A meat baster consists of a squeeze bulb attached to a plastic tube. When the bulb is squeezed and released, with the open end of the tube under the surface of the basting sauce, the sauce rises in the tube to a distance h, as the drawing shows. Using 1.013 × 10⁵ Pa for the atmospheric pressure and 1470 kg/m³ for the density of the sauce, find the absolute pressure P_B in the bulb when the distance h is (a) 0.18 m and (b) 0.09 m.

A cylindrical storage tank has a radius of 1.08 m. When filled to a height of 3.27 m, it holds 13100 kg of a liquid industrial solvent. (c) What is the density of the solvent?

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**Description:** A meat baster consists of a squeeze bulb attached to a plastic tube. When the bulb is squeezed and released, with the open end of the tube under the surface of the basting sauce, the sauce rises in the tube to a distance \( h \), as shown in the diagram. Using \( 1.013 \times 10^5 \) Pa for the atmospheric pressure and \( 1470 \, \text{kg/m}^3 \) for the density of the sauce, find the absolute pressure \( P_B \) in the bulb when the distance \( h \) is (a) 0.18 m and (b) 0.09 m. **Diagram Explanation:** The diagram depicts a cross-section of the meat baster in action. The bulb is positioned horizontally with the tube immersed in a dish filled with sauce. The height \( h \) indicates the vertical distance the sauce has risen inside the tube when the bulb is squeezed. **Calculations:** (a) \( P_B = \) [input box] Pa (b) \( P_B = \) [input box] Pa

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### Problem Statement A cylindrical storage tank has a radius of 1.08 meters. When filled to a height of 3.27 meters, it holds 13,100 kilograms of a liquid industrial solvent. What is the density of the solvent? ### Input Fields - **Number**: [Text Box] - **Units**: [Dropdown Menu] To solve for the density of the solvent, use the formula for the volume of a cylinder and the concept of density: 1. **Volume of the Cylinder (V)**: \[ V = \pi r^2 h \] - \( r \) is the radius of the cylinder (1.08 m) - \( h \) is the height of the liquid in the cylinder (3.27 m) 2. **Density (ρ)**: \[ \rho = \frac{\text{mass}}{\text{volume}} \] - Mass of the solvent = 13,100 kg Substitute the values appropriately to find the density. ### Interactive Elements Explanation - The **Number** field is where you input the calculated density value. - The **Units** dropdown allows you to choose the correct units for density, typically kilograms per cubic meter (kg/m³). No graphs or diagrams are present in the text.