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Ty f) -1 0 2 The above diagram is a plot of a function f(x) Is f(x) continuous at 0 and why? Choo...
Is the function given by f(x) = continuous at x = 5? Why or why not?...
Is the function given by f(x) = continuous at x = 5? Why or why not? 5x+2, for x 55, 5* 5x - 18, for x>5, Choose the correct answer below. O A. The given function is continuous at x = 5 because the limit is 3. OB. The given function is continuous at x = 5 because lim f(x) does not exist. X-5 OC. The given function is not continuous at x = 5 because f(5) does not exist....
For what value of the constant c is the function f continuous on (-0, co)? cx2...
For what value of the constant c is the function f continuous on (-0, co)? cx2 + 5x if x = 6 f(x) = if x 2 6 x3 - cx Step 1 Note that f is continuous on (-0, 6) and (6, 0). For the function to be continuous on (-0, 0), we need to ensure that as x approaches 6, the left and right limits match. First we find the left limit. lim f(x) = lim (cx2 +...
10. Let f(x)- x+1, when x<0 x21, when x20 Calculate Sro(x) Graph fx) near zero and...
10. Let f(x)- x+1, when x<0 x21, when x20 Calculate Sro(x) Graph fx) near zero and then graph Sce)(x) near zero. So)(x) fx) lim So (x) = x 0 lim So)(x) x0+ limSt (x) x0 Based on the graph of f(x) and a limit calculation, deternmine if f(x) is continuous at x=0. Based on the graph of So)(x) and the limit calculations above, classify what kind of discontinuity point S(o) (x) has at x-0 Does f '(0) exist? If yes,...
Home Prove that lim 74-X =2 ents Gradebog For a function f(x) that is defined in...
Home Prove that lim 74-X =2 ents Gradebog For a function f(x) that is defined in an open interval about c, except possibly at c itself, the limit of f(x) as x approaches c is the number Lif for every number e > 0. there exists a corresponding number 8 >0 such that for all X, 0 < x-cl< implies that f(x) - L1 <e. To prove the given limit statement, it is necessary to show that for all x,...
3. (1,7) (0,0) { 0 f (x, y) = 23r²ty (z,y) = (0,0) (a) (10 pts)...
3. (1,7) (0,0) { 0 f (x, y) = 23r²ty (z,y) = (0,0) (a) (10 pts) Evaluate the limit, or use a two-path test to show that it does not exist: lim f(x,y). (sy)(0,0) Math 250 Final Exam, CSU Northridge (b) (4 pts) Is f(x,y) continuous? Explain why or why not. 4. (17 pts) Use Lagrange multipliers to find the absolute maximum and absolute min- imum of f(x,y) = ry", subject to the constraint 3x² + y = 12. 5/12/20
a. Determine whether the Mean Value Theorem applies to the function f(x) = x + on...
a. Determine whether the Mean Value Theorem applies to the function f(x) = x + on the interval [3,5). b. If so, find or approximate the point(s) that are guaranteed to exist by the Mean Value Theorem. a. Choose the correct answer below. O A. No, because the function is continuous on the interval [3,5), but is not differentiable on the interval (3,5). OB. No, because the function is differentiable on the interval (3,5), but is not continuous on the...
+1 4. Consider the function ISO 0<<1 -1 = 1 0 1<*52 (x - 2)2 =>...
+1 4. Consider the function ISO 0<<1 -1 = 1 0 1<*52 (x - 2)2 => 2 (a) (10) Use the definition of the limit of a function at a point to evaluate with proof (b) (10) Use the definition of continuity at a point to prove that /(x) is not continuous at -1. (e) (2) Is /(x) uniformly continuous on (-1,2)? If it is, prove it. Other- wise, explain why not. (d) (8) Is f() uniformly continuous on (1,3)?...
1. [2] Is the function f :Q\ {0} →Q defined by f(x) = 1 + 2...
1. [2] Is the function f :Q\ {0} →Q defined by f(x) = 1 + 2 onto? Why or why not? 2. [3] Let A = {1, 2, 3, 4, 5,6}, and f: A+ A be the function given in the table below. 2 1 2 3 4 5 6 f(x) 3 5 6 24 1| (a) Explain why f is invertible. (b) Is it true that f-1 = f o f? Why or why not?
0< x <1 Consider the function f(x) defined on (0,2), f(x)- (a) Fourier Sine series: Use symmetry on the half interval 0 < x <2 to explain why b2 = b4 = … = 0. Then derive a general expres...
0< x <1 Consider the function f(x) defined on (0,2), f(x)- (a) Fourier Sine series: Use symmetry on the half interval 0 < x <2 to explain why b2 = b4 = … = 0. Then derive a general expression for the non-zero coefficients in the Sine series (bi, b3, bs, ...) and plot the first term in the sine series on top of a graph of f(x)
Problem 4: Let f: [0, 1] → R be an integrable function that is continuous at...
Problem 4: Let f: [0, 1] → R be an integrable function that is continuous at 0. Prove that lim f(") dx = f(0). n+Jo [ Hint: there are several approaches. It might help to first show that for a fixed 0 <b< 1, we have limn700 Sº f(x) dx = b. f(0). ]
Is the function given by f(x) = continuous at x = 5? Why or why not? 5x+2, for x 55, 5* 5x - 18, for x>5, Choose the correct answer below. O A. The given function is continuous at x = 5 because the limit is 3. OB. The given function is continuous at x = 5 because lim f(x) does not exist. X-5 OC. The given function is not continuous at x = 5 because f(5) does not exist....
For what value of the constant c is the function f continuous on (-0, co)? cx2 + 5x if x = 6 f(x) = if x 2 6 x3 - cx Step 1 Note that f is continuous on (-0, 6) and (6, 0). For the function to be continuous on (-0, 0), we need to ensure that as x approaches 6, the left and right limits match. First we find the left limit. lim f(x) = lim (cx2 +...
10. Let f(x)- x+1, when x<0 x21, when x20 Calculate Sro(x) Graph fx) near zero and then graph Sce)(x) near zero. So)(x) fx) lim So (x) = x 0 lim So)(x) x0+ limSt (x) x0 Based on the graph of f(x) and a limit calculation, deternmine if f(x) is continuous at x=0. Based on the graph of So)(x) and the limit calculations above, classify what kind of discontinuity point S(o) (x) has at x-0 Does f '(0) exist? If yes,...
Home Prove that lim 74-X =2 ents Gradebog For a function f(x) that is defined in an open interval about c, except possibly at c itself, the limit of f(x) as x approaches c is the number Lif for every number e > 0. there exists a corresponding number 8 >0 such that for all X, 0 < x-cl< implies that f(x) - L1 <e. To prove the given limit statement, it is necessary to show that for all x,...
3. (1,7) (0,0) { 0 f (x, y) = 23r²ty (z,y) = (0,0) (a) (10 pts) Evaluate the limit, or use a two-path test to show that it does not exist: lim f(x,y). (sy)(0,0) Math 250 Final Exam, CSU Northridge (b) (4 pts) Is f(x,y) continuous? Explain why or why not. 4. (17 pts) Use Lagrange multipliers to find the absolute maximum and absolute min- imum of f(x,y) = ry", subject to the constraint 3x² + y = 12. 5/12/20
a. Determine whether the Mean Value Theorem applies to the function f(x) = x + on the interval [3,5). b. If so, find or approximate the point(s) that are guaranteed to exist by the Mean Value Theorem. a. Choose the correct answer below. O A. No, because the function is continuous on the interval [3,5), but is not differentiable on the interval (3,5). OB. No, because the function is differentiable on the interval (3,5), but is not continuous on the...
+1 4. Consider the function ISO 0<<1 -1 = 1 0 1<*52 (x - 2)2 => 2 (a) (10) Use the definition of the limit of a function at a point to evaluate with proof (b) (10) Use the definition of continuity at a point to prove that /(x) is not continuous at -1. (e) (2) Is /(x) uniformly continuous on (-1,2)? If it is, prove it. Other- wise, explain why not. (d) (8) Is f() uniformly continuous on (1,3)?...
1. [2] Is the function f :Q\ {0} →Q defined by f(x) = 1 + 2 onto? Why or why not? 2. [3] Let A = {1, 2, 3, 4, 5,6}, and f: A+ A be the function given in the table below. 2 1 2 3 4 5 6 f(x) 3 5 6 24 1| (a) Explain why f is invertible. (b) Is it true that f-1 = f o f? Why or why not?
0< x <1 Consider the function f(x) defined on (0,2), f(x)- (a) Fourier Sine series: Use symmetry on the half interval 0 < x <2 to explain why b2 = b4 = … = 0. Then derive a general expression for the non-zero coefficients in the Sine series (bi, b3, bs, ...) and plot the first term in the sine series on top of a graph of f(x)
Problem 4: Let f: [0, 1] → R be an integrable function that is continuous at 0. Prove that lim f(") dx = f(0). n+Jo [ Hint: there are several approaches. It might help to first show that for a fixed 0 <b< 1, we have limn700 Sº f(x) dx = b. f(0). ]
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