a d. e g. Using the following predicates: quare (x) is true if x is a square (otherwise it is false) tar(x) is true if x is a star (otherwise it is false) irc(x) is true if x is a circle (otherwise it is false) hade (x) is true if x is shaded (otherwise it is false) ext_to(x, y) is true if x and y are adjacent horizontally, vertically or diagonally. This relation is ot reflexive for any object. or each of the statements below, determine whether the statement is true or false. You need mot justify your response. i 3x circ(r) ^ shade(x) ii Vr shade(x) V ¬shade(x) ii Væ square(r) → ¬shade(x)

NEED HELP SOLVING, This is all one problem

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Using the following predicates: - \( \text{square}(x) \) is true if \( x \) is a square (otherwise it is false). - \( \text{star}(x) \) is true if \( x \) is a star (otherwise it is false). - \( \text{circ}(x) \) is true if \( x \) is a circle (otherwise it is false). - \( \text{shade}(x) \) is true if \( x \) is shaded (otherwise it is false). - \( \text{next\_to}(x, y) \) is true if \( x \) and \( y \) are adjacent horizontally, vertically or diagonally. This relation is not reflexive for any object. For each of the statements below, determine whether the statement is true or false. You need not justify your response. i. \( \exists x \, \text{circ}(x) \land \neg \text{shade}(x) \) ii. \( \forall x \, \text{shade}(x) \lor \neg \text{shade}(x) \) iii. \( \forall x \, \text{square}(x) \rightarrow \neg \text{shade}(x) \) iv. \( \forall x \forall y (\text{star}(x) \land \neg \text{shade}(x) \land \text{next\_to}(x, y) \rightarrow \text{shade}(y) \land \text{circ}(y)) \) v. \( \forall y \exists x \, \text{next\_to}(x, y) \land \text{shade}(x) \) vi. \( \exists x \forall y \, \text{next\_to}(x, y) \land \text{shade}(x) \) Diagram Explanation: The diagram is a 3x3 grid with labeled objects inside the squares: - Top row: - (a) Circle - (b) Star - (c) Star - Middle row: - (d) Circle (shaded) - (e) Blank - Bottom row: - (f) Square - (g) Square (shaded) Each object has specific properties: shape and whether it is shaded or not.