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So let us start by counting the number of letters in the word “rhombus”. That will be 7. next we note that rhombus has no letter repetitions. Now we are set to go.
7!/(7–4)! = 7!/3! = 5040/6 =840
There are 840 4 letter arrangements that can be made from the letters in “rhombus”.
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Step-by-step explanation:
There are 840 4 letter arrangements that can be made from the letters in “rhombus”.
7!/(7–4)! = 7!/3! = 5040/6 =840
There are 840 4 letter arrangements that can be made from the letters in “rhombus”.