x+y+z = 20+x+y, prove z=20 with euclids axioms
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The correct option is B)
Here z has been added to two equal quantities.
So, by Euclid's second axiom, which states that, If equals are added to equals then wholes are equal,
⇒x+y+z=10+z
Hence, x+y+z=10+z is true by the second axiom of Euclid.
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Answer: So, by Euclid's second axiom, which states that, If equals are added to equals then wholes are equal,
⇒x+y+z=10+z
Hence, x+y+z=10+z is true by the second axiom of Euclid.
Step-by-step explanation:
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