Deck 1: Limits and Continuity

Find .

Answer true or false. The value of k that makes f continuous for is 7

Find .

Find the limit.

Find the limit.

Find .

Find .

Find the limit

Answer true or false. The Squeeze Theorem can be used to show utilizing and .

Answer true or false. The value of k that makes f continuous for is 2

Answer true or false. The Intermediate-Value Theorem can be used to show that the equation x⁵ = cos x has at least one solution on the interval [-5 $\pi$ /6, 5 $\pi$ /6].

Find the limit.

Find the limit.

Find the limit.

Find the limit

Find all points of discontinuity, if any, for

Find the limit.

Answer true or false. The fact that and that guarantees that by the Squeeze Theorem.

Find the limit

Find .

Find a value for the constant k so that will be continuous at t = 0.

Find .

Find .

Find .

Find .

Find a value for the constant k so that will be continuous at t = 0.

Find .

Find .

Find a value for the constant k so that will be continuous at t = 0.

Find .

Find .

Find a value for the constant k so that will be continuous at $\theta$ = 0.

Find .

Find .

Find .

Find .

Find a value for the constant k so that will be continuous at t = 0.

Find a value for the constant k so that will be continuous at $\theta$ = 0.

Answer true or false. The Intermediate-Value Theorem can be used to approximate the locations of all discontinuities for .

Show that is not a continuous function.

Answer true or false. The function is continuous everywhere.

Answer true or false. The function has a removable discontinuity at x = 5.

Answer true or false. f(x) = x⁴ - 2x² + 11 = 0 has at least one solution on the interval [0, 9].

Answer true or false. f(x) = x² - 6x + 5 = 0 has at least one solution on the interval [0, 2].

Answer true or false. f(x) = tan (x⁴ - 1) has no point of discontinuity.

Find any points of discontinuity for .

Define so that it will be continuous everywhere.

Answer true or false. f(x) = x⁵ - 5x⁴ + 9 has no point of discontinuity.

Redefine so that it will be continuous everywhere.

Answer true or false. f(x) = |x² - 4| has points of discontinuity at x = -2 and x = 2.

Answer true or false. If f and g are each continuous at c, may be discontinuous at c.

Find any points of discontinuity for .

Assign a value to the constant k which will make g continuous.

Find the values of x (if any) at which f is not continuous. f(x) = (x + 8)⁷.

Determine the interval for which is a continuous function.

Show that is not continuous at x = -6 but is continuous from the right at x = -6.

Determine if the discontinuity at x = 0 in the function is removable.

Given , determine if h is continuous from the right at 0.

Determine if the discontinuity at x = 9 in the function is removable.

Prove that is continuous on [0,+ $\infty$ ).

Find the point of discontinuity in and state whether it is removable.

Determine if the discontinuity at x = 2 in the function is removable.

Show that cannot be made continuous for any assigned value of the constant k.

Given , determine if h is continuous at -6.

Find the discontinuities in and state whether each is removable or nonremovable.

Given , determine if g is continuous at x = .

Assign a value to the constant k which will make f continuous.

Show that the equation f(x) = x² + 3x - 4 has at least one solution in the interval [-5,0].

Given , determine if h is continuous at 0.

Show that the equation f(x) = x³ + 8x + 3 has at least one solution in the interval [-2,2].

Assign a value to the constant k which will make g continuous.

Given , is g continuous at x = 10.