Answer:
[tex] \boxed{\sf x \approx 5.50} [/tex]
Step-by-step explanation:
According to Pythagoras Theorem, "In a right-angled triangle, the square of the hypotenuse side is equal to the sum of squares of the other two sides"
[tex] \therefore \\ \sf \implies x^{2} + 10.3^{2} = 11.7^{2} \\ \\ \sf 10.3 ^{2} = 106.09: \\ \sf \implies {x}^{2} + \boxed{106.09} = 11.7^{2} \\ \\ \sf 11.7^{2} = 138.89: \\ \sf \implies {x}^{2} + 106.09 = \boxed{138.89} \\ \\ \sf Subtracting \ 106.09 \ from \ both \ sides: \\ \sf \implies {x}^{2} = 138.89 - 106.09 \\ \\ \sf 138.89 - 106.09 = 30.8 \\ \sf \implies {x}^{2} = \boxed{30.8} \\ \\ \sf Taking \ square \ root \ of \ both \ sides: \\ \sf \implies x = \sqrt{30.8} \\ \\ \sqrt{30.8} = 5.5497: \\ \sf \implies x = \boxed{5.5497} \\ \\ \sf \implies x \approx 5.50 [/tex]
