The horizontal distance traveled by the projectile is 9.51 m.
The given parameters;
The horizontal distance of the projectile from the point of projection is range of the projectile.
The horizontal component of the projectile is calculated as;
[tex]v_0_x = v_0 \times cos(\theta)\\\\v_0_x = 14 \ m/s \times cos(35)\\\\v_0_x = 11.47 \ m/s[/tex]
The time of flight of the projectile,
[tex]h = v_0_yt + \frac{1}{2} gt^2\\\\10 = (14 \times sin(35)) t + 0.5 \times 9.8t^2\\\\10 = 8.03 t + 4.9t^2\\\\4.9t^2 + 8.03t - 10 = 0\\\\solve \ the quadratic \ equation \ using \ formula \ method;\\\\a = 4.9, \ b = 8.03, \ c = -10, \\\\t = \frac{-b \ \ +/- \ \ \sqrt{b^2 - 4ac} }{2a} \\\\t = \frac{-8.03 \ \ +/- \ \ \sqrt{(8.03)^2 - 4(4.9\times -10)} }{2(4.9)}\\\\t = 0.83 \ s[/tex]
The horizontal distance of the projectile from the point of projection is calculated as;
[tex]d_1 = v_0_x \times t\\\\d_1 = 11.47 \ m/s \times 0.83\\\\\d_1 = 9.52 \ m[/tex]
Thus, the horizontal distance of the projectile from the point of projection (d₁) is 9.52 m.
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