Let x and y be real numbers. Then prove that sqrt(x^2) = abs(x) and abs(xy) =...

Is [abs(x-y)]^2=d(x,y) a metric on the real numbers?

Is [abs(x-y)]^2=d(x,y) a metric on the real numbers?

Prove the following: For any positive real numbers x and y, x+y ≥ √(xy)

Prove the following: For any positive real numbers x and y, x+y ≥ √(xy)

1. Let x be a real number, and x > 1. Prove 1 < sqrt(x) and...

1. Let x be a real number, and x > 1. Prove 1 < sqrt(x) and sqrt(x) < x. 2. If x is an integer divisible by 4, and y is an integer that is not, prove x + y is not divisible by 4.

Use axioms to prove the theorem: if x and y are non-zero real numbers, then xy...

Use axioms to prove the theorem: if x and y are non-zero real numbers, then xy does not equal 0

Let f(x, y) = sqrt( x^2 − y − 4) ln(xy). • Plot the domain of...

Let f(x, y) = sqrt( x^2 − y − 4) ln(xy). • Plot the domain of f(x, y) on the xy-plane. • Find the equation for the tangent plane to the surface at the point (4, 1/4 , 0). Give full explanation of your work

1) Prove that for all real numbers x and y, if x < y, then x...

1) Prove that for all real numbers x and y, if x < y, then x < (x+y)/2 < y 2) Let a, b ∈ R. Prove that: a) (Triangle inequality) |a + b| ≤ |a| + |b| (HINT: Use Exercise 2.1.12b and Proposition 2.1.12, or a proof by cases.)

Define f: R (all positive real numbers) -> R (all positive real numbers) by f(x)= sqrt(x^3+2)...

Define f: R (all positive real numbers) -> R (all positive real numbers) by f(x)= sqrt(x^3+2) prove that f is bijective

Let x = {x} and y ={y} represent bounded sequences of real numbers, z = x...

Let x = {x} and y ={y} represent bounded sequences of real numbers, z = x + y, prove the following: supX + supY = supZ where sup represents the supremum of each sequence.

Prove that |cos x - cosy| < |x-y| for any x, y in the real numbers.

Prove that |cos x - cosy| < |x-y| for any x, y in the real numbers.

Let f(x, y) =sqrt(1−xy) and consider the surface S defined by z=f(x, y). find a vector...

Let f(x, y) =sqrt(1−xy) and consider the surface S defined by z=f(x, y). find a vector normal to S at (1,-3)