--- title: "Spectroscopy: Concentration and Transmitted Light - AP Chemistry Required Lab Guide" description: "Review Spectroscopy: Concentration and Transmitted Light for AP Chemistry with CED-aligned concepts, lab skills, data analysis, and AP exam connections." canonical: "https://fiveable.me/ap-chem/required-labs/spectroscopy-concentration-and-transmitted-light/study-guide/cBBiEpwKLjPhg9029tHD" type: "study-guide" subject: "AP Chemistry" unit: "Required Labs" lastUpdated: "2026-06-17" --- # Spectroscopy: Concentration and Transmitted Light - AP Chemistry Required Lab Guide ## Summary Review Spectroscopy: Concentration and Transmitted Light for AP Chemistry with CED-aligned concepts, lab skills, data analysis, and AP exam connections. ## Guide ## Spectroscopy Lab: Using Visible Light to Measure Concentration This lab is really about one thing: using light to figure out how much of a colored substance is dissolved in a [solution](/ap-chem/key-terms/solution "fv-autolink"). You shine visible light through a sample, measure how much gets absorbed, and use that relationship to determine an unknown concentration. It connects the physics of photons and [the electromagnetic spectrum](/ap-chem/key-terms/the-electromagnetic-spectrum "fv-autolink") to a practical analytical technique called visible-light spectroscopy. ## Why This Lab Matters for the AP Exam Spectroscopy shows up in multiple ways on the [AP Chemistry](/ap-chem "fv-autolink") exam. You need to understand the electromagnetic spectrum, how [photon energy](/ap-chem/key-terms/photon-energy "fv-autolink") relates to frequency, and why different regions of the spectrum interact with matter differently. This lab grounds all of that in something you can actually measure. You also practice building a calibration curve, interpreting data, and making claims with evidence. Those are skills the exam tests directly in free-response questions. ## CED Connections This lab connects to three topics in [Unit 3](/ap-chem/unit-3 "fv-autolink") and [Unit 4](/ap-chem/unit-4 "fv-autolink"). **Topic 3.11 (Spectroscopy and the Electromagnetic Spectrum) - LO 3.11.A / EK 3.11.A.1:** The lab uses UV/visible radiation, which corresponds to electronic transitions in molecules. That is one of the three spectral regions you need to know. The other two are [microwave radiation](/ap-chem/key-terms/microwave-radiation "fv-autolink") (molecular rotational transitions) and [infrared radiation](/ap-chem/key-terms/infrared-radiation "fv-autolink") (molecular vibrational transitions). This lab gives you a concrete example of the UV/visible region in action. **[Topic 3.12](/ap-chem/unit-3/photoelectric-effect/study-guide/aSateoQF56rKcT1xgLeY "fv-autolink") (Properties of Photons) - LO 3.12.A / EK 3.12.A.1 and 3.12.A.2:** When a [molecule](/ap-chem/unit-2/lewis-diagrams/study-guide/KjqTRYr5TVr2C3Be3u0J "fv-autolink") absorbs a photon, its energy increases by exactly the energy of that photon. The equations $$c = \lambda\nu$$ and $$E = h\nu$$ describe how wavelength, frequency, and energy are all connected. This lab makes those equations real because you are literally choosing a wavelength of light and watching molecules absorb it. **[Topic 4.3](/ap-chem/unit-4/representations-reactions/study-guide/CzoUpQyKbK27GRGVfXFM "fv-autolink") (Representations of Reactions) - LO 4.3.A / EK 4.3.A.1:** Particulate-level thinking matters here too. When you think about why a more concentrated solution absorbs more light, you are thinking about how many [solute](/ap-chem/key-terms/solute "fv-autolink") particles are in the path of the light beam. That is a particulate-level model of the Beer-Lambert relationship. ## What You Need to Be Able to Do Here are the concrete skills this lab builds: - **Identify the correct wavelength** to use for a given colored solution (you pick the wavelength where the solution absorbs the most light) - **Prepare a [dilution](/ap-chem/key-terms/dilution "fv-autolink") series** to create solutions of known concentration (your standard solutions) - **Measure [absorbance](/ap-chem/key-terms/absorbance "fv-autolink")** for each standard and for an unknown sample - **Graph absorbance vs. concentration** and recognize that the relationship should be linear - **Use the calibration curve** to determine the concentration of an unknown solution - **Connect absorbance data to [particulate models](/ap-chem/key-terms/particulate-models "fv-autolink")** by explaining why more solute particles means more [absorption](/ap-chem/key-terms/absorption "fv-autolink") - **Evaluate sources of error** and explain how they affect your results ## Core Concepts ### The Electromagnetic Spectrum **The electromagnetic spectrum** is the full range of electromagnetic radiation, organized by wavelength and frequency. From longest wavelength to shortest, it goes: radio waves, microwaves, infrared, visible light, ultraviolet, X-rays, gamma rays. For AP Chemistry, you need to know which region connects to which type of molecular event: - **Microwave radiation** interacts with **[molecular rotational levels](/ap-chem/key-terms/molecular-rotational-levels "fv-autolink")**. Molecules can spin, and microwave photons have just enough energy to bump a molecule to a higher rotational state. - **Infrared radiation** interacts with **[molecular vibrational levels](/ap-chem/key-terms/molecular-vibrational-levels "fv-autolink")**. Bonds in molecules stretch and bend, and infrared photons match the energy gaps between vibrational states. - **Ultraviolet and visible radiation** interacts with **electronic energy levels**. These photons are energetic enough to promote [electrons](/ap-chem/unit-1/atomic-structure-electron-configurations/study-guide/DiW6kVmwDRDakxKodjw5 "fv-autolink") to higher energy orbitals. This lab uses visible light, so you are working with electronic transitions. ### Photon Energy A **photon** is a discrete packet of electromagnetic energy. Its energy is not arbitrary. It depends on the frequency of the radiation. **Planck's equation** gives you the relationship: $$E = h\nu$$ Where: - $$E$$ is the energy of the photon (in joules) - $$h$$ is **Planck's constant**, $$6.626 \times 10^{-34} \text{ J·s}$$ - $$\nu$$ (the Greek letter nu) is the **frequency** of the electromagnetic radiation (in Hz, or s⁻¹) Since frequency and wavelength are connected by: $$c = \lambda\nu$$ Where $$c$$ is the **speed of light** ($$3.00 \times 10^8 \text{ m/s}$$) and $$\lambda$$ is wavelength, you can rewrite Planck's equation as: $$E = \frac{hc}{\lambda}$$ The key takeaway: shorter wavelength means higher frequency means higher photon energy. Ultraviolet photons carry more energy than visible photons, which carry more than infrared photons. ### Absorption and Emission **Absorption** happens when a molecule takes in a photon and jumps to a higher energy state. **Emission** happens when a molecule releases a photon and drops back to a lower energy state. In this lab, you are measuring absorption. When a colored solution absorbs visible light, it is absorbing specific wavelengths. The color you see is the light that is *not* absorbed. A blue solution looks blue because it absorbs wavelengths in the orange/red range and transmits the blue wavelengths through. ### Absorbance and the Beer-Lambert Law **Absorbance** (A) is a measure of how much light a sample absorbs at a given wavelength. It is calculated from the ratio of light intensity entering the sample to light intensity exiting the sample. The **Beer-Lambert Law** states that absorbance is directly proportional to concentration (when path length and the identity of the absorbing species are held constant): $$A = \varepsilon l c$$ Where: - $$\varepsilon$$ is the molar absorptivity (a constant for a given substance at a given wavelength) - $$l$$ is the path length through the solution (usually 1 cm in a standard cuvette) - $$c$$ is the molar concentration For this lab, the important part is the linear relationship: **as concentration increases, absorbance increases proportionally.** That is what makes a calibration curve work. ### Particulate-Level Model of Absorbance Think about what is actually happening at the particle level. When light passes through a solution, photons can be absorbed by solute particles. If there are more solute particles in the path of the light beam (higher concentration), more photons get absorbed. If there are fewer particles (lower concentration), more photons pass through. A **particulate-level model** of this would show more solute molecules distributed throughout the solution at higher concentrations, with fewer photons making it to the detector. This is exactly what the Beer-Lambert relationship describes mathematically. ## How the Lab Works The investigation uses a technique called **colorimetry** (a form of visible-light spectroscopy). Here is the logic: You start with a colored solution of known concentration. You prepare several dilutions to create a set of **standard solutions** with different known concentrations. Then you measure the absorbance of each standard at the optimal wavelength. Choosing the right wavelength matters. You want to measure at the wavelength where your solution absorbs the most light. This gives you the most sensitivity and the clearest signal. For a blue solution, that peak absorbance is usually in the orange range of the visible spectrum (around 600-650 nm). You can find this by scanning across wavelengths and identifying the maximum. Once you have absorbance values for your standards, you plot absorbance (y-axis) vs. concentration (x-axis). If the Beer-Lambert Law holds, you get a straight line through the origin. This is your **calibration curve**. Then you measure the absorbance of your unknown solution. You use the calibration curve to read off the corresponding concentration. That is the core of the analysis. The investigation is guided-inquiry, which means you will likely make decisions about which wavelength to use, how to set up your dilution series, and how to handle your data. The design choices you make are part of what the lab is testing. ## Data and Analysis Moves ### Setting Up Your Variables - **Independent variable:** concentration of the solution (what you control by making dilutions) - **Dependent variable:** absorbance (what you measure with the spectrophotometer) - **Controlled variables:** wavelength of light, path length (cuvette size), [temperature](/ap-chem/unit-5/reaction-rates/study-guide/4V94d3BwjoPaOOyQtDKQ "fv-autolink"), the identity of the solute Your **control** is the blank (usually distilled water or the solvent alone). You zero the instrument with the blank so that any absorbance you measure comes from the solute, not the solvent. ### Building the Calibration Curve Plot your data with concentration on the x-axis and absorbance on the y-axis. Draw a best-fit line (linear regression). The line should pass through or near the origin, because zero concentration should give zero absorbance. If a point is way off the line, think about whether you made an error preparing that standard. Do not just delete outliers without reasoning. ### Finding the Unknown Concentration Take the absorbance of your unknown and locate that value on the y-axis of your calibration curve. Read across to the best-fit line, then down to the x-axis. That x-value is your calculated concentration. Alternatively, if you have the equation of your best-fit line ($$A = mc + b$$, where $$m$$ is slope and $$b$$ is ideally close to zero), you can plug in your absorbance value and solve for $$c$$. ### Calculating Dilutions When you prepare standards, you are diluting a stock solution. The dilution equation is: $$C_1V_1 = C_2V_2$$ Where $$C_1$$ and $$V_1$$ are the concentration and volume of the stock, and $$C_2$$ and $$V_2$$ are the concentration and volume of the diluted solution you want to make. ### Connecting to Photon Energy If a free-response question asks you to connect your wavelength choice to photon energy, use $$E = h\nu$$ or $$E = hc/\lambda$$. A wavelength of 600 nm corresponds to a specific photon energy. The molecules in your solution absorb photons at that energy because it matches the gap between electronic energy levels in those molecules. ## Common Mistakes **Confusing absorbance and transmittance.** Absorbance goes up as concentration goes up. Transmittance goes down. They move in opposite directions. The Beer-Lambert Law is written in terms of absorbance, not transmittance. Do not mix them up in your analysis. **Picking the wrong wavelength.** You want maximum absorbance, not minimum. If you measure at a wavelength where your solution barely absorbs anything, your data will be noisy and your calibration curve will be nearly flat. **Forgetting to blank the instrument.** If you do not zero with the blank, your absorbance values include contributions from the cuvette and solvent. Your calibration curve will not pass through the origin and your unknown concentration will be off. **Thinking the colored light is the wavelength being absorbed.** A blue solution looks blue because it transmits blue light. It is absorbing the complementary color (orange/red). Students often try to measure at the same wavelength as the color they see, which is backwards. **Misidentifying which region of the spectrum applies.** On the exam, microwave = rotational transitions, infrared = vibrational transitions, UV/visible = electronic transitions. This is a direct EK 3.11.A.1 question and it comes up often. Do not mix up infrared and microwave. **Treating the calibration curve as exact.** Your best-fit line is a model. There is uncertainty in every measurement. If your unknown absorbance falls outside the range of your standards, you cannot reliably extrapolate. The exam may ask you to recognize this limitation. **Skipping the particulate explanation.** When asked to explain *why* absorbance increases with concentration, do not just say "Beer-Lambert Law." Explain it at the particle level: more solute particles in the light path means more photons absorbed. ## Quick Review Checklist - You can state which region of the electromagnetic spectrum corresponds to rotational, vibrational, and electronic transitions (EK 3.11.A.1) - You can use $$E = h\nu$$ and $$c = \lambda\nu$$ to calculate photon energy from wavelength or frequency - You know that absorbance increases linearly with concentration (Beer-Lambert Law) and can use a calibration curve to find an unknown concentration - You can explain absorbance using a particulate-level model (more solute particles = more photon absorption) - You know that the wavelength you choose for measurement should be the one where the solution has maximum absorbance - You can distinguish between absorbance (increases with concentration) and transmittance (decreases with concentration) - You can identify the independent variable, dependent variable, and controls in a spectroscopy investigation - You can connect the color a solution transmits to the wavelengths it absorbs (complementary colors)