24pateldheer 24pateldheer

02-06-2019
Mathematics

contestada

Prove that for all whole values of n the value of the expression:
n(n–1)–(n+3)(n+2) is divisible by 6.

Prove that for all whole values of n the value of the expression nn1n3n2 is divisible by 6 class=

Respuesta :

LammettHash LammettHash

03-06-2019

Expand:

[tex]n(n-1)-(n+3)(n+2)=(n^2-n)-(n^2+5n+6)=-6n-6[/tex]

Then we can write

[tex]n(n-1)-(n+3)(n+2)=6\boxed{(-n-1)}[/tex]

which means [tex]6\mid n(n-1)-(n+3)(n+2)[/tex] as required.

Answer Link

Otras preguntas

Simplify. Rewrite the expression in the form 6^n6 n 6, start superscript, n, end superscript. \dfrac{6^{4}}{6}= 6 6 4

Prescription: XYZ medication 200 mg, 5 tabs bid x 6 days. How many tablets will be dispensed from the pharmacy?

Is the right to life an absolute right?

Write a couple of paragraph about your plans after you complete grade 10

A rectangular floor of area 360 m2 is going to be tiled. Each tile is rectangular, and has an area of 240 cm2. An exact number of tiles can be put into the spac

A roll of carpet that contains 250 yd of carpet will cover how many rooms if each room requires 7 3/4 yards of carpet?

(Please Help) 1.What is the most common isotope for element X 2.Calculate the average atomic mass or element X

A firm is considering two different capital structures. The first option is an all-equity firm with 75,000 shares of stock. The second option is 50,000 shares o

please I need answer right now pleasssseeeonly CC. -3×(-2/3)²

what is the answer to this?