2
answers
0
watching
12
views
19 Nov 2019
Let f(z) = x + sin-r on the interval [0, 2ì§ Fill in the blanks below 1. The curve y = f(z ) has a y-intercept (is on the y-axis) at y 2. The curve y = f(r) has vertical asymptotes at r 3. f is increasing for r E (2pi,inf) 4. f is decreasing for r E (-inf,pi) 5. The local maxima of f occur at x = none 6. The local minima of occur at none 7. The absolute maximumã occurs at x = none B. The absolute minimum of f occurs at x = none 9. f is concave upward for T E-inf 10. f is concave downward for E inf 11. The points) of inflection of f occurfs) at r- Notes: (a) In parts 3, 4, 9 and 10, your answer should either be a single interval, such as (0,1), a union of (non-overlapping) intervals, such as (-inf, 2) U (3,4), or the word NONE. (b) If, for example, fis increasing on (-inf, 2) and f is increasing on (3,4), then please leave your answer as (-inf,2) U (3,4) even if values of f may be lower in the second interval than in the first interval. (Mathematically the union is incorrect in this situation, but it is all that webwork understands.) (c) In 3 and 4 the individual intervals should be the largest possible such intervals (d) In other parts, your answer should be either a single value, a comma-separated list of values, or the word NONE.
Let f(z) = x + sin-r on the interval [0, 2ì§ Fill in the blanks below 1. The curve y = f(z ) has a y-intercept (is on the y-axis) at y 2. The curve y = f(r) has vertical asymptotes at r 3. f is increasing for r E (2pi,inf) 4. f is decreasing for r E (-inf,pi) 5. The local maxima of f occur at x = none 6. The local minima of occur at none 7. The absolute maximumã occurs at x = none B. The absolute minimum of f occurs at x = none 9. f is concave upward for T E-inf 10. f is concave downward for E inf 11. The points) of inflection of f occurfs) at r- Notes: (a) In parts 3, 4, 9 and 10, your answer should either be a single interval, such as (0,1), a union of (non-overlapping) intervals, such as (-inf, 2) U (3,4), or the word NONE. (b) If, for example, fis increasing on (-inf, 2) and f is increasing on (3,4), then please leave your answer as (-inf,2) U (3,4) even if values of f may be lower in the second interval than in the first interval. (Mathematically the union is incorrect in this situation, but it is all that webwork understands.) (c) In 3 and 4 the individual intervals should be the largest possible such intervals (d) In other parts, your answer should be either a single value, a comma-separated list of values, or the word NONE.
azainraajLv2
12 May 2023
Unlock all answers
Get 1 free homework help answer.
Already have an account? Log in
Deanna HettingerLv2
16 Jul 2019
Get unlimited access
Already have an account? Log in