaystyle \lim_{x \to a} from right is equal to f (a). Hence we write it as limxa+=limxa=f(a)\displaystyle \lim_{x \to {{a}^{+}}}=\displaystyle \lim_{x \to {{a}^{-}}}=f(a)

Complete step-by-step answer:
Now consider the function f (x) f:RRf:R\to R
f(x)=\left\\{ \begin{aligned} & 5,\text{ if x}\le \text{1} \\\ & a+bx\text{ if 1x3} \\\ & b+5x\text{ if 3}\le \text{x5} \\\ & 30\text{ if x}\ge \text{5} \\\ \end{aligned} \right\\}
We know that the function is continuous if it is continuous on every point.
Let us say it is continuous at x = 1
Now we have f(1)=5f(1)=5 , limx1+f(x)=a+b(1)\displaystyle \lim_{x \to {{1}^{+}}}f(x)=a+b(1) and limx1f(x)=5\displaystyle \lim_{x \to {{1}^{-}}}f(x)=5
Now we know that for a function to be continuous
limxa+=limxa=f(a)\displaystyle \lim_{x \to {{a}^{+}}}=\displaystyle \lim_{x \to {{a}^{-}}}=f(a)
Hence we get a+b=5.................(1)a+b=5.................(1)
Now let us say that the function is also continuous at x = 3
Now we have f(3)=b+5(3)=b+15f(3)=b+5(3)=b+15 , limx3+f(x)=b+3(5)=b+15\displaystyle \lim_{x \to {{3}^{+}}}f(x)=b+3(5)=b+15 and limx3f(x)=a+3b\displaystyle \lim_{x \to {{3}^{-}}}f(x)=a+3b
Now we know that for a function to be continuous
limxa+=limxa=f(a)\displaystyle \lim_{x \to {{a}^{+}}}=\displaystyle \lim_{x \to {{a}^{-}}}=f(a)
Hence we get

& a+3b=b+15 \\\ & a+2b=15.....................(2) \\\ \end{aligned}$$ Now let us say the function is also continuous at x = 5 Now we have $$f(5)=30$$ , $$\displaystyle \lim_{x \to {{5}^{+}}}f(x)=30$$ and $\displaystyle \lim_{x \to {{5}^{-}}}f(x)=b+5(5)=b+25$ Now we know that for a function to be continuous $\displaystyle \lim_{x \to {{a}^{+}}}=\displaystyle \lim_{x \to {{a}^{-}}}=f(a)$ Hence we get $b+25=30..................(3)$ Now consider equation (3) If we take 25 to RHS we get $b=30-25=5$ Hence b = 5. Now let us substitute b = 5 in equation (1) we get $a+5=5$ Hence taking 5 to RHS we get $a=5-5=0$ Hence the value of a = 0 Now we have a = 0 and b = 5. Now we will substitute the values a = 0 and b = 5 in equation (2) We get $0+2(5)=15$this is a contradiction as 5 (2) = 10 and is not equal to 15. Hence no value of a, b, c is true for all three equations. Hence we get the function is not continuous. **So, the correct answer is “Option d”.** **Note:** Since here we have three equations all three must be true at once as the function is said to be continuous if it is continuous at all points. Now once we find the value of a and b substitute it in the equation we have not used to find the values of a and b and check if the equation holds.