Show that [111]b is not a perfect square in any base b.

If an open box has a square base and a volume of 111 in.3 and is...

If an open box has a square base and a volume of 111 in.3 and is constructed from a tin sheet, find the dimensions of the box, assuming a minimum amount of material is used in its construction. (Round your answers to two decimal places.)

Let n be an integer. Prove that if n is a perfect square (see below for...

Let n be an integer. Prove that if n is a perfect square (see below for the definition) then n + 2 is not a perfect square. (Use contradiction) Definition : An integer n is a perfect square if there is an integer b such that a = b 2 . Example of perfect squares are : 1 = (1)2 , 4 = 22 , 9 = 32 , 16, · · Use Contradiction proof method

Using the Singular Value Decomposition, show that for any square matrix A, it follows that A*A...

Using the Singular Value Decomposition, show that for any square matrix A, it follows that A*A is similar to AA*

Using a) a difference of squares and b) a perfect square trinomial;  Explain in details the pattern...

Using a) a difference of squares and b) a perfect square trinomial;  Explain in details the pattern that allows one to recognize the binomial or trinomial as having special factors. Illustrate with examples of a binomial or trinomial expression that may be factored using the special techniques you are explaining.

Completing the square. Find the value of n so the expression is a perfect square trinomial....

Completing the square. Find the value of n so the expression is a perfect square trinomial. Factor the trinomial for equation of y^2=4y+n

Prove that there is no integer which is a perfect square and is a multiple of...

Prove that there is no integer which is a perfect square and is a multiple of 2, but is not a multiple of 4.

A rectangular box with a square base has a volume of 4 cubic feet. The material...

A rectangular box with a square base has a volume of 4 cubic feet. The material for the bottom of the box costs $3 per square foot, the top costs $2 per square foot, and the four sides cost $5 per square foot. (a) If x is the side length of the square base, and y is the height of the box, find the total cost of the box as a function of one variable. (b) Find the critical number...

If an open box with a square base has a volume of 46t^3 , what are...

If an open box with a square base has a volume of 46t^3 , what are the dimensions that require the less amount of materials in its construction: a. base: 0.8 ft x 0.8ft, height: 6.25 ft b. base: 2ft x 2ft, height: 1ft c. base: 1ft x 1ft, height: 4ft d. base: 1.5 ft x 1.5 ft, height: 1.8 ft *please show all process

Prove that either 172017+ 1983 or 172017+ 1984 is not a perfect square.

Prove that either 172017+ 1983 or 172017+ 1984 is not a perfect square.

An open-topped box is to have a square base and a volume of 10 ?3. The...

An open-topped box is to have a square base and a volume of 10 ?3. The cost per square meter of material is $5 for the bottom and $2 for the four sides. Let ? be the length of the base of the box and ℎ be the height of the box. Let ? be the total cost of material required to make the box. a. Express ? as a function of ? and find its domain. b. Find the...