Find all values of c such that f is continuous

Edmund Conti

Edmund Conti

Answered question

2021-12-07

Find all values of c such that f is continuous on (,).f(x)={1x2,xc {x,x>c

Answer & Explanation

Robert Harris

Robert Harris

Beginner2021-12-08Added 23 answers

Since 1x2 and x are continuous on (,), the only possible point of discontinuity is at x=c. Right now, both functions ought to be equal in value, so
1x2=x 
x2+x1=0 
Therefore, using quadratic formula, x=±512 
So the given function is continuous for c=±512 
Result: 
c=±512

Eliza Beth13

Eliza Beth13

Skilled2023-05-12Added 130 answers

To find all values of c such that f is continuous on (-∞, ∞) for the function f(x)={1x2xcxx>c, we need to consider the conditions for continuity at the point c.
For f to be continuous at c, the left-hand limit and right-hand limit must exist and be equal to the function value at c.
Let's calculate these limits and analyze the cases:
Case 1: xc
In this case, the function is given by f(x) = 1-x^2.
limxcf(x)=limxc(1x2)=1c2
Case 2: x > c
In this case, the function is given by f(x) = x.
limxc+f(x)=limxc+x=c
For f to be continuous, the left-hand limit (Case 1) must equal the right-hand limit (Case 2) at c.
Therefore, we have the equation:
1c2=c
Now, let's solve this equation to find the values of c:
1c2=c
c2+c1=0
Using the quadratic formula:
c=b±b24ac2a
a=1, b=1, and c=1
c=1±124·1·(1)2·1
c=1±1+42
c=1±52
Hence, the values of c such that f is continuous on (-∞, ∞) are:
c=1+52 and c=152
Don Sumner

Don Sumner

Skilled2023-05-12Added 184 answers

Answer:
1+52,152
Explanation:
To find all values of c such that f is continuous on (,), we need to check the continuity of f at c.
First, let's consider the left limit of f at c:
limxcf(x)=limxc(1x2)=1c2
Next, let's consider the right limit of f at c:
limxc+f(x)=limxc+x=c
For f to be continuous at c, we need these two limits to be equal. Therefore, we must have:
1c2=c
Solving this equation, we get:
c2+c1=0
Using the quadratic formula, we find:
c=1±52
Therefore, the values of c that make f continuous on (,) are:
c=1+52,152
madeleinejames20

madeleinejames20

Skilled2023-05-12Added 165 answers

Step 1:
To find all values of c such that f is continuous on (,), we need to ensure that the two pieces of f(x) match at the point c. This means that the left-hand limit and the right-hand limit of f(x) as x approaches c must be equal.
Let's calculate the left-hand limit and the right-hand limit separately:
Left-hand limit as x approaches c:
limxcf(x)=limxc(1x2)=1c2
Right-hand limit as x approaches c:
limxc+f(x)=limxc+x=c
Step 2:
For f to be continuous at c, the left-hand limit and the right-hand limit must be equal. Therefore, we have the equation:
1c2=c
To solve this equation, we can rearrange it:
c2+c1=0
We can now solve this quadratic equation. Using the quadratic formula, we get:
c=1±124(1)(1)2(1)
Simplifying further:
c=1±1+42
c=1±52
Hence, the values of c for which f is continuous on (,) are:
c=1+52andc=152

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