How do I do this? Three large squares of tin, each with edges 4 feet long, have four small squares cut from their corners. The twelve small squares are identical and are used to form two closed cubes....
Three large squares of tin, each with edges 4 feet long, have four small squares cut from their corners. The twelve small squares are identical and are used to form two closed cubes. The three remaining cross shaped pieces are folded to make three boxes with no tops. 8. (a) Determine a formula for the total volume V of the two cubes and three boxes in terms of x, the length of a side of one of the small squares. (See the figure). one of the three large squares
Three large squares of tin, each with edges 4 feet long, have four small squares cut from their corners. The twelve small squares are identical and are used to form two closed cubes. The three remaining cross shaped pieces are folded to make three boxes with no tops. 8. (a) Determine a formula for the total volume V of the two cubes and three boxes in terms of x, the length of a side of one of the small squares. (See the figure). one of the three large squares