We need tae eik 7.056
tae 605.7 tae 5.67.

Nou, whan ye'r eikin onie nummer,
ye aye want tae be sair

that ye line the nummers up
in the same steid.

N especialie whan yer dealin
wi deceemals,

the easiest wa tae dae that is tae
juist line the deceemals up.

Sae lat's dae that.

Sae the first nummer here is
7.056.

The seicont nummer here is
605.7.

N this hainmaist nummer is
5.67.

Nou we hae awthing lined up.

Awthing that's in the yin's steid
is abuin or ablaw

aw ither thing in the yins steid.

Awthing in the tenths steid
is abuin or ablaw aw ither thing

in the tenths steid,
n sae on.

Sae we can eik.

Sae lat's eik.

Sae ye wnt tae stert aff
in the smaaest steid.

Sae ye stert aff here.

This is the tenths, hunnerts,
thoosants steid.

This is literalie 6 thoosants,

an ye want tae eik it tae
the ither thoosants.

Thaur's nae ither thoosants.

Sae ye can see this in twa waas.

Ye coud juist bring this 6 doun,

or ye coud see this 605.7 aes
the same aes 605.700.

Ye can eik aes monie zeros ti the richt o this deceemal,
ti the richt o the 7, aes ye want,

aes we'r sittin oanthe richt side o the deceemal,

wioot changin its value.

ye can dae it here n aw.

This 5.67, ye can
write it aes 5.670.

Whan ye write it lik this,

n ye hae 6 plus 0 plus 0 maks 6.

N ye keep gaun.

5 plus 0 plus 7 is 12.

Ye screeve the 2 in the hunners steid,

n cairrie the 1.

1 plus 0 plus 7 is 8,
plus 6 is 14.

Screeve the 4, regroop the 1
intae the yin's steid.

1 plus 7 is 8.

8 plus 5 is 13.

13 plus 5 is 18.

This is 18.

Cairrie or regroop the 1.

1 plus 0 is juist 1.

N than finalie,

Ye hae the 6 in the hunners steid.

Nawthing gets eikt tae it,
sae ye can juist bring that 6 doon,

n it's richt there.

N ye dinna want tae ferget the deceemal.

N sae whan ye eik the nummers
ye get 618.426, or

618 n 426 thoosants.

N we'r duin.