Hellllllllllllllllllllllllllllllllllllllllllp , Arithmetic Progression !!

[~HyDrOgEn~]

Show that 28,23,18,13 ... , is arithmetic , .Hence find Un and the sum of the first n terms in the simplest form ??

[~HyDrOgEn~]

Hey golden girl  , it was really nice to meet you after  The IGCSE has finished , i appreciate that you are helping , but i didn't get it , can you please re Explain
thanks

[The Golden Girl =D]

Nice to see you around too =D

I sent my friend a sg hopefully you'll find the answer later or perhaps by tomorrow =]

[Freaked12]

Show that 28,23,18,13 ... , is arithmetic , .Hence find Un and the sum of the first n terms in the simplest form ??

a+(n-1)d
 28+(n-1)-5
31-5n

second part

sum of first n numbers
n/2(2a+(n-1)d)
 n/2(2*28+(n-1)-5)
(-5n^2+61n)/ 2

[Deadly_king]

Show that 28,23,18,13 ... , is arithmetic , .Hence find Un and the sum of the first n terms in the simplest form ??

For the sequence to be an arithmetic progression it should fit in the equation U_n = a + (n-1)d where a : First term, d : common difference and n : term number.

The sequence is arithmetic since the common difference is constant, i.e U₁ - U₂ = U₃ - U₄

So from the sequence we can not that the common difference is -5 -----> U₂ - U₁ = 23 - 28 = -5 or U₄ - U₃ = 13 - 18 = -5.

So now we just need to replace a = 28 and d = -5 in the formula ----> U_n = 28 + (n - 1)(-5) ----> U_n = 33 - 5n

Requiem made a little mistake there.

Equation for the sum of n terms in an A.P = 0.5n(2a + (n - 1)d)

Again you just need to replace a = 28 and d = -5 ----> S_n = 0.5n(2(28) + (n-1)(-5))

Just simplify to get S_n = 0.5n(61 - 5n) or S_n = (61n - 5n²)/2

[Freaked12]

It was only 33 instead of 31 :O.You wrote the whole answer

[Deadly_king]

It was only 33 instead of 31 :O.You wrote the whole answer

Sorry dude.

Indeed you did it well but I just wanted to help Hydrogen to understand and not just copy the answer.

Hope you don't mind.

[Freaked12]

Oh okay
No problem

[Deadly_king]

Oh okay
No problem

Thanks for your comprehension.

[Arthur Bon Zavi]

Thanks for your comprehension.

Which chapter is this from, from CIE Mathematics books (Pure mathematics, Mechanics or Statistics)?

[~HyDrOgEn~]

Which chapter is this from, from CIE Mathematics books (Pure mathematics, Mechanics or Statistics)?

It's not cie mathematics , Its IB

[Arthur Bon Zavi]

It's not cie mathematics , Its IB

I asked the chapter.

[Deadly_king]

Which chapter is this from, from CIE Mathematics books (Pure mathematics, Mechanics or Statistics)?

Pure Maths 1

Chapter 8 ----> Sequences

@ Hydrogen : It may be IB but it's also found in CIE.

[Arthur Bon Zavi]

Pure Maths 1

Chapter 8 ----> Sequences

@ Hydrogen : It may be IB but it's also found in CIE.

I see.

Unfortunately we are not yet done with this chapter.
We are going to start this chapter soon, after completing whole S1.

S1 is my left hand game now !

[Deadly_king]

I see.

Unfortunately we are not yet done with this chapter.
We are going to start this chapter soon, after completing whole S1.

S1 is my left hand game now !

Ooh......................I had completed the whole p1 and p3 before moving to S1 and M1.

Nice.......keep up the good work.