Question
Simplify the expression
Solution
3381300Z2P7+12P4
Evaluate
Z2×65P×102P2×51P4×10+P4×12
Multiply
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Multiply the terms
Z2×65P×102P2×51P4×10
Multiply the terms
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Evaluate
65×102×51×10
Multiply the terms
6630×51×10
Multiply the terms
338130×10
Multiply the numbers
3381300
Z2×3381300P×P2×P4
Multiply the terms with the same base by adding their exponents
Z2×3381300P1+2+4
Add the numbers
Z2×3381300P7
Use the commutative property to reorder the terms
3381300Z2P7
3381300Z2P7+P4×12
Solution
3381300Z2P7+12P4
Show Solution
Factor the expression
Factor
12P4(281775Z2P3+1)
Evaluate
Z2×65P×102P2×51P4×10+P4×12
Multiply
More Steps
Multiply the terms
Z2×65P×102P2×51P4×10
Multiply the terms
More Steps
Evaluate
65×102×51×10
Multiply the terms
6630×51×10
Multiply the terms
338130×10
Multiply the numbers
3381300
Z2×3381300P×P2×P4
Multiply the terms with the same base by adding their exponents
Z2×3381300P1+2+4
Add the numbers
Z2×3381300P7
Use the commutative property to reorder the terms
3381300Z2P7
3381300Z2P7+P4×12
Use the commutative property to reorder the terms
3381300Z2P7+12P4
Calculate
3381300P7Z2+12P4
Rewrite the expression
12P4×281775Z2P3+12P4
Solution
12P4(281775Z2P3+1)
Show Solution