# true or false math question!!?

A furniture manufacturer uses 2 by 4’s to build tables. Each 8 foot long 2 by 4 is cut into 3 pieces; one piece measures 2 ft 6 inches, the second one measures 3 ft 4 inches, and the third piece measures 1ft 2 inches. If the saw blade makes a 3/16 of an inch kerf [width of cut], the amount remaining of each 2 by 4 after the three cuts is inches. True or false?

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- crichlowLv 44 years ago
it fairly is actual and that i'm providing you with the finished information for it from between the web pages on the internet that may additionally assist you in know-how. In arithmetic, a sq. quantity, in some circumstances called a suited sq., is an integer which may well be written because of the fact the sq. of another integer; in different words, it extremely is the made from some integer with itself. So, as an occasion, 9 is a sq. quantity, because of the fact it extremely is written as 3 × 3. sq. numbers are non-damaging. yet in a distinctive way of asserting that a (non-damaging) quantity is a sq. quantity, is that its sq. root is returned an integer. as an occasion, ?9 = 3, so 9 is a sq. quantity. a favorable integer that has no suited sq. divisors different than one million is named sq.-unfastened. the popular notation for the formulation for the sq. of a quantity n isn't the product n × n, however the equivalent exponentiation n2, often pronounced as "n squared". For a non-damaging integer n, the nth sq. quantity is n2, with 02 = 0 being the zeroth sq.. the belief of sq. may well be prolonged to a pair different quantity structures. If rational numbers are lined, then a sq. is the ratio of two sq. integers, and, conversely, the ratio of two sq. integers is a sq. (e.g., 4/9 = (2/3)2). commencing with one million, there are sq. numbers as much as and alongside with m.