Question

maths
how to do it???​

Answer 1

${\huge\fbox\red{A}\fbox\blue{n}\fbox\purple{s}\fbox\green{w}\fbox\red{e}\fbox\orange{r}\fbox{L}\fbox\pink{e}}$

=360 the number of ways

Step-by-step explanation:

Then, when we subtract this from the total number of arrangements that is 1260 then we will get the number of arrangements in which the two R's are never together. Thus, we can arrange the letter of the word ARRANGE such that two R's are never together is equal to 1260−360=900.

Answer 2

Answer:

you can solve this by factorial = !7/!2*!2 =1260 if it is right ans brainlist my ans. and give me 5 stars