Answer:
139,999
Step-by-step explanation:
If the digit sum of n is divisible by 5, the digit sum of n+1 can't physically be divisble by 5, unless we utilise 9's at the end, this way whenever we take a number in the tens (i.e. 19), the n+1 will be 1 off being divisble, so if we take a number in the hundreds, (109, remember it must have as many 9's at the end as possible) the n+1 will be 2 off being divisble, so continuing this into the thousands being three, tenthousands being 4, the hundred thousands will be 5 off (or also divisble by 5). So if we stick a 1 in the beginning (for the lowest value), and fill the last digits with 9's, we by process of elimination realise that the tenthousands digit must be 3 such that the digit sum is divisible by 5, therefore we get 139,999
Proof:-
In ∆XYZ and ∆VWZ
Hence
∆XYZ∆VWZ(Side-Angle-Side)
Answer:
Step-by-step explanation:
x=
x=9 in.
Answer:
B) C = 2 * pi * r / C' = 2 * pi * r' and C/C' = r/r' by the division property of equality.
Step-by-step explanation:
Just did it on AP3X and couldn’t find the answer anywhere else, so I hope this helps!
Step-by-step explanation:
a. SAS
b SSS
c. RHS
d. AAS
e. RHS
f. AAS